Bosonic string theory is the original version of
string theory
In physics, string theory is a theoretical framework in which the point-like particles of particle physics are replaced by one-dimensional objects called strings. String theory describes how these strings propagate through space and interac ...
, developed in the late 1960s and named after
Satyendra Nath Bose
Satyendra Nath Bose (; 1 January 1894 – 4 February 1974) was a Bengali mathematician and physicist specializing in theoretical physics. He is best known for his work on quantum mechanics in the early 1920s, in developing the foundation for ...
. It is so called because it contains only
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 the spectrum.
In the 1980s,
supersymmetry
In a supersymmetric theory the equations for force and the equations for matter are identical. In theoretical and mathematical physics, any theory with this property has the principle of supersymmetry (SUSY). Dozens of supersymmetric theories e ...
was discovered in the context of string theory, and a new version of string theory called
superstring theory
Superstring theory is an attempt to explain all of the particles and fundamental forces of nature in one theory by modeling them as vibrations of tiny supersymmetric strings.
'Superstring theory' is a shorthand for supersymmetric string theor ...
(supersymmetric string theory) became the real focus. Nevertheless, bosonic string theory remains a very useful model to understand many general features of
perturbative
In quantum mechanics, perturbation theory is a set of approximation schemes directly related to mathematical perturbation for describing a complicated quantum system in terms of a simpler one. The idea is to start with a simple system for whi ...
string theory, and many theoretical difficulties of superstrings can actually already be found in the context of bosonic strings.
Problems
Although bosonic string theory has many attractive features, it falls short as a viable
physical model
A model is an informative representation of an object, person or system. The term originally denoted the Plan_(drawing), plans of a building in late 16th-century English, and derived via French and Italian ultimately from Latin ''modulus'', a mea ...
in two significant areas.
First, it predicts only the existence of
bosons
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 ...
whereas many physical particles are
fermions
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 and ...
.
Second, it predicts the existence of a mode of the string with
imaginary mass, implying that the theory has an instability to a process known as "
tachyon condensation
A tachyon () or tachyonic particle is a hypothetical particle that always travels faster than light. Physicists believe that faster-than-light particles cannot exist because they are not consistent with the known laws of physics. If such partic ...
".
In addition, bosonic string theory in a general spacetime dimension displays inconsistencies due to the
conformal anomaly
A conformal anomaly, scale anomaly, trace anomaly or Weyl anomaly is an anomaly, i.e. a quantum phenomenon that breaks the conformal symmetry of the classical theory.
A classically conformal theory is a theory which, when placed on a surface wi ...
. But, as was first noticed by
Claud Lovelace
Claud Lovelace (16 January 1934 – 7 September 2012) was a theoretical physicist noted for his contributions to string theory, specifically, the idea that strings did not have to be restricted to the four dimensions of spacetime.
A study in 2009 ...
,
[.] in a spacetime of 26 dimensions (25 dimensions of space and one of time), the
critical dimension
In the renormalization group analysis of phase transitions in physics, a critical dimension is the dimensionality of space at which the character of the phase transition changes. Below the lower critical dimension there is no phase transition. ...
for the theory, the anomaly cancels. This high dimensionality is not necessarily a problem for string theory, because it can be formulated in such a way that along the 22 excess dimensions spacetime is folded up to form a small
torus
In geometry, a torus (plural tori, colloquially donut or doughnut) is a surface of revolution generated by revolving a circle in three-dimensional space about an axis that is coplanar with the circle.
If the axis of revolution does not tou ...
or other compact manifold. This would leave only the familiar four dimensions of spacetime visible to low energy experiments. The existence of a critical dimension where the anomaly cancels is a general feature of all string theories.
Types of bosonic strings
There are four possible bosonic string theories, depending on whether
open strings are allowed and whether strings have a specified
orientation
Orientation may refer to:
Positioning in physical space
* Map orientation, the relationship between directions on a map and compass directions
* Orientation (housing), the position of a building with respect to the sun, a concept in building de ...
