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In
representation theory Representation theory is a branch of mathematics that studies abstract algebraic structures by ''representing'' their elements as linear transformations of vector spaces, and studies modules over these abstract algebraic structures. In essen ...
, a Yangian is an infinite-dimensional
Hopf algebra Hopf is a German surname. Notable people with the surname include: *Eberhard Hopf (1902–1983), Austrian mathematician *Hans Hopf (1916–1993), German tenor *Heinz Hopf (1894–1971), German mathematician *Heinz Hopf (actor) (1934–2001), Swedis ...
, a type of a
quantum group In mathematics and theoretical physics, the term quantum group denotes one of a few different kinds of noncommutative algebras with additional structure. These include Drinfeld–Jimbo type quantum groups (which are quasitriangular Hopf algebras) ...
. Yangians first appeared in
physics Physics is the natural science that studies matter, its fundamental constituents, its motion and behavior through space and time, and the related entities of energy and force. "Physical science is that department of knowledge which r ...
in the work of
Ludvig Faddeev Ludvig Dmitrievich Faddeev (also ''Ludwig Dmitriyevich''; russian: Лю́двиг Дми́триевич Фадде́ев; 23 March 1934 – 26 February 2017) was a Soviet and Russian mathematical physicist. He is known for the discovery of the ...
and his school in the late 1970s and early 1980s concerning the
quantum inverse scattering method In quantum physics, the quantum inverse scattering method is a method for solving integrable models in 1+1 dimensions, introduced by L. D. Faddeev in 1979. The quantum inverse scattering method relates two different approaches: #the Bethe ansa ...
. The name ''Yangian'' was introduced by
Vladimir Drinfeld Vladimir Gershonovich Drinfeld ( uk, Володи́мир Ге́ршонович Дрінфельд; russian: Влади́мир Ге́ршонович Дри́нфельд; born February 14, 1954), surname also romanized as Drinfel'd, is a renowne ...
in 1985 in honor of
C.N. Yang Yang Chen-Ning or Chen-Ning Yang (; born 1 October 1922), also known as C. N. Yang or by the English name Frank Yang, is a Chinese theoretical physicist who made significant contributions to statistical mechanics, integrable systems, gauge t ...
. Initially, they were considered a convenient tool to generate the solutions of the quantum
Yang–Baxter equation In physics, the Yang–Baxter equation (or star–triangle relation) is a consistency equation which was first introduced in the field of statistical mechanics. It depends on the idea that in some scattering situations, particles may preserve thei ...
. The center of the Yangian can be described by the quantum determinant.


Description

For any finite-dimensional
semisimple Lie algebra In mathematics, a Lie algebra is semisimple if it is a direct sum of simple Lie algebras. (A simple Lie algebra is a non-abelian Lie algebra without any non-zero proper ideals). Throughout the article, unless otherwise stated, a Lie algebra i ...
''a'', Drinfeld defined an infinite-dimensional
Hopf algebra Hopf is a German surname. Notable people with the surname include: *Eberhard Hopf (1902–1983), Austrian mathematician *Hans Hopf (1916–1993), German tenor *Heinz Hopf (1894–1971), German mathematician *Heinz Hopf (actor) (1934–2001), Swedis ...
''Y''(''a''), called the Yangian of ''a''. This Hopf algebra is a deformation of the
universal enveloping algebra In mathematics, the universal enveloping algebra of a Lie algebra is the unital associative algebra whose representations correspond precisely to the representations of that Lie algebra. Universal enveloping algebras are used in the representati ...
''U''(''a'' 'z'' of the Lie algebra of polynomial loops of ''a'' given by explicit generators and relations. The relations can be encoded by identities involving a rational ''R''-matrix. Replacing it with a trigonometric ''R''-matrix, one arrives at
affine quantum group In mathematics, a quantum affine algebra (or affine quantum group) is a Hopf algebra that is a ''q''-deformation of the universal enveloping algebra of an affine Lie algebra. They were introduced independently by and as a special case of their gen ...
s, defined in the same paper of Drinfeld. In the case of the general linear Lie algebra ''gl''''N'', the Yangian admits a simpler description in terms of a single ''ternary'' (or ''RTT'') ''relation'' on the matrix generators due to Faddeev and coauthors. The Yangian Y(''gl''''N'') is defined to be the algebra generated by elements t_^ with 1 ≤ ''i'', ''j'' ≤ ''N'' and ''p'' ≥ 0, subject to the relations : _^, t_^- _^, t_^ -(t_^t_^ - t_^ t_^). Defining t_^=\delta_, setting : T(z) = \sum_ t_^ z^ and introducing the
R-matrix The term R-matrix has several meanings, depending on the field of study. The term R-matrix is used in connection with the Yang–Baxter equation. This is an equation which was first introduced in the field of statistical mechanics, taking its n ...
''R''(''z'') = I + ''z''−1 ''P'' on C''N''\otimesC''N'', where ''P'' is the operator permuting the tensor factors, the above relations can be written more simply as the ternary relation: :\displaystyle The Yangian becomes a
Hopf algebra Hopf is a German surname. Notable people with the surname include: *Eberhard Hopf (1902–1983), Austrian mathematician *Hans Hopf (1916–1993), German tenor *Heinz Hopf (1894–1971), German mathematician *Heinz Hopf (actor) (1934–2001), Swedis ...
with comultiplication Δ, counit ε and antipode ''s'' given by : (\Delta \otimes \mathrm)T(z)=T_(z)T_(z), \,\, (\varepsilon\otimes \mathrm)T(z)= I, \,\, (s\otimes \mathrm)T(z)=T(z)^. At special values of the spectral parameter (z-w) , the ''R''-matrix degenerates to a rank one projection. This can be used to define the quantum determinant of T(z) , which generates the center of the Yangian. The twisted Yangian Y(''gl''''2N''), introduced by G. I. Olshansky, is the co-ideal generated by the coefficients of :\displaystyle where σ is the involution of ''gl''''2N'' given by :\displaystyle Quantum determinant is the center of Yangian.


