Basil J. Hiley (born 1935), is a
British
British may refer to:
Peoples, culture, and language
* British people, nationals or natives of the United Kingdom, British Overseas Territories, and Crown Dependencies.
** Britishness, the British identity and common culture
* British English, ...
quantum
In physics, a quantum (plural quanta) is the minimum amount of any physical entity (physical property) involved in an interaction. The fundamental notion that a physical property can be "quantized" is referred to as "the hypothesis of quantizati ...
physicist
A physicist is a scientist who specializes in the field of physics, which encompasses the interactions of matter and energy at all length and time scales in the physical universe.
Physicists generally are interested in the root or ultimate caus ...
and
professor emeritus
''Emeritus'' (; female: ''emerita'') is an adjective used to designate a retired chair, professor, pastor, bishop, pope, director, president, prime minister, rabbi, emperor, or other person who has been "permitted to retain as an honorary title ...
of the
University of London
The University of London (UoL; abbreviated as Lond or more rarely Londin in post-nominals) is a federal public research university located in London, England, United Kingdom. The university was established by royal charter in 1836 as a degree ...
.
Long-time colleague of
David Bohm
David Joseph Bohm (; 20 December 1917 – 27 October 1992) was an American-Brazilian-British scientist who has been described as one of the most significant theoretical physicists of the 20th centuryPeat 1997, pp. 316-317 and who contributed u ...
, Hiley is known for his work with Bohm on
implicate orders and for his work on algebraic descriptions of quantum physics in terms of underlying symplectic and orthogonal
Clifford algebras
In mathematics, a Clifford algebra is an algebra generated by a vector space with a quadratic form, and is a unital associative algebra. As -algebras, they generalize the real numbers, complex numbers, quaternions and several other hyper ...
. Hiley co-authored the book ''The Undivided Universe'' with David Bohm, which is considered the main reference for Bohm's interpretation of quantum theory.
The work of Bohm and Hiley has been characterized as primarily addressing the question "whether we can have an adequate conception of the reality of a quantum system, be this causal or be it stochastic or be it of any other nature" and meeting the scientific challenge of providing a mathematical description of quantum systems that matches the idea of an ''implicate order''.
Education and career
Basil Hiley was born 1935 in
Burma
Myanmar, ; UK pronunciations: US pronunciations incl. . Note: Wikipedia's IPA conventions require indicating /r/ even in British English although only some British English speakers pronounce r at the end of syllables. As John Wells explai ...
, where his father worked for the military of the
British Raj
The British Raj (; from Hindi ''rāj'': kingdom, realm, state, or empire) was the rule of the British Crown on the Indian subcontinent;
*
* it is also called Crown rule in India,
*
*
*
*
or Direct rule in India,
* Quote: "Mill, who was himsel ...
. He moved to
Hampshire
Hampshire (, ; abbreviated to Hants) is a ceremonial county, ceremonial and non-metropolitan county, non-metropolitan counties of England, county in western South East England on the coast of the English Channel. Home to two major English citi ...
, England, at the age of twelve, where he attended secondary school. His interest in science was stimulated by his teachers at secondary school and by books, in particular ''
The Mysterious Universe'' by
James Hopwood Jeans
Sir James Hopwood Jeans (11 September 187716 September 1946) was an English physicist, astronomer and mathematician.
Early life
Born in Ormskirk, Lancashire, the son of William Tulloch Jeans, a parliamentary correspondent and author. Jeans was ...
and ''
Mr Tompkins in Wonderland'' by
George Gamow
George Gamow (March 4, 1904 – August 19, 1968), born Georgiy Antonovich Gamov ( uk, Георгій Антонович Гамов, russian: Георгий Антонович Гамов), was a Russian-born Soviet and American polymath, theoreti ...
.
Hiley performed undergraduate studies at
King's College London
King's College London (informally King's or KCL) is a public research university located in London, England. King's was established by royal charter in 1829 under the patronage of King George IV and the Duke of Wellington. In 1836, King's ...
.
[Interview with Basil Hiley](_blank)
conducted by Olival Freire on January 11, 2008, Oral History Transcript, Niels Bohr Library & Archives, American Institute of Physics
The American Institute of Physics (AIP) promotes science and the profession of physics, publishes physics journals, and produces publications for scientific and engineering societies. The AIP is made up of various member societies. Its corpora ...
He published a paper in 1961 on the
random walk
In mathematics, a random walk is a random process that describes a path that consists of a succession of random steps on some mathematical space.
An elementary example of a random walk is the random walk on the integer number line \mathbb Z ...
of a
macromolecule
A macromolecule is a very large molecule important to biophysical processes, such as a protein or nucleic acid. It is composed of thousands of covalently bonded atoms. Many macromolecules are polymers of smaller molecules called monomers. The ...
, followed by further papers on the
Ising model
The Ising model () (or Lenz-Ising model or Ising-Lenz model), named after the physicists Ernst Ising and Wilhelm Lenz, is a mathematical model of ferromagnetism in statistical mechanics. The model consists of discrete variables that represent ...
, and on
lattice constant
A lattice constant or lattice parameter is one of the physical dimensions and angles that determine the geometry of the unit cells in a crystal lattice, and is proportional to the distance between atoms in the crystal. A simple cubic crystal has o ...
systems defined in
graph theoretical terms. In 1962 he obtained his PhD from King's College in
condensed matter physics
Condensed matter physics is the field of physics that deals with the macroscopic and microscopic physical properties of matter, especially the solid and liquid phases which arise from electromagnetic forces between atoms. More generally, the sub ...
, more specifically on cooperative phenomena in
ferromagnets
Ferromagnetism is a property of certain materials (such as iron) which results in a large observed magnetic permeability, and in many cases a large magnetic coercivity allowing the material to form a permanent magnet. Ferromagnetic materials ...
and long chain
polymer
A polymer (; Greek '' poly-'', "many" + ''-mer'', "part")
is a substance or material consisting of very large molecules called macromolecules, composed of many repeating subunits. Due to their broad spectrum of properties, both synthetic a ...
models, under the supervision of
Cyril Domb
Cyril Domb FRS (9 December 1920 – 15 February 2012) was a British-Israeli theoretical physicist, best known for his lecturing and writing on the theory of phase transitions and critical phenomena of fluids. He was also known in the Orthodox ...
and
Michael Fisher
Michael Ellis Fisher (3 September 1931 – 26 November 2021) was an English physicist, as well as chemist and mathematician, known for his many seminal contributions
to statistical physics, including but not restricted to the theory of phase t ...
.
Hiley first met David Bohm during a week-end meeting organized by the student society of King's College at
Cumberland Lodge
Cumberland Lodge is a 17th-century Grade II listed country house in Windsor Great Park 3.5 miles south of Windsor Castle. Since 1947 it has been occupied by the charitable foundation known as Cumberland Lodge, which holds residential conferences ...
, where Bohm held a lecture. In 1961 Hiley was appointed assistant lecturer at Birkbeck College, where Bohm had taken the chair of Theoretical Physics shortly before.
Hiley wanted to investigate how physics could be based on a notion of ''process'', and he found that
David Bohm
David Joseph Bohm (; 20 December 1917 – 27 October 1992) was an American-Brazilian-British scientist who has been described as one of the most significant theoretical physicists of the 20th centuryPeat 1997, pp. 316-317 and who contributed u ...
held similar ideas. He reports that during the seminars he held together with
Roger Penrose
Sir Roger Penrose (born 8 August 1931) is an English mathematician, mathematical physicist, philosopher of science and Nobel Laureate in Physics. He is Emeritus Rouse Ball Professor of Mathematics in the University of Oxford, an emeritus fello ...
he
Hiley worked with David Bohm for many years on fundamental problems of
theoretical physics
Theoretical physics is a branch of physics that employs mathematical models and abstractions of physical objects and systems to rationalize, explain and predict natural phenomena. This is in contrast to experimental physics, which uses experim ...
. Initially Bohm's model of 1952 did not feature in their discussions; this changed when Hiley asked himself whether the "
Einstein-Schrödinger equation", as Wheeler called it, might be found by studying the full implications of that model.
They worked together closely for three decades. Together they wrote many publications, including the book ''The Undivided Universe: An Ontological Interpretation of Quantum Theory'', published 1993, which is now considered the major reference for
Bohm's interpretation of
quantum theory
Quantum theory may refer to:
Science
*Quantum mechanics, a major field of physics
*Old quantum theory, predating modern quantum mechanics
* Quantum field theory, an area of quantum mechanics that includes:
** Quantum electrodynamics
** Quantum ...
.
In 1995, Basil Hiley was appointed to the chair in physics at
Birkbeck College
Birkbeck, University of London (formally Birkbeck College, University of London), is a public university, public research university, located in Bloomsbury, London, England, and a constituent college, member institution of the federal Universit ...
at the
University of London
The University of London (UoL; abbreviated as Lond or more rarely Londin in post-nominals) is a federal public research university located in London, England, United Kingdom. The university was established by royal charter in 1836 as a degree ...
