Generalised doubles and simple homotopy types of high dimensional manifolds

Abstract

We characterise the set of fundamental groups for which there exist n-manifolds that are h-cobordant (hence homotopy equivalent) but not simple homotopy equivalent, when n is sufficiently large. In particular, for n 12 even, we show that examples exist for any finitely presented group G such that the involution on the Whitehead group Wh(G) is nontrivial. This expands on previous work, where we constructed the first examples of even-dimensional manifolds that are homotopy equivalent but not simple homotopy equivalent. Our construction is based on doubles of thickenings, and a key ingredient of the proof is a formula for the Whitehead torsion of a homotopy equivalence between such manifolds.