. Recall that a theory of open strings also must include closed strings; open strings can be thought as having their endpoints fixed on a
D25-brane that fills all of spacetime. A specific orientation of the string means that only interaction corresponding to an
orientable
In mathematics, orientability is a property of some topological spaces such as real vector spaces, Euclidean spaces, surfaces, and more generally manifolds that allows a consistent definition of "clockwise" and "counterclockwise". A space is ...
worldsheet
In string theory, a worldsheet is a two-dimensional manifold which describes the embedding of a string in spacetime. The term was coined by Leonard Susskind as a direct generalization of the world line concept for a point particle in special and ...
are allowed (e.g., two strings can only merge with equal orientation). A sketch of the spectra of the four possible theories is as follows:
Note that all four theories have a negative energy tachyon (
) and a massless graviton.
The rest of this article applies to the closed, oriented theory, corresponding to borderless, orientable worldsheets.
Mathematics
Path integral perturbation theory
Bosonic string theory can be said to be defined by the
path integral quantization of the
Polyakov action
In physics, the Polyakov action is an action (physics), action of the two-dimensional conformal field theory describing the worldsheet of a string in string theory. It was introduced by Stanley Deser and Bruno Zumino and independently by Lars Brin ...
:
:
is the field on the
worldsheet
In string theory, a worldsheet is a two-dimensional manifold which describes the embedding of a string in spacetime. The term was coined by Leonard Susskind as a direct generalization of the world line concept for a point particle in special and ...
describing the embedding of the string in 25+1 spacetime; in the Polyakov formulation,
is not to be understood as the induced metric from the embedding, but as an independent dynamical field.
is the metric on the target spacetime, which is usually taken to be the
Minkowski metric
In mathematical physics, Minkowski space (or Minkowski spacetime) () is a combination of Three-dimensional space, three-dimensional Euclidean space and time into a four-dimensional manifold where the spacetime interval between any two Event (rel ...
in the perturbative theory. Under a
Wick rotation
In physics, Wick rotation, named after Italian physicist Gian Carlo Wick, is a method of finding a solution to a mathematical problem in Minkowski space from a solution to a related problem in Euclidean space by means of a transformation that sub ...
, this is brought to a Euclidean metric
. M is the worldsheet as a
topological manifold In topology, a branch of mathematics, a topological manifold is a topological space that locally resembles real ''n''-dimensional Euclidean space. Topological manifolds are an important class of topological spaces, with applications throughout mathe ...
parametrized by the
coordinates.
is the string tension and related to the Regge slope as
.
has
diffeomorphism
In mathematics, a diffeomorphism is an isomorphism of smooth manifolds. It is an invertible function that maps one differentiable manifold to another such that both the function and its inverse are differentiable.
Definition
Given two m ...
and
Weyl invariance. Weyl symmetry is broken upon quantization (
Conformal anomaly
A conformal anomaly, scale anomaly, trace anomaly or Weyl anomaly is an anomaly, i.e. a quantum phenomenon that breaks the conformal symmetry of the classical theory.
A classically conformal theory is a theory which, when placed on a surface wi ...
) and therefore this action has to be supplemented with a counterterm, along with a hypothetical purely topological term, proportional to the
Euler characteristic
In mathematics, and more specifically in algebraic topology and polyhedral combinatorics, the Euler characteristic (or Euler number, or Euler–Poincaré characteristic) is a topological invariant, a number that describes a topological space ...
:
:
The explicit breaking of Weyl invariance by the counterterm can be cancelled away in the
critical dimension
In the renormalization group analysis of phase transitions in physics, a critical dimension is the dimensionality of space at which the character of the phase transition changes. Below the lower critical dimension there is no phase transition. ...
26.
Physical quantities are then constructed from the (Euclidean)
partition function and
N-point function:
:
:
The discrete sum is a sum over possible topologies, which for euclidean bosonic orientable closed strings are compact orientable
Riemannian surfaces and are thus identified by a genus
. A normalization factor
is introduced to compensate overcounting from symmetries. While the computation of the partition function corresponds to the
cosmological constant
In cosmology, the cosmological constant (usually denoted by the Greek capital letter lambda: ), alternatively called Einstein's cosmological constant,
is the constant coefficient of a term that Albert Einstein temporarily added to his field equ ...
, the N-point function, including
vertex operators, describes the scattering amplitude of strings.
The symmetry group of the action actually reduces drastically the integration space to a finite dimensional manifold. The
path-integral in the partition function is ''a priori'' a sum over possible Riemannian structures; however,
quotienting with respect to Weyl transformations allows us to only consider
conformal structure
In mathematics, conformal geometry is the study of the set of angle-preserving ( conformal) transformations on a space.