. He was awarded the 2012
Majorana Prize
The ''Electronic Journal of Theoretical Physics'' is a quarterly peer-reviewed open access scientific journal that was established in 2003. It covers all aspects of theoretical physics. The editors-in-chief are Ammar Sakaji (International Institut ...
in the category ''The Best Person in Physics'' for the algebraic approach to quantum mechanics and furthermore in recognition of ″his paramount importance as natural philosopher, his critical and open minded attitude towards the role of science in contemporary culture".
Work
Quantum potential and active information
In the 1970s Bohm, Hiley and co-workers at Birkbeck College expanded further on the theory presented by David Bohm in 1952. They suggested to re-express the
field equation
In theoretical physics and applied mathematics, a field equation is a partial differential equation which determines the dynamics of a physical field, specifically the time evolution and spatial distribution of the field. The solutions to the equ ...
s of physics in a way that is independent of their spacetime description.
They interpreted
Bell's theorem as a test of spontaneous localization, meaning a tendency of a
many-body system
The many-body problem is a general name for a vast category of physical problems pertaining to the properties of microscopic systems made of many interacting particles. ''Microscopic'' here implies that quantum mechanics has to be used to provid ...
to factorize into a product of localized states of its constituent particles, pointing out that such spontaneous localization removes the need for a fundamental role of the measuring apparatus in quantum theory. They proposed that the fundamental new quality introduced by quantum physics is
non-locality.
In 1975, they presented how in the causal interpretation of the quantum theory introduced by Bohm in 1952 the concept of a ''
quantum potential
The quantum potential or quantum potentiality is a central concept of the de Broglie–Bohm formulation of quantum mechanics, introduced by David Bohm in 1952.
Initially presented under the name ''quantum-mechanical potential'', subsequently ''qu ...
'' leads to the notion of an "unbroken wholeness of the entire universe", and they proposed possible routes to a generalization of the approach to
relativity by means of a novel concept of time.
By performing numeric computations on the basis of the quantum potential, Chris Philippidis, Chris Dewdney and Basil Hiley used
computer simulation
Computer simulation is the process of mathematical modelling, performed on a computer, which is designed to predict the behaviour of, or the outcome of, a real-world or physical system. The reliability of some mathematical models can be dete ...
s to deduce ensembles of particle trajectories that could account for the interference fringes in the
double-slit experiment
In modern physics, the double-slit experiment is a demonstration that light and matter can display characteristics of both classically defined waves and particles; moreover, it displays the fundamentally probabilistic nature of quantum mechanics ...
and worked out descriptions of scattering processes. Their work renewed the interests of physicists in the Bohm interpretation of quantum physics. In 1979, Bohm and Hiley discussed the
Aharonov–Bohm effect
The Aharonov–Bohm effect, sometimes called the Ehrenberg–Siday–Aharonov–Bohm effect, is a quantum mechanical phenomenon in which an electrically charged particle is affected by an electromagnetic potential (φ, A), despite being confine ...
which had recently found experimental confirmation. They called attention to the importance of the early work of
Louis de Broglie
Louis Victor Pierre Raymond, 7th Duc de Broglie (, also , or ; 15 August 1892 – 19 March 1987) was a French physicist and aristocrat who made groundbreaking contributions to quantum theory. In his 1924 PhD thesis, he postulated the wave na ...
on
pilot wave
In theoretical physics, the pilot wave theory, also known as Bohmian mechanics, was the first known example of a hidden-variable theory, presented by Louis de Broglie in 1927. Its more modern version, the de Broglie–Bohm theory, interprets qua ...
s, emphasizing his insight and physical intuition and stating that developments based on his ideas aimed at a better understanding than mathematical formalism alone. They offered ways of understanding quantum non-locality and the measurement process,
the limit of classicality, interference and
quantum tunneling
In physics, a quantum (plural quanta) is the minimum amount of any physical entity (physical property) involved in an interaction. The fundamental notion that a physical property can be "quantized" is referred to as "the hypothesis of quantizati ...
.
They showed how in the Bohm model, introducing the concept of ''active information'', the
measurement problem
In quantum mechanics, the measurement problem is the problem of how, or whether, wave function collapse occurs. The inability to observe such a collapse directly has given rise to different interpretations of quantum mechanics and poses a key se ...
and the
collapse of the wave function
In quantum mechanics, wave function collapse occurs when a wave function—initially in a superposition of several eigenstates—reduces to a single eigenstate due to interaction with the external world. This interaction is called an ''observat ...
, could be understood in terms of the quantum potential approach, and that this approach could be extended to relativistic
quantum field theories
In theoretical physics, quantum field theory (QFT) is a theoretical framework that combines classical field theory, special relativity, and quantum mechanics. QFT is used in particle physics to construct physical models of subatomic particles ...
.
They described the measurement process and the impossibility of measuring position and momentum simultaneously as follows: "The ѱ field itself changes since it must satisfy the Schrödinger equation, which now contains the interaction between the particle and apparatus, and it is this change that makes it impossible to measure position and momentum together". The ''collapse of the wave function'' of the
Copenhagen interpretation
The Copenhagen interpretation is a collection of views about the meaning of quantum mechanics, principally attributed to Niels Bohr and Werner Heisenberg. It is one of the oldest of numerous proposed interpretations of quantum mechanics, as featu ...
of quantum theory is explained in the quantum potential approach by the demonstration that information can become ''inactive'' in the sense that from then on "all the packets of the multi-dimensional wave function that do not correspond to the actual result of measurement have no effect on the particle".
Summarizing Bohm's and his own interpretation, Hiley has explained that the quantum potential "does not give rise to a ''mechanical'' force in the Newtonian sense. Thus while the Newtonian potential drives the particle along the trajectory, the quantum potential organises the form of the trajectories in response to the experimental conditions." The quantum potential can be understood as an aspect of "some kind of
self-organising
Self-organization, also called spontaneous order in the social sciences, is a process where some form of overall order arises from local interactions between parts of an initially disordered system. The process can be spontaneous when suffici ...
process" involving a basic underlying field.
[B. J. Hiley: ''Active Information and Teleportation'', In: Epistemological and Experimental Perspectives on Quantum Physics, D. Greenberger et al. (eds.), pages 113-126, Kluwer, Netherlands, 1999]
p. 7
/ref> The quantum potential (or ''information potential'') links the quantum system under investigation to the measuring apparatus, thereby giving that system a ''significance'' within the context defined by the apparatus. It acts on each quantum particle individually, each particle influencing itself. Hiley cites the wording of Paul Dirac
Paul Adrien Maurice Dirac (; 8 August 1902 – 20 October 1984) was an English theoretical physicist who is regarded as one of the most significant physicists of the 20th century. He was the Lucasian Professor of Mathematics at the Univer ...
: "''Each electron only interferes with itself''" and adds: "Somehow the ‘quantum force’ is a ‘private’ force. It thus cannot be regarded as a distortion of some underlying sub-quantum medium as was originally suggested by de Broglie".[B. J. Hiley: ''Nonlocality in microsystems'', in: Joseph S. King, Karl H. Pribram (eds.): ''Scale in Conscious Experience: Is the Brain Too Important to be Left to Specialists to Study?'', Psychology Press, 1995, pp. 318 ff., se]
p. 326–327
/ref> It is independent of field intensity, thus fulfilling a precondition for non-locality, and it carries information about the whole experimental arrangement in which the particle finds itself.
In processes of non-signalling transmission of qubit
In quantum computing, a qubit () or quantum bit is a basic unit of quantum information—the quantum version of the classic binary bit physically realized with a two-state device. A qubit is a two-state (or two-level) quantum-mechanical system, ...
s in a system consisting of multiple particles (a process that is generally called " quantum teleportation" by physicists), active information is transferred from one particle to another, and in the Bohm model this transfer is mediated by the non-local quantum potential.
Relativistic quantum field theory
With Pan N. Kaloyerou, Hiley extended the quantum potential approach to quantum field theory in Minkowski space
In mathematical physics, Minkowski space (or Minkowski spacetime) () is a combination of three-dimensional Euclidean space and time into a four-dimensional manifold where the spacetime interval between any two events is independent of the inerti ...
time. Bohm and Hiley proposed a new interpretation of the Lorentz transformation
In physics, the Lorentz transformations are a six-parameter family of linear transformations from a coordinate frame in spacetime to another frame that moves at a constant velocity relative to the former. The respective inverse transformation i ...
and considered the relativistic invariance of a quantum theory based on the notion of ''be''ables, a term coined by John Bell to distinguish these variables from ''observable
In physics, an observable is a physical quantity that can be measured. Examples include position and momentum. In systems governed by classical mechanics, it is a real-valued "function" on the set of all possible system states. In quantum ph ...
s''. Hiley and a co-worker later extended the work further to curved spacetime. Bohm and Hiley demonstrated that the non-locality of quantum theory can be understood as limit case of a purely local theory, provided the transmission of ''active information'' is allowed to be greater than the speed of light, and that this limit case yields approximations to both quantum theory and relativity.
