Homotopy types of gauge groups over non-simply-connected closed 4-manifolds

Abstract

Let G be a simply-connected simple compact Lie group and let M be an orientable smooth closed 4-manifold. In this paper we calculate the homotopy type of the suspension of M and the homotopy types of the gauge groups of principal G-bundles over M when π1(M) is: (1)~Z*m, (2)~Z/prZ, or (3)~Z*m*(*nj=1Z/pjrjZ), where p and the pj's are odd primes.