On filings of ∂(V× D)
Abstract
We show that any symplectically aspherical/Calabi-Yau filling of Y:=∂(V× D) has vanishing symplectic cohomology for any Liouville domain V. In particular, we make no topological requirement on the filling and c1(V) can be nonzero. Moreover, we show that for any symplectically aspherical/Calabi-Yau filling W of Y, the interior W is diffeomorphic to the interior of V× D if π1(Y) is abelian and V 4. And W is diffeomorphic to V× D if moreover the Whitehead group of π1(Y) is trivial.
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