Character factorizations for representations of GL(n,C)

Abstract

We give another proof of a theorem of D. Prasad (Theorem 2, Israel J. Math. 2016), which is also a classical result of Littlewood--Richardson (Theorem VI, Q. J. Math. 1934). For integers m,n 2, this result calculates the character of an irreducible representation of (mn,) at diagonal elements with eigenvalues ωj-1nti for 1 i m, 1 j n, where ωn=e2π /n, expressing it as a product of certain characters for (m,) evaluated at tn= diag(t1n,t2n,…,tmn). Unlike previous approaches that rely on determinantal identities, our proof utilizes a direct combinatorial cancellation argument within the Weyl group.