Infinite homotopy stable class for 4-manifolds with boundary
Abstract
We show that for every odd prime q, there exists an infinite family \Mi\i=1∞ of topological 4-manifolds that are all stably homeomorphic to one another, all the manifolds Mi have isometric rank one equivariant intersection pairings and boundary L(2q, 1) # (S1 × S2), but they are pairwise not homotopy equivalent via any homotopy equivalence that restricts to a homotopy equivalence of the boundary.
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