The Bohm–Hiley approach to relativistic quantum field theory (RQFT) as presented in Bohm and Hiley's book ''Undivided Universe'' and in the work of their co-worker Kaloyerou was reviewed and re-interpreted by Abel Miranda, who stated:
:"I emphasize that Bohm–Hiley ontological reformulation of RQFT always treats Bose fields as continuous distributions in spacetime – basically because these quantum fields have perfectly well-defined classical analogs. The textbook spin-0, spin-1 and spin-2 bosons, such as the Higgs, photons, gluons, electroweak bosons and gravitons are, according to this viewpoint, not ″particles" in any naive sense of the word, but just dynamical structural features of coupled continuous scalar, vector, and symmetric tensor fields that first become manifest when interactions with matter particles (elementary or otherwise) occur "
Implicate orders, pre-space and algebraic structures
Much of Bohm and Hiley's work in the 1970s and 1980s has expanded on the notion of implicate, explicate and generative orders proposed by Bohm. This concept is described in the books '' Wholeness and the Implicate Order'' by Bohm and ''Science, Order, and Creativity
''Science, Order, and Creativity'' is a book by theoretical physicist David Bohm and physicist and writer F. David Peat. It was originally published 1987 by Bantam Books, USA, then 1989 in Great Britain by Routledge. The second edition, published ...
'' by Bohm and F. David Peat
Francis David Peat
(Born 18 April 1938 Waterloo, England died 6 June 2017 in Pari Italy) was a holistic physicist and author who has carried out research in solid state physics and the foundation of quantum theory.
He was director of the Pari ...
. The theoretical framework underlying this approach has been developed by the Birkbeck group over the last decades. In 2013 the research group at Birkbeck summarized their over-all approach as follows:
:"It is now quite clear that if gravity is to be quantised successfully, a radical change in our understanding of spacetime will be needed. We begin from a more fundamental level by taking the notion of process as our starting point. Rather than beginning with a spacetime continuum, we introduce a structure process which, in some suitable limit, approximates to the continuum. We are exploring the possibility of describing this process by some form of non-commutative algebra, an idea that fits into the general ideas of the implicate order. In such a structure, the non-locality of quantum theory can be understood as a specific feature of this more general a-local background and that locality, and indeed time, will emerge as a special feature of this deeper a-local structure."
As of 1980, Hiley and his co-worker Fabio A. M. Frescura expanded on the notion of an ''implicate order'' by building on the work of Fritz Sauter
Fritz Eduard Josef Maria Sauter (; 9 June 1906 – 24 May 1983) was an Austrian-German physicist who worked mostly in quantum electrodynamics and solid-state physics.
Education
From 1924 to 1928, Sauter studied mathematics and physics at the ...
and Marcel Riesz
Marcel Riesz ( hu, Riesz Marcell ; 16 November 1886 – 4 September 1969) was a Hungarian mathematician, known for work on summation methods, potential theory, and other parts of analysis, as well as number theory, partial differential equations ...
who had identified spinor
In geometry and physics, spinors are elements of a complex vector space that can be associated with Euclidean space. Like geometric vectors and more general tensors, spinors transform linearly when the Euclidean space is subjected to a slight ...
s with minimal left ideals of an algebra. The identification of ''algebraic spinors'' with minimal left ideals, which can be seen as a generalization of the ordinary spinor[Basil Hiley: Algebraic quantum mechanics, algebraic spinors and Hilbert space, Boundaries, Scientific Aspects of ANPA, 2003]
preprint
was to become central to the Birkbeck group's work on algebraic approaches to quantum mechanics and quantum field theory. Frescura and Hiley considered algebras that had been developed in the 19th century by the mathematicians Grassmann
Hermann Günther Grassmann (german: link=no, Graßmann, ; 15 April 1809 – 26 September 1877) was a German polymath known in his day as a linguistics, linguist and now also as a mathematician. He was also a physicist, general scholar, and publi ...
, Hamilton Hamilton may refer to:
People
* Hamilton (name), a common British surname and occasional given name, usually of Scottish origin, including a list of persons with the surname
** The Duke of Hamilton, the premier peer of Scotland
** Lord Hamilt ...
, and Clifford.[F. A. M. Frescura, B. J. Hiley: ''Geometric interpretation of the Pauli spinor'', American Journal of Physics, February 1981, Volume 49, Issue 2, pp. 152]
abstract
As Bohm and his colleagues emphasized, in such an algebraic approach operators and operands are of the same type: "there is no need for the disjoint features of the present mathematical formalism f quantum theory namely the operators
Operator may refer to:
Mathematics
* A symbol indicating a mathematical operation
* Logical operator or logical connective in mathematical logic
* Operator (mathematics), mapping that acts on elements of a space to produce elements of another sp ...
on the one hand and the state vectors on the other. Rather, one uses only a single type of object, the algebraic element".[, and its introductory note ] More specifically, Frescura and Hiley showed how "the states of quantum theory become elements of the minimal ideals of the algebra and .the projection operators are just the idempotents which generate these ideals". In a 1981 preprint that remained unpublished for many years, Bohm, P.G. Davies and Hiley presented their algebraic approach in context with the work of Arthur Stanley Eddington
Sir Arthur Stanley Eddington (28 December 1882 – 22 November 1944) was an English astronomer, physicist, and mathematician. He was also a philosopher of science and a populariser of science. The Eddington limit, the natural limit to the lumi ...
. Hiley later pointed out that Eddington attributed to a particle not a metaphysical existence but a structural existence as an idempotent
Idempotence (, ) is the property of certain operation (mathematics), operations in mathematics and computer science whereby they can be applied multiple times without changing the result beyond the initial application. The concept of idempotence ...
of an algebra, similarly as in process philosophy
Process philosophy, also ontology of becoming, or processism, is an approach to philosophy that identifies processes, changes, or shifting relationships as the only true elements of the ordinary, everyday real world. In opposition to the classic ...
an object is a system which continuously transforms onto itself. With their approach based on algebraic idempotents, Bohm and Hiley "incorporate Bohr's notion of ‘wholeness’ and d'Espagnat's concept of ‘non-separability’ in a very basic way".
In 1981, Bohm and Hiley introduced the "characteristic matrix", a non-Hermitian extension of the density matrix
In quantum mechanics, a density matrix (or density operator) is a matrix that describes the quantum state of a physical system. It allows for the calculation of the probabilities of the outcomes of any measurement performed upon this system, using ...
. The Wigner and Moyal transformation of the characteristic matrix yields a complex function, for which the dynamics can be described in terms of a (generalized) Liouville equation
:''For Liouville's equation in dynamical systems, see Liouville's theorem (Hamiltonian).''
: ''For Liouville's equation in quantum mechanics, see Von Neumann equation.''
: ''For Liouville's equation in Euclidean space, see Liouville–Bratu–Gel ...
with the aid of a matrix operating in phase space
In dynamical system theory, a phase space is a space in which all possible states of a system are represented, with each possible state corresponding to one unique point in the phase space. For mechanical systems, the phase space usually ...
, leading to eigenvalues that can be identified with stationary states of motion. From the characteristic matrix, they constructed a further matrix that has only non-negative eigenvalues which can thus be interpreted as a quantum "statistical matrix". Bohm and Hiley thus demonstrated a relation between the Wigner–Moyal approach and Bohm's theory of an implicate order that allows to avoid the problem of negative probabilities. They noted that this work stands in close connection with Ilya Prigogine
Viscount Ilya Romanovich Prigogine (; russian: Илья́ Рома́нович Приго́жин; 28 May 2003) was a physical chemist and Nobel laureate noted for his work on dissipative structures, complex systems, and irreversibility.
Biogra ...
's proposal of a Liouville space extension of quantum mechanics. They extended this approach further to relativistic phase space by applying the phase space interpretation of Mario Schönberg
is a character created by Japanese video game designer Shigeru Miyamoto. He is the title character of the ''Mario'' franchise and the mascot of Japanese video game company Nintendo. Mario has appeared in over 200 video games since his cre ...
to the Dirac algebra
In mathematical physics, the Dirac algebra is the Clifford algebra \text_(\mathbb). This was introduced by the mathematical physicist P. A. M. Dirac in 1928 in developing the Dirac equation for spin-½ particles with a matrix representation of t ...
. Their approach was subsequently applied by Peter R. Holland to fermion
In particle physics, a fermion is a particle that follows Fermi–Dirac statistics. Generally, it has a half-odd-integer spin: spin , spin , etc. In addition, these particles obey the Pauli exclusion principle. Fermions include all quarks an ...
s and by Alves O. Bolivar to boson
In particle physics, a boson ( ) is a subatomic particle whose spin quantum number has an integer value (0,1,2 ...). Bosons form one of the two fundamental classes of subatomic particle, the other being fermions, which have odd half-integer s ...
s.
