On reductive subgroups of reductive groups having invariants in almost all representations

Abstract

Let G and G be connected complex reductive Lie groups, G semisimple. Let + be the monoid of dominant weights for a positive root system +, and let l(w) be the length of a Weyl group element w. Let Vλ denote an irreducible G-module of highest weight λ∈+. For any closed embedding : G⊂ G, we consider Property (A): ∀λ∈+,∃ q∈N such that Vqλ G0. A necessary condition for (A) is for G to have no simple factors to which G projects surjectively. We show that this condition is sufficient if G is of type A1 or E8. We define and study an integral invariant of a root system, G=\λ:λ∈+\0\\, where λ=\l(w):wλ Cone(+)\. We derive the following sufficient condition for (A), independent of : G - \#+ > 0 \;\; (A). We compute G and related data for all simple G, except E8, where we obtain lower and upper bounds. We consider a stronger property (A-k) defined in terms of Geometric Invariant Theory, related to extreme values of codimensions of unstable loci, and derive a sufficient condition in the form G - \#+ > k. The invariant G proves too week to handle G=SLn and we employ a companion G sd to infer (A-k) for a larger class of subgroups. We derive corollaries on Mori-theoretic properties of GIT-quotients.

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