Some spherical function values for two-row tableaux and Young subgroups with three factors

Abstract

A Young subgroup of the symmetric group SN with three factors, is realized as the stabilizer Gn of a monomial xλ ( =x1λ1x2λ2·s xNλN) with λ=( d1n1,d2n2,d3n3) (meaning dj is repeated nj times, 1≤ j≤3), thus is isomorphic to the direct product Sn1×Sn2× Sn3. The orbit of xλ under the action of SN (by permutation of coordinates) spans a module Vλ% , the representation induced from the identity representation of Gn. The space Vλ decomposes into a direct sum of irreducible S% N-modules. The spherical function is defined for each of these, it is the character of the module averaged over the group Gn. This paper concerns the value of certain spherical functions evaluated at a cycle which has no more than one entry in each of the three intervals Ij=\ i:λi=dj\ ,1≤ j≤3. These values appear in the study of eigenvalues of the Heckman-Polychronakos operators in the paper by V. Gorin and the author (arXiv:2412:01938v1). The present paper determines the spherical function values for SN-modules V of two-row tableau type, corresponding to Young tableaux of shape [ N-k,k] . The method is based on analyzing the effect of a cycle on Gn-invariant elements of V. These are constructed in terms of Hahn polynomials in two variables.

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