Biaynicki-Birula decomposition for reductive groups

Abstract

We generalize the Biaynicki-Birula decomposition from actions of Gm on smooth varieties to actions of linearly reductive group G on finite type schemes and algebraic spaces. We also provide a relative version and briefly discuss the case of algebraic stacks. We define the Biaynicki-Birula decomposition functorially: for a fixed G-scheme X and a monoid G which partially compactifies G, the BB decomposition parameterizes G-schemes over X for which the G-action extends to the G-action. The freedom of choice of G makes the theory richer than the Gm-case.