In 1984, Hiley and Frescura discussed an algebraic approach to Bohm's notion of implicate and explicit orders: the implicate order is carried by an algebra, the explicate order is contained in the various representations
''Representations'' is an interdisciplinary journal in the humanities published quarterly by the University of California Press. The journal was established in 1983 and is the founding publication of the New Historicism movement of the 1980s. It ...
of this algebra, and the geometry of space and time appear at a higher level of abstraction of the algebra.[F. A. M. Frescura, B. J. Hiley]
Algebras, quantum theory and pre-space
p. 3–4 (published in Revista Brasileira de Fisica, Volume Especial, Julho 1984, Os 70 anos de Mario Schonberg, pp. 49-86) Bohm and Hiley expanded on the concept that "relativistic quantum mechanics can be expressed completely through the interweaving of three basic algebras, the bosonic, the fermionic and the Clifford" and that in this manner "the whole of relativistic quantum mechanics can also be put into an implicate order" as suggested in earlier publications of David Bohm from 1973 and 1980.[D. Bohm, B. J. Hiley: ''Generalisation of the twistor to Clifford algebras as a basis for geometry'', published in Revista Brasileira de Fisica, Volume Especial, Os 70 anos de Mario Schönberg, pp. 1-26, 1984]
PDF
On this basis, they expressed the twistor theory
In theoretical physics, twistor theory was proposed by Roger Penrose in 1967 as a possible path to quantum gravity and has evolved into a branch of theoretical and mathematical physics. Penrose proposed that twistor space should be the basic arena ...
of Penrose as a Clifford algebra
In mathematics, a Clifford algebra is an algebra generated by a vector space with a quadratic form, and is a unital associative algebra. As -algebras, they generalize the real numbers, complex numbers, quaternions and several other hyperc ...
, thereby describing structure and forms of ordinary space as an explicit order that unfolds from an implicate order, the latter constituting a ''pre-space''. The spinor is described mathematically as an ideal
Ideal may refer to:
Philosophy
* Ideal (ethics), values that one actively pursues as goals
* Platonic ideal, a philosophical idea of trueness of form, associated with Plato
Mathematics
* Ideal (ring theory), special subsets of a ring considere ...
in the Pauli Clifford algebra, the twistor as an ideal in the conformal Clifford algebra.
The notion of another order underlying space was not new. Along similar lines, both Gerard 't Hooft
Gerardus (Gerard) 't Hooft (; born July 5, 1946) is a Dutch theoretical physicist and professor at Utrecht University, the Netherlands. He shared the 1999 Nobel Prize in Physics with his thesis advisor Martinus J. G. Veltman "for elucidating the ...
and John Archibald Wheeler
John Archibald Wheeler (July 9, 1911April 13, 2008) was an American theoretical physicist. He was largely responsible for reviving interest in general relativity in the United States after World War II. Wheeler also worked with Niels Bohr in e ...
, questioning whether space-time was the appropriate starting-point for describing physics, had called for a deeper structure as starting point. In particular, Wheeler had proposed a notion of pre-space which he called '' pregeometry'', from which spacetime geometry should emerge as a limiting case. Bohm and Hiley underlined Wheeler's view, yet pointed out that they did not build on the foam-like structure proposed by Wheeler and by Stephen Hawking but rather worked towards a representation of the implicate order in form of an appropriate algebra
Algebra () is one of the broad areas of mathematics. Roughly speaking, algebra is the study of mathematical symbols and the rules for manipulating these symbols in formulas; it is a unifying thread of almost all of mathematics.
Elementary a ...
or other pre-space, with spacetime
In physics, spacetime is a mathematical model that combines the three dimensions of space and one dimension of time into a single four-dimensional manifold. Spacetime diagrams can be used to visualize relativistic effects, such as why differen ...
itself considered part of an ''explicit order'' that is connected to pre-space as ''implicit order''. The spacetime manifold
Spacetime topology is the topological structure of spacetime, a topic studied primarily in general relativity. This physical theory models gravitation as the curvature of a four dimensional Lorentzian manifold (a spacetime) and the concepts of to ...
and properties of locality
Locality may refer to:
* Locality (association), an association of community regeneration organizations in England
* Locality (linguistics)
* Locality (settlement)
* Suburbs and localities (Australia), in which a locality is a geographic subdivis ...
and non-locality then arise from an order in such pre-space.
In the view of Bohm and Hiley, "things, such as particles, objects, and indeed subjects, are considered as semi-autonomous quasi-local features of this underlying activity". These features can be considered to be independent only up to a certain level of approximation in which certain criteria are fulfilled. In this picture, the classical limit
The classical limit or correspondence limit is the ability of a physical theory to approximate or "recover" classical mechanics when considered over special values of its parameters. The classical limit is used with physical theories that predict n ...
for quantum phenomena, in terms of a condition that the action function is not much greater than Planck's constant, indicates one such criterion. Bohm and Hiley used the word holomovement
Implicate order and explicate order are Ontology, ontological concepts for Quantum mechanics, quantum theory coined by Theoretical physics, theoretical physicist David Bohm during the early 1980s. They are used to describe two different frameworks ...
for the underlying activity in the various orders together. This term is intended to extend beyond the movement of objects in space and beyond the notion of process, covering movement in a wide context such as for instance the "movement" of a symphony: "a total ordering which involves the whole movement, past and anticipated, at any one moment". This concept, which avowedly has similarities with the notion of ''organic mechanism'' of Alfred North Whitehead
Alfred North Whitehead (15 February 1861 – 30 December 1947) was an English mathematician and philosopher. He is best known as the defining figure of the philosophical school known as process philosophy, which today has found applicat ...
, underlies Bohm and Hiley's efforts to establish algebraic structures that relate to quantum physics and to find an ordering that describes thought processes and the mind.
They investigated non-locality of spacetime also in terms of the time dimension. In 1985, Bohm and Hiley showed that Wheeler's delayed choice experiment
Wheeler's delayed-choice experiment describes a family of thought experiments in quantum physics proposed by John Archibald Wheeler, with the most prominent among them appearing in 1978 and 1984. These experiments are attempts to decide whether ...
does ''not'' require the existence of the past to be limited to its recording in the present. Hiley and R. E. Callaghan later confirmed this view, which stands in stark contrast to Wheeler's earlier statement that "the past has no existence except as it is recorded in the present", by a detailed trajectory analysis for delayed choice experiments and by an investigation into ''welcher Weg'' experiments. Hiley and Callaghan in fact showed that, an interpretation of Wheeler's delayed choice experiment based on Bohm's model, the past is an objective history that cannot be altered retroactively by delayed choice (''see also:'' Bohmian interpretation of Wheeler's delayed choice experiment).
Bohm and Hiley sketched also how Bohm's model could be treated under the point of view of statistical mechanics
In physics, statistical mechanics is a mathematical framework that applies statistical methods and probability theory to large assemblies of microscopic entities. It does not assume or postulate any natural laws, but explains the macroscopic be ...
, and their joint work on this was published in their book (1993) and a subsequent publication (1996).
Hiley has pursued work on algebraic structures in quantum theory throughout his scientific career.[B. J. Hiley]
''A note on the role of idempotents in the extended Heisenberg algebra''
''Implications'', Scientific Aspects of ANPA 22, pp. 107–121, Cambridge, 2001[Basil J. Hiley: ''Towards a Dynamics of Moments: The Role of Algebraic Deformation and Inequivalent Vacuum States'', published in: Correlations ed. K. G. Bowden, Proc. ANPA 23, 104-134, 2001]
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[B.J. Hiley: ''Non-Commutative Quantum Geometry: A Reappraisal of the Bohm Approach to Quantum Theory''. In: Avshalom C. Elitzur, Shahar Dolev, Nancy Kolenda (eds.): ''Quo Vadis Quantum Mechanics? The Frontiers Collection'', 2005]
pp. 299-324
abstract
preprint
After Bohm's death in 1992, he published several papers on how different formulations of quantum physics, including Bohm's, can be brought in context. Hiley also pursued further work on the thought experiment
A thought experiment is a hypothetical situation in which a hypothesis, theory, or principle is laid out for the purpose of thinking through its consequences.
History
The ancient Greek ''deiknymi'' (), or thought experiment, "was the most anci ...
s set out by Einstein
Albert Einstein ( ; ; 14 March 1879 – 18 April 1955) was a German-born theoretical physicist, widely acknowledged to be one of the greatest and most influential physicists of all time. Einstein is best known for developing the theory ...
– Podolsky–Rosen
Rosen is a surname of Ashkenazi Jewish origin, the name deriving from the German word for roses. Notable people with this surname include:
People A–H
* Adam Rosen (born 1984), American-born British luger Olympian
* Al Rosen (1924–2015), Amer ...
(the EPR paradox
EPR may refer to:
Science and technology
* EPR (nuclear reactor), European Pressurised-Water Reactor
* EPR paradox (Einstein–Podolsky–Rosen paradox), in physics
* Earth potential rise, in electrical engineering
* East Pacific Rise, a mid-ocea ...
) and by Lucien Hardy Lucien Hardy (born 1966) is a theoretical physicist, known for his work on the foundation of quantum physics including Hardy's paradox, a thought experiment he devised in 1992, and his widely cited 2001 axiomatic reconstruction of quantum theory t ...
