Every contact manifold can be given a non-fillable contact structure

Abstract

Recently Francisco Presas Mata constructed the first examples of closed contact manifolds of dimension larger than 3 that contain a plastikstufe, and hence are non-fillable. Using contact surgery on his examples we create on every sphere S2n-1, n>1, an exotic contact structure - that also contains a plastikstufe. As a consequence, every closed contact manifold M (except S1) can be converted into a contact manifold that is not (semi-positively) fillable by taking the connected sum of M with (S2n-1,-).

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