Relative Weyl Character formula, Relative Pieri formulas and Branching rules for Classical groups

Abstract

We give alternate proofs of the classical branching rules for highest weight representations of a complex reductive group G restricted to a closed regular reductive subgroup H, where (G,H) consist of the pairs (GL(n+1),GL(n)), (Spin(2n+1), Spin(2n)) and (Sp(2n),Sp(2)× Sp(2n-2)). Our proof is essentially a long division. The starting point is a relative Weyl character formula and our method is an inductive application of a relative Pieri formula. We also give a proof of the branching rule for the case of (Spin(2n), Spin(2n-1)), by a reduction to the case of (GL(n),GL(n-1)).