(Hardy's paradox Hardy's paradox is a thought experiment in quantum mechanics devised by Lucien Hardy in 1992–1993 in which a particle and its antiparticle may interact without Annihilation, annihilating each other.
Experiments. Also availablhere using the techni ...
), in particular considering the relation to special relativity
In physics, the special theory of relativity, or special relativity for short, is a scientific theory regarding the relationship between space and time. In Albert Einstein's original treatment, the theory is based on two postulates:
# The laws o ...
.
In the late 1990s, Hiley expanded further on the notion he had developed with Bohm on the description of quantum phenomena in terms of processes.[Basil Hiley]
''Mind and matter: aspects of the implicate order described through algebra''
published in: Karl H. Pribram, J. King (eds.): ''Learning as Self-Organization'', pp. 569–586, Lawrence Erlbaum Associates, New Jersey, 1996, [Basil J. Hiley, Marco Fernandes: ''Process and time'', in: H. Atmanspacher, E. Ruhnau: ''Time, temporality, now: experiencing time and concepts of time in an interdisciplinary perspective'', pp. 365–383, Springer, 1997, ]
preprint
Hiley and his co-worker Marco Fernandes interpret time as an aspect of ''process'' that should be represented by a mathematically appropriate description in terms of an ''algebra of process''. For Hiley and Fernandes, time should be considered in terms of "moments" rather than extensionless points in time, in conventional terms implying an integration over time, recalling also that from the "characteristic matrix" of Bohm and Hiley a positive definite probability can be obtained. They model the unfolding of implicate and explicate orders and the evolution of such orders by a mathematical formalism which Hiley has termed the ''Clifford algebra of process''.
Projections into shadow manifolds
Around the same time, in 1997, Hiley's co-worker Melvin Brown showed that the Bohm interpretation of quantum physics need not rely on a formulation in terms of ordinary space (-space), but can be formulated, alternatively, in terms of momentum space
In physics and geometry, there are two closely related vector spaces, usually three-dimensional but in general of any finite dimension.
Position space (also real space or coordinate space) is the set of all ''position vectors'' r in space, and h ...
(-space).Ignazio Licata Ignazio Licata, born 1958, is an Italian theoretical physicist, professor and scientific director of the ''Institute for Scientific Methodology'', Italy.
Education and work
Licata has studied with David Bohm, Jean-Pierre Vigier, Abdus Salam and ...
: ''Emergence and computation at the edge of classical and quantum systems'', in: Ignazio Licata, Ammar Sakaji (eds.): ''Physics of Emergence and Organization'', World Scientific, 2008
pp. 1–26
,
In 2000, Brown and Hiley showed that the Schrödinger equation can be written in a purely algebraic form that is independent of any representation in a Hilbert space. This algebraic description is formulated in terms of two operator equations. The first of these (formulated in terms of the commutator
In mathematics, the commutator gives an indication of the extent to which a certain binary operation fails to be commutative. There are different definitions used in group theory and ring theory.
Group theory
The commutator of two elements, a ...
) represents an alternative form of the quantum Liouville equation, which is well known to describe the conservation of probability, the second (formulated in terms of the anticommutator
In mathematics, the commutator gives an indication of the extent to which a certain binary operation fails to be commutative. There are different definitions used in group theory and ring theory.
Group theory
The commutator of two elements, a ...
), which they dubbed the "quantum phase equation", describes the conservation of energy. This algebraic description in turn gives rise to descriptions in terms of multiple vector spaces, which Brown and Hiley call "shadow phase spaces" (adopting the term "shadow" from Michał Heller
Michał Kazimierz Heller (born 12 March 1936 in Tarnów) is a Polish professor of philosophy at the Pontifical University of John Paul II in Kraków, Poland, and an adjunct member of the Vatican Observatory staff.
He also serves as a lecture ...
). These shadow phase space descriptions include the descriptions in terms of the ''x''-space of the Bohm trajectory description, of the quantum phase space, and of the ''p''-space. In the classical limit
The classical limit or correspondence limit is the ability of a physical theory to approximate or "recover" classical mechanics when considered over special values of its parameters. The classical limit is used with physical theories that predict n ...
, the shadow phase spaces converge to one unique phase space
In dynamical system theory, a phase space is a space in which all possible states of a system are represented, with each possible state corresponding to one unique point in the phase space. For mechanical systems, the phase space usually ...
. In their algebraic formulation of quantum mechanics the equation of motion takes on the same form as in the Heisenberg picture
In physics, the Heisenberg picture (also called the Heisenberg representation) is a formulation (largely due to Werner Heisenberg in 1925) of quantum mechanics in which the operators (observables and others) incorporate a dependency on time, bu ...
, except that the ''bra'' and ''ket'' in the bra–ket notation each stand for an element of the algebra and that the Heisenberg time evolution is an inner automorphism in the algebra.
In 2001, Hiley proposed to extend the Heisenberg Lie algebra, which is defined by the pair () satisfying the commutator bracket \hat,\hat">math>\hat,\hat=''iħ'' and which is nilpotent, by additionally introducing an idempotent into the algebra to yield a symplectic Clifford algebra. This algebra makes it possible to discuss the Heisenberg equation and Schrödinger equation in a representation-free manner. He later noted that the idempotent can be the projection
Projection, projections or projective may refer to:
Physics
* Projection (physics), the action/process of light, heat, or sound reflecting from a surface to another in a different direction
* The display of images by a projector
Optics, graphic ...
formed by the outer product of the ''standard ket'' and the ''standard bra'', which had been presented by Paul Dirac in his work '' The Principles of Quantum Mechanics''.[B. J. Hiley: ''Non-commutative quantum geometry: A Reappraisal of the Bohm approach to Quantum Theory''. In:]
p. 316
The set of two operator equations, first derived and published by Brown and Hiley in 2000, was re-derived and expanded upon in Hiley's later publications. Hiley also pointed out that the two operator equations are analogous to the two equations that involve the sine and cosine bracket, and that the quantum phase equation has apparently not been published prior to his work with Brown, except that such an equation was hinted at by P. Carruthers and F. Zachariasen.
Hiley has emphasized that quantum processes cannot be displayed in phase space for reason of lacking commutativity
In mathematics, a binary operation is commutative if changing the order of the operands does not change the result. It is a fundamental property of many binary operations, and many mathematical proofs depend on it. Most familiar as the name of ...
. As Israel Gelfand
Israel Moiseevich Gelfand, also written Israïl Moyseyovich Gel'fand, or Izrail M. Gelfand ( yi, ישראל געלפֿאַנד, russian: Изра́иль Моисе́евич Гельфа́нд, uk, Ізраїль Мойсейович Гел ...
had shown, commutative algebras allow a unique manifold to be constructed as a sub-space which is dual to the algebra; non-commutative algebra
In mathematics, a noncommutative ring is a ring whose multiplication is not commutative; that is, there exist ''a'' and ''b'' in the ring such that ''ab'' and ''ba'' are different. Equivalently, a ''noncommutative ring'' is a ring that is not a ...
s in contrast cannot be associated with a unique underlying manifold. Instead, a non-commutative algebra requires a multiplicity of shadow manifolds. These shadow manifolds can be constructed from the algebra by means of projections into subspaces; however, the projections inevitably lead to distortions, in similar manner as Mercator projection
The Mercator projection () is a cylindrical map projection presented by Flemish geographer and cartographer Gerardus Mercator in 1569. It became the standard map projection for navigation because it is unique in representing north as up and sou ...
s inevitably result in distortions in geographical maps.
The algebraic structure of the quantum formalism can be interpreted as Bohm's implicate order, and shadow manifolds are its necessary consequence: "The order of process by its very essence cannot be displayed in one unique manifest (explicate) order. we can only display some aspects of the process at the expense of others. We are inside looking out."
Relation of the de Broglie–Bohm theory to quantum phase space and Wigner–Moyal
In 2001, picking up on the "characteristic matrix" developed with Bohm in 1981 and the notion of a "moment" introduced with Fernandes in 1997, Hiley proposed to use a moment as "an extended structure in both space and time" as a basis for a quantum dynamics, to take the place of the notion of a point particle
A point particle (ideal particle or point-like particle, often spelled pointlike particle) is an idealization of particles heavily used in physics. Its defining feature is that it lacks spatial extension; being dimensionless, it does not take up ...
.
Hiley demonstrated the equivalence between Moyal's characteristic function In mathematics, the term "characteristic function" can refer to any of several distinct concepts:
* The indicator function of a subset, that is the function
::\mathbf_A\colon X \to \,
:which for a given subset ''A'' of ''X'', has value 1 at points ...
for the Wigner quasi-probability distribution
The Wigner quasiprobability distribution (also called the Wigner function or the Wigner–Ville distribution, after Eugene Wigner and :fr:Jean Ville, Jean-André Ville) is a quasiprobability distribution. It was introduced by Eugene Wigner in 193 ...
