Geometry of Uhlenbeck partial compactification of orthogonal instanton spaces and the K-theoretic Nekrasov partition functions

Abstract

Let MKn be the moduli space of framed K-instantons over S4 with instanton number n when K is a compact simple Lie group of classical type. Let UKn be the Uhlenbeck partial compactification of MKn. A scheme structure on UKn is endowed by Donaldson as an algebro-geometric Hamiltonian reduction of ADHM data. In this paper, for K=SO(N,R), N5, we prove that UKn is an irreducible normal variety with smooth locus MKn. Hence, together with the author's previous result, the K-theoretic Nekrasov partition function for any simple classical group other than SO(3,R), is interpreted as a generating function of Hilbert series of the instanton moduli spaces. Using this approach we also study the case K=SO(4,R) which is the unique semisimple but non-simple classical group.