Taut foliations from double-diamond replacements

Abstract

A 3-manifold is foliar if it supports a codimension-one co-oriented taut foliation. Suppose M is an oriented 3-manifold with connected boundary a torus, and suppose M contains a properly embedded, compact, oriented, surface R with a single boundary component that is Thurston norm minimizing in H2(M, ∂ M). We define a readily recognizable type of sutured manifold decomposition, which for notational reasons we call double-diamond taut, and show that if R admits a double-diamond taut sutured manifold decomposition, then every boundary slope except one is strongly realized by a co-oriented taut foliation; that is, the foliation intersects ∂ M transversely in a foliation by curves of that slope. In the case that M is the complement of a knot in S3, the exceptional filling is the meridional one, and hence is persistently foliar, by which we mean that every non-trivial slope is strongly realized; hence, restricting attention to rational slopes, every manifold obtained by non-trivial Dehn surgery along is foliar. In particular, if R is a Murasugi sum of surfaces R1 and R2, where R2 is an unknotted band with an even number 2m 4 of half-twists, then = ∂ R is persistently foliar.