Add to ORKGMultivariate orthogonal polynomials of Macdonald are an important tool to study a variety of topics in modern mathematical physics, such as chiral algebras, three-dimensional topological theories of Chern-Simons type, five-dimensional supersymmetric Yang-Mills theories, and others. We describe several recent applications of Macdonald polynomials, based on original research contributions. Introduction gives an overview of Macdonald theory, with a view towards applications. In Chapter 2, we discuss a Macdonald deformation of three-dimensional Chern-Simons topological field theory and construct it explicitly in the case of Heegaard splitting of genus one. The resulting knot invariants turn out to be related to the recently developed theory of ...
The clustering properties of Jack polynomials are involved in the theoretical study of the fractiona...
AbstractIn the basic representation of[formula]realized via the algebra of symmetric functions, we c...
In a series of papers with S. Naito, D. Sagaki, A. Schilling, and M. Shimozono, we developed two uni...
This reissued classic text is the acclaimed second edition of Professor Ian Macdonald's groundbreaki...
A remarkable feature of Schur functions—the common eigenfunctions of cut-and-join operators from $$W...
This chapter gives an expository account of some unexpected connections which have arisen over the l...
The theory of symmetric functions is ubiquitous throughout mathematics. They arise naturally in comb...
Perhaps the nicest multivariate orthogonal polynomials are the Macdonald and Koornwinder polynomials...
Perhaps the nicest multivariate orthogonal polynomials are the Macdonald and Koornwinder polynomials...
Deposited with permission of the author © 2008 Robin Langer.The ring of symmetric functions Λ, with ...
Abstract We find new universal factorization identities for generalized Macdonald polynomials on the...
85 pages, 5 figuresInternational audienceThis paper defines and investigates nonsymmetric Macdonald ...
We define cylindric generalisations of skew Macdonald functions when one of their parameters is set ...
The clustering properties of Jack polynomials are involved in the theoretical study of the fractiona...
Refined Chern-Simons invariants of torus knots can be defined by using modular matrices associated t...
The clustering properties of Jack polynomials are involved in the theoretical study of the fractiona...
AbstractIn the basic representation of[formula]realized via the algebra of symmetric functions, we c...
In a series of papers with S. Naito, D. Sagaki, A. Schilling, and M. Shimozono, we developed two uni...
This reissued classic text is the acclaimed second edition of Professor Ian Macdonald's groundbreaki...
A remarkable feature of Schur functions—the common eigenfunctions of cut-and-join operators from $$W...
This chapter gives an expository account of some unexpected connections which have arisen over the l...
The theory of symmetric functions is ubiquitous throughout mathematics. They arise naturally in comb...
Perhaps the nicest multivariate orthogonal polynomials are the Macdonald and Koornwinder polynomials...
Perhaps the nicest multivariate orthogonal polynomials are the Macdonald and Koornwinder polynomials...
Deposited with permission of the author © 2008 Robin Langer.The ring of symmetric functions Λ, with ...
Abstract We find new universal factorization identities for generalized Macdonald polynomials on the...
85 pages, 5 figuresInternational audienceThis paper defines and investigates nonsymmetric Macdonald ...
We define cylindric generalisations of skew Macdonald functions when one of their parameters is set ...
The clustering properties of Jack polynomials are involved in the theoretical study of the fractiona...
Refined Chern-Simons invariants of torus knots can be defined by using modular matrices associated t...
The clustering properties of Jack polynomials are involved in the theoretical study of the fractiona...
AbstractIn the basic representation of[formula]realized via the algebra of symmetric functions, we c...
In a series of papers with S. Naito, D. Sagaki, A. Schilling, and M. Shimozono, we developed two uni...