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Donaldson = Seiberg-Witten from Mochizuki's formula and instanton counting

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arxiv 1001.5024 v1 pith:AKAJUMOG submitted 2010-01-27 math.DG hep-thmath.AG

Donaldson = Seiberg-Witten from Mochizuki's formula and instanton counting

classification math.DG hep-thmath.AG
keywords formulainvariantsmanifoldseiberg-wittensimpletypedonaldsonmochizuki
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We propose an explicit formula connecting Donaldson invariants and Seiberg-Witten invariants of a 4-manifold of simple type via Nekrasov's deformed partition function for the N=2 SUSY gauge theory with a single fundamental matter. This formula is derived from Mochizuki's formula, which makes sense and was proved when the 4-manifold is complex projective. Assuming our formula is true for a 4-manifold of simple type, we prove Witten's conjecture and sum rules for Seiberg-Witten invariants (superconformal simple type condition), conjectured by Mari\~no, Moore and Peradze.

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