"We describe a method, based on the theory of Macdonald-Koornwinder polynomials, for proving bounded Littlewood identities. Our approach provides an alternative to Macdonald's partial fraction technique and results in the first examples of bounded Littlewood identities for Macdonald polynomials. These identities, which take the form of decomposition formulas for Macdonald polynomials of type (R, S) in terms of ordinary Macdonald polynomials, are q, t-analogues of known branching formulas for characters of the symplectic, orthogonal and special orthogonal groups. In the classical limit, our method implies that MacMahon's famous ex-conjecture for the generating function of symmetric plane partitions in a box follows from the identification of GL(n,R), O(n)as a Gelfand pair. As further applications, we obtain combinatorial formulas for characters of affine Lie algebras; Rogers-Ramanujan identities for affine Lie algebras, complementing recent results of Griffin et al.; and quadratic transformation formulasfor Kaneko-Macdonald-type basic hypergeometric series"--
Rains and Warnaar describe a method, based on the theory of Macdonald-Koornwinder polynomials, for proving bounded Littlewood identities. Their approach provides an alternative to Macdonald's partial fraction technique, and results in the first examples of bounded Littlewood identities for Macdonald polynomials. These identities take the form of decomposition formulas for Macdonald polynomials of type (R,S) in terms of ordinary Macdonald polynomials, they say, and are q,t-analogues of known branching formulas for characters of the symplectic, orthogonal, and special orthogonal groups. They include applications and open questions. Annotation ©2021 Ringgold, Inc., Portland, OR (protoview.com)
