Locally equivalent Floer complexes and unoriented link cobordisms

Abstract

We show that the local equivalence class of the collapsed link Floer complex cCFL∞(L), together with many -type invariants extracted from this group, is a concordance invariant of links. In particular, we define a version of the invariants L(t) and +(L) when L is a link and we prove that they give a lower bound for the slice genus g4(L). Furthermore, in the last section of the paper we study the homology group HFL'(L) and its behaviour under unoriented cobordisms. We obtain that a normalized version of the -set, introduced by Ozsv\'ath, Stipsicz and Szab\'o, produces a lower bound for the 4-dimensional smooth crosscap number γ4(L).