''F(x,p,t)'' and von Neumann's idempotent
Idempotence (, ) is the property of certain operation (mathematics), operations in mathematics and computer science whereby they can be applied multiple times without changing the result beyond the initial application. The concept of idempotence ...
within the proof of the Stone–von Neumann theorem, concluding: "In consequence, ''F(x,p,t)'' is ''not'' a probability density function but a specific representation of the quantum mechanical density operator
In quantum mechanics, a density matrix (or density operator) is a matrix that describes the quantum state of a physical system. It allows for the calculation of the probabilities of the outcomes of any measurement performed upon this system, usin ...
", thus the Wigner–Moyal formalism exactly reproduces the results of quantum mechanics. This confirmed an earlier result by George A. Baker that the quasi-probability distribution can be understood as the density matrix re-expressed in terms of a mean position and momentum of a "cell" in phase space, and furthermore revealed that the Bohm interpretation Bohm may refer to:
* Bohm (surname)
* Bohm Dialogue, free-flowing group conversation
Physics
* Aharonov–Bohm effect of electromagnetic potential on a particle
* Bohm sheath criterion for a Debye sheath plasma layer
* Bohm diffusion of plasma ...
arises from the dynamics of these "cells" if the particle is considered to be at the center of the cell. Hiley pointed out that the equations defining the Bohm approach can be taken to be implicit in certain equations of the 1949 publication by José Enrique Moyal
José Enrique Moyal ( he, יוסף הנרי מויאל; 1 October 1910 – 22 May 1998) was an Australian mathematician and mathematical physicist who contributed to aeronautical engineering, electrical engineering and statistics, among ot ...
on the phase space formulation of quantum mechanics; he emphasized that this link between the two approaches could be of relevance for constructing a quantum geometry
In theoretical physics, quantum geometry is the set of mathematical concepts generalizing the concepts of geometry whose understanding is necessary to describe the physical phenomena at distance scales comparable to the Planck length. At these d ...
.
In 2005, building on his work with Brown, Hiley showed that the construction of subspaces allows the Bohm interpretation to be understood in terms of the choice of the ''x''-representation as shadow phase space as ''one particular choice'' among an infinite number of possible shadow phase spaces. Hiley noted a conceptual parallel in the demonstration given by mathematician Maurice A. de Gosson that ''"the Schrödinger equation can be shown rigorously to exist in the covering group
In mathematics, a covering group of a topological group ''H'' is a covering space ''G'' of ''H'' such that ''G'' is a topological group and the covering map is a continuous group homomorphism. The map ''p'' is called the covering homomorphism. ...
s of the symplectic group
In mathematics, the name symplectic group can refer to two different, but closely related, collections of mathematical groups, denoted and for positive integer ''n'' and field F (usually C or R). The latter is called the compact symplectic grou ...
of classical physics and the quantum potential arises by projecting down onto the underlying group"''. More succinctly yet, Hiley and Gosson later stated: ''The classical world lives in a symplectic space, while the quantum world unfolds in the covering space.'' In mathematical terms, the covering group of the symplectic group is the metaplectic group
In mathematics, the metaplectic group Mp2''n'' is a double cover of the symplectic group Sp2''n''. It can be defined over either real or ''p''-adic numbers. The construction covers more generally the case of an arbitrary local or finite field, ...
, and De Gosson summarizes the mathematical reasons for the impossibility of constructing simultaneous position and momentum representations as follows: ''"Hiley's 'shadow phase space' approach is a reflection of the fact that we cannot construct a global chart for the metaplectic group, when it is viewed as a Lie group
In mathematics, a Lie group (pronounced ) is a group that is also a differentiable manifold. A manifold is a space that locally resembles Euclidean space, whereas groups define the abstract concept of a binary operation along with the additio ...
, that is, as a manifold equipped with a continuous algebraic structure''. In Hiley's framework, the quantum potential
The quantum potential or quantum potentiality is a central concept of the de Broglie–Bohm formulation of quantum mechanics, introduced by David Bohm in 1952.
Initially presented under the name ''quantum-mechanical potential'', subsequently ''qu ...
arises as "a direct consequence of projecting the non-commutative algebraic structure onto a shadow manifold" and as a necessary feature which ensures that both energy and momentum are conserved.[B.J. Hiley: ''Phase space description of quantum mechanics and non-commutative geometry: Wigner–Moyal and Bohm in a wider context'', In: Theo M. Nieuwenhuizen et al. (eds.): ''Beyond the quantum'', World Scientific Publishing, 2007, , pp. 203–211, therein p. 204]
preprint
Similarly, the Bohm and the Wigner approach are shown to be two different shadow phase space representations.[B. J. Hiley: ''Phase space descriptions of quantum phenomena'', in: A. Khrennikov (ed.): ''Quantum Theory: Re-consideration of Foundations–2'', pp. 267-286, Växjö University Press, Sweden, 2003]
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With these results, Hiley gave evidence to the notion that the ontology of implicate and explicate orders could be understood as a process described in terms of an underlying non-commutative algebra, from which spacetime could be abstracted as one possible representation. The non-commutative algebraic structure
In mathematics, an algebraic structure consists of a nonempty set ''A'' (called the underlying set, carrier set or domain), a collection of operations on ''A'' (typically binary operations such as addition and multiplication), and a finite set of ...
is identified with an implicate order, and its ''shadow manifolds'' with the sets of explicate orders that are consistent with that implicate order.
Here emerges, in Hiley's words, "a radically new way of looking at the way quantum processes enfold in time", built on the work of Bohm and Hiley in the 1980s: in this school of thought, processes of movement can be seen as automorphisms ''within'' and ''between'' inequivalent representations of the algebra. In the first case, the transformation is an inner automorphism
In abstract algebra an inner automorphism is an automorphism of a group, ring, or algebra given by the conjugation action of a fixed element, called the ''conjugating element''. They can be realized via simple operations from within the group it ...
, which is a way of expressing the enfolding and unfolding movement in terms of ''potentialities'' of the process; in the second case it is an outer automorphism In mathematics, the outer automorphism group of a group, , is the quotient, , where is the automorphism group of and ) is the subgroup consisting of inner automorphisms. The outer automorphism group is usually denoted . If is trivial and has a t ...
, or transformation to a new Hilbert space, which is a way of expressing an ''actual change''.
Hierarchy of Clifford algebras
Hiley expanded on the notion of a ''process algebra'' as proposed by Hermann Grassmann
Hermann Günther Grassmann (german: link=no, Graßmann, ; 15 April 1809 – 26 September 1877) was a German polymath known in his day as a linguist and now also as a mathematician. He was also a physicist, general scholar, and publisher. His mat ...
and the ideas of ''distinction'' of Louis H. Kauffman. He took reference to the vector operators introduced by Mário Schönberg in 1957 and by Marco Fernandes in his PhD thesis of 1995, who had constructed orthogonal Clifford algebra
In mathematics, a Clifford algebra is an algebra generated by a vector space with a quadratic form, and is a unital associative algebra. As -algebras, they generalize the real numbers, complex numbers, quaternions and several other hyperc ...
s for certain pairs of dual Grassmann algebras. Adopting a similar approach, Hiley constructed algebraic spinors as minimal left ideals of a process algebra built on the Kauffman's notion of distinction. By nature of their construction, these algebraic spinors are both spinors and elements of that algebra. Whereas they can be mapped (projected) into an external Hilbert space of ordinary spinors of the quantum formalism in order to recover the conventional quantum dynamics, Hiley emphasizes that the dynamic algebraic structure can be exploited more fully with the algebraic spinors than with the ordinary spinors. In this aim, Hiley introduced a ''Clifford density element'' expressed in terms of left and right minimal ideals of a Clifford algebra, analogous to the density matrix
In quantum mechanics, a density matrix (or density operator) is a matrix that describes the quantum state of a physical system. It allows for the calculation of the probabilities of the outcomes of any measurement performed upon this system, using ...
expressed as an outer product in bra–ket notation in conventional quantum mechanics. On this basis Hiley showed how three Clifford algebras ''C''ℓ0,1, ''C''ℓ3,0, ''C''ℓ1,3 form a hierarchy of Clifford algebras over the real number
In mathematics, a real number is a number that can be used to measure a ''continuous'' one-dimensional quantity such as a distance, duration or temperature. Here, ''continuous'' means that values can have arbitrarily small variations. Every real ...
s that describe the dynamics of the Schrödinger, Pauli and Dirac particles, respectively.
Using this approach to describe relativistic particle quantum mechanics, Hiley and R. E. Callaghan presented a complete relativistic version of the Bohm model for the Dirac particle
In particle physics, the Dirac equation is a relativistic wave equation derived by British physicist Paul Dirac in 1928. In its Dirac equation#Covariant form and relativistic invariance, free form, or including Dirac equation#Comparison with the ...
in analogy to Bohm's approach to the non-relativistic Schrödinger equation, thereby refuting the long-standing misconception that the Bohm model could not be applied in the relativistic domain. Hiley pointed out that the Dirac particle has a ‘quantum potential’ which is the exact relativistic generalisation of the quantum potential found originally by de Broglie and Bohm. Within the same hierarchy, the twistor of Roger Penrose links to the conformal Clifford algebra ''C''ℓ4,2 over the reals, and what Hiley calls the ''Bohm energy'' and the ''Bohm momentum'' arises directly from the standard energy–momentum tensor Energy–momentum may refer to:
* Four-momentum
* Stress–energy tensor
* Energy–momentum relation
{{dab ...
