The Rank Stable Topology of Instantons on
Abstract
Let kn be the moduli space of based (anti-self-dual) instantons on of charge k and rank n. There is a natural inclusion of rank n instantons into rank n+1. We show that the direct limit space is homotopy equivalent to BU(k)× BU(k). The moduli spaces also have the following algebro-geometric interpretation: Let be a line in the complex projective plane and consider the blow-up at a point away from . kn can be described as the moduli space of rank n holomorphic bundles on the blownup projective plane with c1=0 and c2=k and with a fixed holomorphic trivialization on .
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