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arxiv: 2003.04429 · v3 · pith:JWW4ETOEnew · submitted 2020-03-09 · 🧮 math.AG

Virtual chi_(-y)-genera of Quot schemes on surfaces

classification 🧮 math.AG
keywords surfacescurvegeneravirtualclassesformulaquotschemes
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This paper studies the virtual $\chi_{-y}$-genera of Grothendieck's Quot schemes on surfaces, thus refining the calculations of the virtual Euler characteristics by Oprea-Pandharipande. We first prove a structural result expressing the equivariant virtual $\chi_{-y}$-genera of Quot schemes universally in terms of the Seiberg-Witten invariants. The formula is simpler for curve classes of Seiberg-Witten length $N$, which are defined in the paper. By way of application, we give complete answers in the following cases: (i) arbitrary surfaces for the zero curve class, (ii) relatively minimal elliptic surfaces for rational multiples of the fiber class, (iii) minimal surfaces of general type with $p_g>0$ for any curve classes. Furthermore, a blow up formula is obtained for curve classes of Seiberg-Witten length $N$. As a result of these calculations, we prove that the generating series of the virtual $\chi_{-y}$-genera are given by rational functions for all surfaces with $p_g>0$, addressing a conjecture of Oprea-Pandharipande. In addition, we study the reduced $\chi_{-y}$-genera for $K3$ surfaces and primitive curve classes with connections to the Kawai-Yoshioka formula.

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  1. Rationality of cohomological descendent series for Quot schemes on surfaces with $p_g=0$

    math.AG 2026-04 unverdicted novelty 6.0

    Cohomological descendent series for Quot schemes on surfaces with pg=0 are rational for nonzero beta and N>1.