A combinatorial definition of the Theta-invariant from Heegaard diagrams

Abstract

The invariant is an invariant of rational homology 3-spheres M equipped with a combing X over the complement of a point. It is related to the Casson-Walker invariant λ by the formula (M,X)=6λ(M)+p1(X)/4, where p1 is an invariant of combings that is simply related to a Gompf invariant. In [arXiv:1209.3219], we proved a combinatorial formula for the -invariant in terms of Heegaard diagrams, equipped with decorations that define combings, from the definition of as an algebraic intersection in a configuration space. In this article, we prove that this formula defines an invariant of pairs (M,X) without referring to configuration spaces, and we prove that this invariant is the sum of 6 λ(M) and p1(X)/4 for integral homology spheres, by proving surgery formulae both for the combinatorial invariant and for p1.