4-manifolds with boundary and fundamental group Z
Abstract
We classify topological 4-manifolds with boundary and fundamental group Z, under some assumptions on the boundary. We apply this to classify surfaces in simply-connected 4-manifolds with S3 boundary, where the fundamental group of the surface complement is Z. We then compare these homeomorphism classifications with the smooth setting. For manifolds, we show that every Hermitian form over Z[t 1] arises as the equivariant intersection form of a pair of exotic smooth 4-manifolds with boundary and fundamental group Z. For surfaces we have a similar result, and in particular we show that every 2-handlebody with S3 boundary contains a pair of exotic discs.
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