Virtual signed Euler characteristics

Abstract

Roughly speaking, to any space M with perfect obstruction theory we associate a space N with symmetric perfect obstruction theory. It is a cone over M given by the dual of the obstruction sheaf of M, and contains M as its zero section. It is locally the critical locus of a function. More precisely, in the language of derived algebraic geometry, to any quasi-smooth space M we associate its (-1)-shifted cotangent bundle N. By localising from N to its C*-fixed locus M this gives five notions of virtual signed Euler characteristic of M: (1) The Ciocan-Fontanine-Kapranov/Fantechi-G\"ottsche signed virtual Euler characteristic of M defined using its own obstruction theory, (2) Graber-Pandharipande's virtual Atiyah-Bott localisation of the virtual cycle of N to M, (3) Behrend's Kai-weighted Euler characteristic localisation of the virtual cycle of N to M, (4) Kiem-Li's cosection localisation of the virtual cycle of N to M, (5) (-1)vd times by the topological Euler characteristic of M. Our main result is that (1)=(2) and (3)=(4)=(5). The first two are deformation invariant while the last three are not.