Applications


Classical representation theory

G.I. Olshansky and I.Cherednik discovered that the Yangian of ''gl''''N'' is closely related with the branching properties of irreducible finite-dimensional representations of general linear algebras. In particular, the classical Gelfand–Tsetlin construction of a basis in the space of such a representation has a natural interpretation in the language of Yangians, studied by M.Nazarov and V.Tarasov. Olshansky, Nazarov and Molev later discovered a generalization of this theory to other
classical Lie algebra The classical Lie algebras are finite-dimensional Lie algebras over a field which can be classified into four types A_n , B_n , C_n and D_n , where for \mathfrak(n) the general linear Lie algebra and I_n the n \times n identity matrix: ...
s, based on the twisted Yangian.


Physics

The Yangian appears as a symmetry group in different models in physics. Yangian appears as a symmetry group of one-dimensional exactly solvable models such as spin chains
Hubbard model
and in models of one-dimensional
relativistic 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 ...
. The most famous occurrence is in planar supersymmetric Yang–Mills theory in four dimensions, where Yangian structures appear on the level of symmetries of operators,Spill, F. (2009). Weakly coupled N= 4 Super Yang-Mills and N= 6 Chern-Simons theories from u (2, 2) Yangian symmetry. Journal of High Energy Physics, 2009(03), 014, https://arxiv.org/abs/0810.3897 and
scattering amplitude In quantum physics, the scattering amplitude is the probability amplitude of the outgoing spherical wave relative to the incoming plane wave in a stationary-state scattering process.Plefka Jan Christoph Plefka (born 31 January 1968 in Hanau) is a German theoretical physicist working in the field of quantum field theory and string theory. Education After receiving the Abitur in Darmstadt and performing civil service in a hospital, Pl ...
.


Representation theory

Irreducible finite-dimensional representations of Yangians were parametrized by Drinfeld in a way similar to the highest weight theory in the representation theory of semisimple Lie algebras. The role of the
highest weight In the mathematical field of representation theory, a weight of an algebra ''A'' over a field F is an algebra homomorphism from ''A'' to F, or equivalently, a one-dimensional representation of ''A'' over F. It is the algebra analogue of a multiplic ...
is played by a finite set of ''Drinfeld polynomials''. Drinfeld also discovered a generalization of the classical
Schur–Weyl duality Schur–Weyl duality is a mathematical theorem in representation theory that relates irreducible finite-dimensional representations of the general linear and symmetric groups. It is named after two pioneers of representation theory of Lie groups, I ...
between representations of general linear and
symmetric group In abstract algebra, the symmetric group defined over any set is the group whose elements are all the bijections from the set to itself, and whose group operation is the composition of functions. In particular, the finite symmetric group \m ...
s that involves the Yangian of ''sl''''N'' and the degenerate
affine Hecke algebra In mathematics, an affine Hecke algebra is the algebra associated to an affine Weyl group, and can be used to prove Macdonald's constant term conjecture for Macdonald polynomials. Definition Let V be a Euclidean space of a finite dimension and \Si ...
(graded Hecke algebra of type A, in
George Lusztig George Lusztig (born ''Gheorghe Lusztig''; May 20, 1946) is an American-Romanian mathematician and Abdun Nur Professor at the Massachusetts Institute of Technology (MIT). He was a Norbert Wiener Professor in the Department of Mathematics from 1 ...
's terminology). Representations of Yangians have been extensively studied, but the theory is still under active development.


See also

*
Quantum affine algebra In mathematics, a quantum affine algebra (or affine quantum group) is a Hopf algebra that is a ''q''-deformation of the universal enveloping algebra of an affine Lie algebra. They were introduced independently by and as a special case of their g ...


Notes


References

* * * Translated in * Translated in * * * * {{cite journal , last1=Drummond , first1=James , first2=Johannes , last2=Henn , first3=Jan , last3=Plefka , year=2009 , title=Yangian Symmetry of Scattering Amplitudes in N = 4 super Yang-Mills Theory , journal=
Journal of High Energy Physics The ''Journal of High Energy Physics'' is a monthly peer-reviewed open access scientific journal covering the field of high energy physics. It is published by Springer Science+Business Media on behalf of the International School for Advanced Stu ...
, arxiv=0902.2987 , volume=2009 , issue=5 , pages=046 , doi=10.1088/1126-6708/2009/05/046, bibcode = 2009JHEP...05..046D , s2cid=15627964 Representation theory Quantum groups Exactly solvable models