Gluck twists on concordant or homotopic spheres

Abstract

Let M be a compact 4-manifold and let S and T be embedded 2-spheres in M, both with trivial normal bundle. We write MS and MT for the 4-manifolds obtained by the Gluck twist operation on M along S and T respectively. We show that if S and T are concordant, then MS and MT are s-cobordant, and so if π1(M) is good, then MS and MT are homeomorphic. Similarly, if S and T are homotopic then we show that MS and MT are simple homotopy equivalent. Under some further assumptions, we deduce that MS and MT are homeomorphic. We show that additional assumptions are necessary by giving an example where S and T are homotopic but MS and MT are not homeomorphic. We also give an example where S and T are homotopic and MS and MT are homeomorphic but not diffeomorphic.