Murphy's law on a fixed locus of the Quot scheme

Abstract

Let T := Gmd be the torus acting on the Quot scheme of points n QuotOr/Ad/Zn via the standard action on Ad. We analyze the fixed locus of the Quot scheme under this action. In particular we show that for d ≤ 2 or r ≤ 2, this locus is smooth, and that for d ≥ 4 and r ≥ 3 it satisfies Murphy's law as introduced by Vakil, meaning that it has arbitrarily bad singularities. These results are obtained by giving a decomposition of the fixed locus into connected components, and identifying the components with incidence schemes of subspaces of Pr-1. We then obtain a characterization of the incidence schemes which occur, in terms of their graphs of incidence relations.