Connected sums and finite energy foliations I: Contact connected sums

Abstract

We consider a 3-manifold M equipped with nondegenerate contact form λ and compatible almost complex structure J. We show that if the data (M, λ, J) admits a stable finite energy foliation, then for a generic choice of distinct points p, q∈ M, the manifold M' formed by taking the connected sum at p and q admits a nondegenerate contact form λ' and compatible almost complex structure J' so that the data (M', λ', J') also admits a stable finite energy foliation. Along the way, we develop some general theory for the study of finite energy foliations.