Holomorphic bundles on the blown-up plane and the bar construction

Abstract

We study the moduli space Mkr( P2\!q) of rank r holomorphic bundles with trivial determinant and second Chern class c2=k, over the blowup P2\!q of the projective plane at q points, trivialized on a rational curve. We show that, for k=1,2, we have a homotopy equivalence between Mkr( P2\!q) and the degree k component of the bar construction B( Mr P2,( Mr P2)q,( Mr P\!12)q). The space Mkr( P2\!q) is isomorphic to the moduli space M Ikr(Xq) of charge k based SU(r) instantons on a connected sum Xq of q copies of P2 and we show that, for k=1,2, we have a homotopy equivalence between M Ikr(Xq\# Xs) and the degree k component of B( M Ir(Xq), M Ir(S4), M Ir(Xs)). Analogous results hold in the limit when k∞. As an application we obtain upper bounds for the cokernel of the Atiyah-Jones map in homology, in the rank-stable limit.