Instanton Floer homology, sutures, and Heegaard diagrams

Abstract

This paper establishes a new technique that enables us to access some fundamental structural properties of instanton Floer homology. As an application, we establish, for the first time, a relation between the instanton Floer homology of a 3-manifold or a null-homologous knot inside a 3-manifold and the Heegaard diagram of that 3-manifold or knot. We further use this relation to compute the instanton knot homology of some families of (1,1)-knots, including all torus knots in S3, which were mostly unknown before. As a second application, we also study the relation between the instanton knot homology KHI(Y,K) and the framed instanton Floer homology I(Y). In particular, we prove the inequality C I(Y) CKHI(Y,K) for all rationally null-homologous knots K⊂ Y and we constructed a new decomposition of the framed instanton Floer homology of Dehn surgeries along K that corresponds to the decomposition along torsion spinc decompositions in monopole and Heegaard Floer theory.