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Motivic and cohomological stabilisation of the Quot scheme of points

Michele Graffeo, Sergej Monavari, Riccardo Moschetti, Andrea T. Ricolfi

Abstract

We prove that the motive of the punctual Quot scheme $\mathrm{Quot}^d(\mathscr O^{\oplus r}_{\mathbb A^n})_0$ stabilises, when $n \to \infty$, to $[\mathrm{Gr}(d-1,\infty)]\cdot \sum_{i=0}^{r-1}\mathbb L^{di}$. We similarly show that the Poincaré polynomial of the Quot scheme $ \mathrm{Quot}^d(\mathscr O^{\oplus r}_{\mathbb A^n})$ stabilises and we compute the limit in terms of the infinite Grassmannian. Finally, we prove that the motive of the nested Hilbert scheme stabilises to the motive of the infinite flag variety and we compute the cohomology ring in the limit. These results provide affirmative evidence to a question of Pandharipande concerning the cohomology of Quot schemes on $\mathbb A^\infty$.

Motivic and cohomological stabilisation of the Quot scheme of points

Abstract

We prove that the motive of the punctual Quot scheme stabilises, when , to . We similarly show that the Poincaré polynomial of the Quot scheme stabilises and we compute the limit in terms of the infinite Grassmannian. Finally, we prove that the motive of the nested Hilbert scheme stabilises to the motive of the infinite flag variety and we compute the cohomology ring in the limit. These results provide affirmative evidence to a question of Pandharipande concerning the cohomology of Quot schemes on .
Paper Structure (11 sections, 13 theorems, 81 equations)

This paper contains 11 sections, 13 theorems, 81 equations.

Key Result

Theorem A

Fix integers $d,r\geqslant 1$. There is an identity

Theorems & Definitions (29)

  • Theorem A: \ref{['main-A']}
  • Theorem B: \ref{['thm:purity']}, \ref{['cor:poincare']}
  • Theorem C: \ref{['thm:nested']}, \ref{['cor:nested-cohomology']}
  • Definition 2.1
  • Definition 2.2
  • Definition 2.3
  • Proposition 2.4
  • proof
  • Proposition 2.5
  • proof
  • ...and 19 more