English

Support Varieties and stable categories for algebraic groups

Representation Theory 2022-05-25 v2

Abstract

We consider rational representations of a connected linear algebraic group G\mathbb G over a field kk of positive characteristic p>0p > 0. We introduce a natural extension MΠ(G)MM \mapsto \Pi(\mathbb G)_M to G\mathbb G-modules of the π\pi-point support theory for modules MM for a finite group scheme GG and show that this theory is essentially equivalent to the more "intrinsic" and "explicit" theory MPC(G)MM \mapsto \mathbb P\mathfrak C(\mathbb G)_M of supports for an algebraic group of exponential type, a theory which uses 1-parameter subgroups GaG\mathbb G_a \to \mathbb G. We extend our support theory to bounded complexes of G\mathbb G-modules, CΠ(G)CC^\bullet \mapsto \Pi(\mathbb G)_{C^\bullet}. We introduce the tensor triangulated category StMod(G)StMod(\mathbb G), the Verdier quotient of the bounded derived category Db(Mod(G))D^b(Mod(\mathbb G)) by the thick subcategory of mock injective modules. Our support theory satisfies all the standard properties" for a theory of supports for StMod(G)StMod(\mathbb G). As an application, we employ CΠ(G)CC^\bullet \mapsto \Pi(\mathbb G)_{C^\bullet} to establish the classification of (r)(r)-complete, thick tensor ideals of stmod(G)stmod(\mathbb G) in terms of stmod(G)stmod(\mathbb G)-realizable subsets of Π(G)\Pi(\mathbb G) and the classification of (r)(r)-complete, localizing subcategories of StMod(G)StMod(\mathbb G) in terms of StMod(G)StMod(\mathbb G)-realizable subsets of Π(G)\Pi(\mathbb G).

Keywords

Cite

@article{arxiv.2112.10382,
  title  = {Support Varieties and stable categories for algebraic groups},
  author = {Eric M. Friedlander},
  journal= {arXiv preprint arXiv:2112.10382},
  year   = {2022}
}

Comments

This version differs from the original in its organization, formulation of results, and proofs

R2 v1 2026-06-24T08:24:09.880Z