. The technique developed by Hiley and his co-workers demonstrates
:"that quantum phenomena ''per se'' can be entirely described in terms of Clifford algebras taken over the reals without the need to appeal to specific representation in terms of wave functions in a Hilbert space. This removes the ''necessity'' of using Hilbert space
In mathematics, Hilbert spaces (named after David Hilbert) allow generalizing the methods of linear algebra and calculus from (finite-dimensional) Euclidean vector spaces to spaces that may be infinite-dimensional. Hilbert spaces arise natural ...
and all the physical imagery that goes with the use of the wave function
A wave function in quantum physics is a mathematical description of the quantum state of an isolated quantum system. The wave function is a complex-valued probability amplitude, and the probabilities for the possible results of measurements mad ...
".
This result is in line with Hiley's striving for a purely algebraic approach to quantum mechanics that is not a priori defined on any external vector space.
Hiley refers to Bohm's ink droplet analogy for a rather easily understandable analogy of the notion of implicate and explicate order. Regarding the algebraic formulation of the implicate order, he has stated: "An important new general feature that emerges from these considerations is the possibility that not everything can be made explicit at a given time" and
adding: 'Within the Cartesian order, complementarity seems totally mysterious. There exists no structural reason as to why these incompatibilities exist. Within the notion of the implicate order, a structural reason emerges and provides a new way of searching for explanations."
Hiley has worked with Maurice A. de Gosson on the relation between classical and quantum physics, presenting a mathematical derivation of the Schrödinger equation from Hamiltonian mechanics. Together with mathematicians Ernst Binz and Maurice A. de Gosson, Hiley showed how "a characteristic Clifford algebra emerges from each (''2n-dimensional'') phase space
In dynamical system theory, a phase space is a space in which all possible states of a system are represented, with each possible state corresponding to one unique point in the phase space. For mechanical systems, the phase space usually ...
" and discussed relations of quaternion algebra, symplectic geometry
Symplectic geometry is a branch of differential geometry and differential topology that studies symplectic manifolds; that is, differentiable manifolds equipped with a closed differential form, closed, nondegenerate form, nondegenerate different ...
and quantum mechanics.
Observed trajectories and their algebraic description
In 2011, de Gosson and Hiley showed that when in Bohm's model a continuous observation of a trajectory is performed, the observed trajectory is identical to the classical particle trajectory. This finding puts the Bohm model in connection to the well-known quantum Zeno effect
The quantum Zeno effect (also known as the Turing paradox) is a feature of quantum-mechanical systems allowing a particle's time evolution to be slowed down by measuring it frequently enough with respect to some chosen measurement setting.
Some ...
. They confirmed this finding when they showed that the quantum potential enters into the approximation for the quantum propagator only on time scales of the order of , which means that a continuously observed particle behaves classically and furthermore that the quantum trajectory converges to a classical trajectory if the quantum potential decreases with time.
Later in 2011, for the first time experimental results were published that showed paths that display the properties expected for Bohm trajectories. More specifically, photon trajectories were observed by means of weak measurements in a double-slit interferometer
In modern physics, the double-slit experiment is a demonstration that light and matter can display characteristics of both classically defined waves and particles; moreover, it displays the fundamentally probabilistic nature of quantum mechanica ...
, and these trajectories displayed the qualitative features that had been predicted ten years earlier by Partha Ghose for Bohm trajectories. The same year, Hiley showed that a description of weak processes – "weak" in the sense of weak measurements – can be included in his framework of an algebraic description of quantum processes by extending the framework to include not only (orthogonal) Clifford algebras but also the ''Moyal algebra'', a symplectic Clifford algebra.
Glen Dennis, de Gosson and Hiley, expanding further on de Gosson's notion of quantum blobs, emphasized the relevance of a quantum particle's internal energy – in terms of its kinetic energy as well as its quantum potential – with regard to the particle's extension in phase space.
In 2018, Hiley showed that the Bohm trajectories are to be interpreted as the mean momentum flow of a set of individual quantum processes, not as the path of an individual particle, and related the Bohm trajectories to Feynman
Richard Phillips Feynman (; May 11, 1918 – February 15, 1988) was an American theoretical physicist, known for his work in the path integral formulation of quantum mechanics, the theory of quantum electrodynamics, the physics of the superflu ...
's path integral formulation
The path integral formulation is a description in quantum mechanics that generalizes the action principle of classical mechanics. It replaces the classical notion of a single, unique classical trajectory for a system with a sum, or functional in ...
as an average of an ensemble of Feynman paths.
Relations to other work
Hiley has repeatedly discussed the reasons for which the Bohm interpretation has met resistance, these reasons relating for instance to the role of the quantum potential term and to assumptions on particle trajectories. He has shown how the energy–momentum-relations in the Bohm model can be obtained directly from the energy–momentum tensor of quantum field theory
In theoretical physics, quantum field theory (QFT) is a theoretical framework that combines classical field theory, special relativity, and quantum mechanics. QFT is used in particle physics to construct physical models of subatomic particles and ...
. He has referred to this as "a remarkable discovery, so obvious that I am surprised we didn't spot it sooner", pointing out that on this basis the quantum potential constitutes the missing energy term that is required for local energy–momentum conservation.[B. J. Hiley: ''The Bohm approach re-assessed'']
2010 preprint
p. 6
/ref> In Hiley's view the Bohm model and Bell's inequalities allowed a debate on the notion of non-locality in quantum physics or, in Niels Bohr
Niels Henrik David Bohr (; 7 October 1885 – 18 November 1962) was a Danish physicist who made foundational contributions to understanding atomic structure and quantum theory, for which he received the Nobel Prize in Physics in 1922. B ...
's words, ''wholeness'' to surface.
For his purely algebraic approach, Hiley takes reference to foundations in the work of Gérard Emch, the work of Rudolf Haag
Rudolf Haag (17 August 1922 – 5 January 2016) was a German theoretical physicist, who mainly dealt with fundamental questions of quantum field theory. He was one of the founders of the modern formulation of quantum field theory and he identifi ...
on local quantum field theory
The Haag–Kastler axiomatic framework for quantum field theory, introduced by , is an application to local quantum physics of C*-algebra theory. Because of this it is also known as algebraic quantum field theory (AQFT). The axioms are stated in ...
, and the work of Ola Bratteli and D.W. Robertson. He points out that the algebraic representation allows to establish a connection to the thermo field dynamics of Hiroomi Umezawa
(September 20, 1924 – March 24, 1995) was a physicist and Distinguished Professor in the Department of Physics at the University of Wisconsin–Milwaukee , using a bialgebra
In mathematics, a bialgebra over a field ''K'' is a vector space over ''K'' which is both a unital associative algebra and a counital coassociative coalgebra. The algebraic and coalgebraic structures are made compatible with a few more axioms. ...
constructed from a two-time quantum theory. Hiley has stated that his recent focus on noncommutative geometry
Noncommutative geometry (NCG) is a branch of mathematics concerned with a geometric approach to noncommutative algebras, and with the construction of ''spaces'' that are locally presented by noncommutative algebras of functions (possibly in some ge ...
appears to be very much in line with the work of Fred van Oystaeyen on noncommutative topology.
Ignazio Licata Ignazio Licata, born 1958, is an Italian theoretical physicist, professor and scientific director of the ''Institute for Scientific Methodology'', Italy.
Education and work
Licata has studied with David Bohm, Jean-Pierre Vigier, Abdus Salam and ...
cites Bohm and Hiley's approach as formulating "a ''quantum event'' as the expression of a deeper ''quantum process''" that connects a description in terms of space-time with a description in non-local, quantum mechanical terms. Hiley is cited, together with Whitehead, Bohr and Bohm, for the "stance of elevating processes to a privileged role in theories of physics". His view of process as fundamental has been seen as similar to the approach taken by the physicist Lee Smolin
Lee Smolin (; born June 6, 1955) is an American theoretical physicist, a faculty member at the Perimeter Institute for Theoretical Physics, an adjunct professor of physics at the University of Waterloo and a member of the graduate faculty of the ...
. This stands quite in contrast to other approaches, in particular to the blockworld approach in which spacetime is static.
Philosopher Paavo Pylkkänen
Paavo Pylkkänen (born 1959) is a Finnish philosopher of mind. He is an Associate Professor of Philosophy at the University of Skövde and a university lecturer in theoretical philosophy at the University of Helsinki. He is known for his work on m ...
, Ilkka Pättiniemi and Hiley are of the view that Bohm's emphasis on notions such as "structural process", "order" and "movement" as fundamental in physics point to some form of scientific structuralism, and that Hiley's work on symplectic geometry, which is in line with the algebraic approach initiated by Bohm and Hiley, "can be seen as bringing Bohm's 1952 approach closer to scientific structuralism".
