English

Virtual localization revisited

Algebraic Geometry 2025-04-22 v3

Abstract

Let TT be a split torus acting on an algebraic scheme XX with fixed locus ZZ. Edidin and Graham showed that on localized TT-equivariant Chow groups, (a) push-forward ii_* along i:ZXi : Z \to X is an isomorphism, and (b) when XX is smooth the inverse (i)1(i_*)^{-1} can be described via Gysin pullback i!i^! and cap product with e(N)1e(N)^{-1}, the inverse of the Euler class of the normal bundle NN. In this paper we show that (b) still holds when XX is a quasi-smooth derived scheme (or Deligne-Mumford stack), using virtual versions of the operations i!i^! and ()e(N)1(-)\cap e(N)^{-1}. As a corollary we prove the virtual localization formula [X]vir=i([Z]vire(Nvir)1)[X]^{vir} = i_* ([Z]^{vir} \cap e(N^{vir})^{-1}) of Graber-Pandharipande without global resolution hypotheses and over arbitrary base fields. We include an appendix on fixed loci of group actions on (derived) stacks which should be of independent interest.

Cite

@article{arxiv.2207.01652,
  title  = {Virtual localization revisited},
  author = {Dhyan Aranha and Adeel A. Khan and Alexei Latyntsev and Hyeonjun Park and Charanya Ravi},
  journal= {arXiv preprint arXiv:2207.01652},
  year   = {2025}
}

Comments

46 pages, new title and improved exposition; material on stacky concentration and cosection localization will reappear elsewhere

R2 v1 2026-06-24T12:13:44.502Z