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Perverse coherent sheaves on blow-up. III. Blow-up formula from wall-crossing

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arxiv 0911.1773 v3 pith:642WSPX2 submitted 2009-11-09 math.AG math-phmath.MP

Perverse coherent sheaves on blow-up. III. Blow-up formula from wall-crossing

classification math.AG math-phmath.MP
keywords blow-upsheavesarxivmoduliclassescoherentinvariantspartition
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In earlier papers arXiv:0802.3120, arXiv:0806.0463 of this series we constructed a sequence of intermediate moduli spaces $\bM^m(c)$ connecting a moduli space $M(c)$ of stable torsion free sheaves on a nonsingular complex projective surface and $\bM(c)$ on its one point blow-up. They are moduli spaces of perverse coherent sheaves on the blow-up. In this paper we study how Donaldson-type invariants (integrals of cohomology classes given by universal sheaves) change from $\bM^m(c)$ to $\bM^{m+1}(c)$, and then from $M(c)$ to $\bM(c)$. As an application we prove that Nekrasov-type partition functions satisfy certain equations which determine invariants recursively in second Chern classes. They are generalization of the blow-up equation for the original Nekrasov deformed partition function for the pure N=2 SUSY gauge theory, found and used to derive the Seiberg-Witten curves in arXiv:math/0306198.

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  1. Wall-crossing of Instantons on the Blow-up

    hep-th 2026-04 unverdicted novelty 6.0

    Instanton partition functions on the blow-up are given by chamber-dependent contour integrals over super-partitions selected by stability conditions, yielding explicit wall-crossing formulas that recover the Nakajima-...