A refined Weyl character formula for comodules on GL2,A

Abstract

Let A be any commutative unital ring and let GL2,A be the general linear group scheme on A of rank 2. We study the representation theory of GL2,A and the symmetric powers Symd(V), where (V, ) is the standard right comodule on GL2,A. We prove a refined Weyl character formula for Symd(V). There is for any integer d ≥ 1 a (canonical) refined weight space decomposition Symd(V) i Symd(V)i where each direct summand Symd(V)i is a comodule on N ⊂eq GL2,A. Here N is the schematic normalizer of the diagonal torus T ⊂eq GL2,A. We prove a character formula for the direct summands of Symd(V) for any integer d ≥ 1. This refined Weyl character formula implies the classical Weyl character formula. As a Corollary we get a refined Weyl character formula for the pull back Symd(V K) as a comodule on GL2,K where K is any field. We also calculate explicit examples involving the symmetric powers, symmetric tensors and their duals. The refined weight space decomposition exists in general for group schemes such as GL2,A and SL2,A. The study may have applications to the study of groups G such as SL(n,k) and GL(n,k) and quotients G/H where k is an arbitrary field (or a Dedekind domain) and H ⊂eq G is a closed subgroup. The refined weight space decomposition of Sλ(V) has a relation with irreducible module over a field of positive characteristic. In an example I prove it recovers the irreducible module V(λ) ⊂neq Sλ(V).

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