Rational surgery exact triangles in Heegaard Floer homology

Abstract

We construct a new family of surgery exact triangles in Heegaard Floer theory over the field with two elements. This family generalizes both Ozsv\'ath and Szab\'o's n- and 1/n-surgery exact triangles for positive integers n and the author's recent 2-surgery exact triangle to all positive rational slopes. The construction reduces to a combinatorial problem that involves triangle and quadrilateral counting maps in a genus 1 Heegaard diagram. The main contribution of this paper is solving this combinatorial problem, which is particularly tricky for slopes r≠ n,1/n; one key idea is to use an involution that is closely related to the Spinc conjugation symmetry.