Homotopy types of SU(n)-gauge groups over non-spin 4-manifolds
Abstract
Let M be an orientable, simply-connected, closed, non-spin 4-manifold and let Gk(M) be the gauge group of the principal G-bundle over M with second Chern class k∈Z. It is known that the homotopy type of Gk(M) is determined by the homotopy type of Gk(CP2). In this paper we investigate properties of Gk(CP2) when G = SU(n) that partly classify the homotopy types of the gauge groups.
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