Convex bodies associated to actions of reductive groups

TL;DR

This paper introduces convex bodies linked to graded G-algebras for reductive groups, providing new tools to analyze Hilbert functions, multiplicities, and volumes of line bundles, extending classical geometric and representation-theoretic results.

Contribution

It extends the concept of convex bodies and measures to a broad class of graded G-algebras, generalizing existing formulas and inequalities to arbitrary G-varieties and line bundles.

Findings

Defined convex bodies for graded G-algebras.

Extended Duistermaat-Heckman measure and proved a Fujita approximation.

Generalized Brion-Kazarnowski formula for G-varieties.

Abstract

We associate convex bodies to a wide class of graded G-algebras where G is a connected reductive group. These convex bodies give information about the Hilbert function as well as multiplicities of irreducible representations appearing in the graded algebra. We extend the notion of Duistermaat-Heckman measure to graded G-algebras and prove a Fujita type approximation theorem and a Brunn-Minkowski inequality for this measure. This in particular applies to arbitrary G-line bundles giving an equivariant version of the theory of volumes of line bundles. We generalize the Brion-Kazarnowski formula for the degree of a spherical variety to arbitrary G-varieties. Our approach follows some of the previous works of A. Okounkov. We use the asymptotic theory of semigroups of integral points and Newton-Okounkov bodies developed in our ealier work arXiv:0904.3350