On gauge groups over high dimensional manifolds and self-equivalences of H-spaces

Abstract

Let Y be a pointed space and let E(Yr) be the group of based self-equivalences of Yr, r≥ 2. For Y a homotopy commutative H-group we construct a subgroup EMat(Yr) of E(Yr) which has a group structure isomorphic to either GLr( Z), or GLr( Zd), d≥ 2. We classify principal bundles over connected sums of q-sphere bundles over n-spheres and use the group EMat(Yr) to obtain homotopy decompositions of their gauge groups. Using these decompositions we give an integral classification, up to homotopy, of the gauge groups of principal SU(2)-bundles over certain 2-connected 7-manifolds with torsion-free homology.