Mind and matter
Hiley and Pylkkänen addressed the question of the relation between mind and matter by the hypothesis of an ''active information'' contributing to quantum potential
The quantum potential or quantum potentiality is a central concept of the de Broglie–Bohm formulation of quantum mechanics, introduced by David Bohm in 1952.
Initially presented under the name ''quantum-mechanical potential'', subsequently ''qu ...
.[Basil J. Hiley, Paavo Pylkkänen: ''Active information and cognitive science – A reply to Kieseppä'', Brain, Mind and Physics, P. Pylkkänen et al. (Eds.), IOS Press, 1997, ]
p. 64 ff.
/ref> Recalling notions underlying Bohm's approach, Hiley emphasises that ''active information'' "informs" in the sense of a literal meaning of the word: it "induces a change of ''form from within''", and "this active side of the notion of information seems to be relevant both to material processes and to thought". He emphasizes: "even though the quantum level may be analogous to the human mind only in a rather limited way, it does help to understand the interlevel relationships if there are some common features, such as the activity of information, shared by the different levels. The idea is not to reduce everything to the quantum level but rather to propose a hierarchy of levels, which makes room for a more subtle notion of determinism and chance".
Referring to two fundamental notions of René Descartes
René Descartes ( or ; ; Latinized: Renatus Cartesius; 31 March 1596 – 11 February 1650) was a French philosopher, scientist, and mathematician, widely considered a seminal figure in the emergence of modern philosophy and science. Mathem ...
, Hiley states that "if we can give up the assumption that space-time is absolutely necessary for describing physical processes, then it is possible to bring the two apparently separate domains of ''res extensa
''Res extensa'' is one of the two substances described by René Descartes in his Cartesian ontology (often referred to as "radical dualism"), alongside '' res cogitans''. Translated from Latin, "''res extensa''" means "extended thing" while th ...
'' and '' res cogitans'' into one common domain", and he adds that "by using the notion of process and its description by an algebraic structure, we have the beginnings of a descriptive form that will enable us to understand quantum processes and will also enable us to explore the relation between mind and matter in new ways."
In Bohm and Hiley's work on implicate and explicate order, mind and matter are considered to be different aspects of the same process.
:"Our proposal is that in the brain there is a manifest (or physical) side and a subtle (or mental) side acting at various levels. At each level, we can regard one side the manifest or material side, while the other is regarded as subtle or mental side. The material side involves electrochemical processes of various kinds, it involves neuron activity and so on. The mental side involves the subtle or virtual activities that can be actualised by active information mediating between the two sides.
:These sides are two aspects of the ''same'' process. what is subtle at one level can become what is manifest at the next level and so on. In other words if we look at the mental side, this too can be divided into a relatively stable and manifest side and a yet more subtle side. Thus there is no real division between what is manifest and what is subtle and in consequence there is no real division between mind and matter".
In this context, Hiley spoke of his aim of finding "an algebraic description of those aspects of this implicate order where mind and matter have their origins".
Hiley also worked with biologist Brian Goodwin
Brian Carey Goodwin (25 March 1931 – 15 July 2009) (St Anne de Bellevue, Quebec, Canada - Torbay, Devon, UK) was a Canadian mathematician and biologist, a Professor Emeritus at the Open University and a founder of theoretical biology and bio ...
on a process view of biological life, with an alternate view on Darwinism.
Prizes
Hiley received the Majorana Prize
The ''Electronic Journal of Theoretical Physics'' is a quarterly peer-reviewed open access scientific journal that was established in 2003. It covers all aspects of theoretical physics. The editors-in-chief are Ammar Sakaji (International Institut ...
"Best person in physics" in 2012.
Publications
;Overview articles:
*
*
*
* B. J. Hiley: Particles, fields, and observers. In: Baltimore, D., Dulbecco, R., Jacob, F., Levi-Montalcini, R. (eds.) Frontiers of Life, vol. 1, pp. 89–106. Academic Press, New York (2002)
;Books:
* David Bohm, Basil Hiley: ''The Undivided Universe: An Ontological Interpretation of Quantum Theory'', Routledge, 1993,
* F. David Peat
Francis David Peat
(Born 18 April 1938 Waterloo, England died 6 June 2017 in Pari Italy) was a holistic physicist and author who has carried out research in solid state physics and the foundation of quantum theory.
He was director of the Pari ...
(Editor) and Basil Hiley (Editor): ''Quantum Implications: Essays in Honour of David Bohm'', Routledge & Kegan Paul Ltd, London & New York, 1987 (edition of 1991 )
;Other:
* Foreword to: ''"The Principles of Newtonian and Quantum Mechanics – The Need for Planck's Constant, h"'' by Maurice A. de Gosson, Imperial College Press, World Scientific Publishing, 2001,
* Foreword to the 1996 edition of: ''"The Special Theory of Relativity"'' by David Bohm, Routledge,
*
References
Further reading
* William Seager
Classical Levels, Russellian Monism and the Implicate Order
Foundations of Physics, April 2013, Volume 43, Issue 4, pp. 548–567.
External links
Birkbeck College
find a hiley, basil - Search Results
High-Energy Physics Literature Database (INSPIRE-HEP INSPIRE-HEP is an open access digital library for the field of high energy physics (HEP). It is the successor of the Stanford Physics Information Retrieval System (SPIRES) database, the main literature database for high energy physics since the 1970 ...
)
* Daniel M. Greenberger, Klaus Hentschel
Klaus Hentschel (born 4 April 1961) is a German physicist, historian of science and Professor and head of the History of Science and Technology section in the History Department of the University of Stuttgart. He is known for his contributions in ...
, Friedel Weinert (eds.): ''Compendium of Quantum Physics: Concepts, Experiments, History and Philosophy'', Springer
Springer or springers may refer to:
Publishers
* Springer Science+Business Media, aka Springer International Publishing, a worldwide publishing group founded in 1842 in Germany formerly known as Springer-Verlag.
** Springer Nature, a multinationa ...
, 2009, :
*
Basil J. Hiley & authors bios
Google Books
Google Books (previously known as Google Book Search, Google Print, and by its code-name Project Ocean) is a service from Google Inc. that searches the full text of books and magazines that Google has scanned, converted to text using optical c ...
*
Hidden variables
*
Pilot waves
* Interviews with Basil Hiley:
*
The measurement problem in physics
''In Our Time In Our Time may refer to:
* ''In Our Time'' (1944 film), a film starring Ida Lupino and Paul Henreid
* ''In Our Time'' (1982 film), a Taiwanese anthology film featuring director Edward Yang; considered the beginning of the "New Taiwan Cinema"
* ''In ...
'', BBC Radio 4
BBC Radio 4 is a British national radio station owned and operated by the BBC that replaced the BBC Home Service in 1967. It broadcasts a wide variety of spoken-word programmes, including news, drama, comedy, science and history from the BBC' ...
, a discussion with Melvyn Bragg
Melvyn Bragg, Baron Bragg, (born 6 October 1939), is an English broadcaster, author and parliamentarian. He is best known for his work with ITV as editor and presenter of ''The South Bank Show'' (1978–2010), and for the BBC Radio 4 documenta ...
and guests Basil Hiley, Simon Saunders and Roger Penrose
Sir Roger Penrose (born 8 August 1931) is an English mathematician, mathematical physicist, philosopher of science and Nobel Laureate in Physics. He is Emeritus Rouse Ball Professor of Mathematics in the University of Oxford, an emeritus fello ...
, 5 March 2009
*
Interview with Basil Hiley
conducted by Alexei Kojevnikov on December 5, 2000, Oral History Transcript, Niels Bohr Library & Archives, American Institute of Physics
The American Institute of Physics (AIP) promotes science and the profession of physics, publishes physics journals, and produces publications for scientific and engineering societies. The AIP is made up of various member societies. Its corpora ...
*
Interview with Basil Hiley
conducted by Olival Freire on January 11, 2008, Oral History Transcript, Niels Bohr Library & Archives, American Institute of Physics
** George Musser
The Wholeness of Quantum Reality: An Interview with Physicist Basil Hiley
Scientific American Blogs, November 4, 2013
*
conducted by M. Perus
**
**
** (part 1)
** , further interview (part 1)
* Lecture slides by Basil Hiley:
*
Weak measurements: A new type of quantum measurement and its experimental implications
(slides)
** Moyal and Clifford algebras in the Bohm approach
slides
*
Weak measurements: Wigner–Moyal in a new light
slides
)
*
Towards a quantum geometry: Groupoids, Clifford algebras and shadow manifolds
May 2008
slides
)
*Lectures by Basil Hiley recorded at th
Åskloster Symposia
*
7-7-2004
10-7-2004
29-6-2005
9-7-2006
5-7-2007
25-7-2008
27-7-2008
23-7-2009
26-7-2009
{{DEFAULTSORT:Hiley, Basil
1935 births
British physicists
Theoretical physicists
Quantum physicists
Living people
Academics of Birkbeck, University of London
Alumni of King's College London