In a real two dimensional space, conformal geometry is precisely the geometry of Riemann surfaces. In space higher than two d ...
s, that is, equivalence classes of metrics under the identifications of metrics related by
:
Since the world-sheet is two dimensional, there is a 1-1 correspondence between conformal structures and
complex structures. One still has to quotient away diffeomorphisms. This leaves us with an integration over the space of all possible complex structures modulo diffeomorphisms, which is simply the
moduli space
In mathematics, in particular algebraic geometry, a moduli space is a geometric space (usually a scheme or an algebraic stack) whose points represent algebro-geometric objects of some fixed kind, or isomorphism classes of such objects. Such spac ...
of the given topological surface, and is in fact a finite-dimensional
complex manifold
In differential geometry and complex geometry, a complex manifold is a manifold with an atlas of charts to the open unit disc in \mathbb^n, such that the transition maps are holomorphic.
The term complex manifold is variously used to mean a com ...
. The fundamental problem of perturbative bosonic strings therefore becomes the parametrization of Moduli space, which is non-trivial for genus
.
h = 0
At tree-level, corresponding to genus 0, the cosmological constant vanishes:
.
The four-point function for the scattering of four tachyons is the Shapiro-Virasoro amplitude:
:
Where
is the total momentum and
,
,
are the
Mandelstam variables
In theoretical physics, the Mandelstam variables are numerical quantities that encode the energy, momentum, and angles of particles in a scattering process in a Lorentz-invariant fashion. They are used for scattering processes of two particles ...
.
h = 1
Genus 1 is the torus, and corresponds to the
one-loop level. The partition function amounts to:
:
is a complex number with positive imaginary part
;
, holomorphic to the moduli space of the torus, is any
fundamental domain
Given a topological space and a group acting on it, the images of a single point under the group action form an orbit of the action. A fundamental domain or fundamental region is a subset of the space which contains exactly one point from each o ...
for the
modular group
In mathematics, the modular group is the projective special linear group of matrices with integer coefficients and determinant 1. The matrices and are identified. The modular group acts on the upper-half of the complex plane by fractional l ...
acting on the
upper half-plane
In mathematics, the upper half-plane, \,\mathcal\,, is the set of points in the Cartesian plane with > 0.
Complex plane
Mathematicians sometimes identify the Cartesian plane with the complex plane, and then the upper half-plane corresponds to t ...
, for example
.
is the
Dedekind eta function
In mathematics, the Dedekind eta function, named after Richard Dedekind, is a modular form of weight 1/2 and is a function defined on the upper half-plane of complex numbers, where the imaginary part is positive. It also occurs in bosonic string t ...
. The integrand is of course invariant under the modular group: the measure
is simply the
Poincaré metric
In mathematics, the Poincaré metric, named after Henri Poincaré, is the metric tensor describing a two-dimensional surface of constant negative curvature. It is the natural metric commonly used in a variety of calculations in hyperbolic geometry ...
which has
PSL(2,R)
In mathematics, the special linear group SL(2, R) or SL2(R) is the group of 2 × 2 real matrices with determinant one:
: \mbox(2,\mathbf) = \left\.
It is a connected non-compact simple real Lie group of dimension 3 with ...
as isometry group; the rest of the integrand is also invariant by virtue of
and the fact that
is a
modular form
In mathematics, a modular form is a (complex) analytic function on the upper half-plane satisfying a certain kind of functional equation with respect to the Group action (mathematics), group action of the modular group, and also satisfying a grow ...
of weight 1/2.
This integral diverges. This is due to the presence of the tachyon and is related to the instability of the perturbative vacuum.
See also
*
Nambu–Goto action
The Nambu–Goto action is the simplest invariant action (physics), action in bosonic string theory, and is also used in other theories that investigate string-like objects (for example, cosmic strings). It is the starting point of the analysis of ...
*
Polyakov action
In physics, the Polyakov action is an action (physics), action of the two-dimensional conformal field theory describing the worldsheet of a string in string theory. It was introduced by Stanley Deser and Bruno Zumino and independently by Lars Brin ...
Notes
References
External links
How many string theories are there?PIRSA:C09001 - Introduction to the Bosonic String{{String theory topics , state=collapsed
String theory