Nearly fibered links with genus one

Abstract

We classify all the n-component links in the 3-sphere that bound a Thurston norm minimizing Seifert surface with Euler characteristic ()=n-2 and that are nearly fibered, which means that their rank of the maximal (collapsed) Alexander grading stop of the link Floer homology group HFL is equal to two. In other words, such a link L satisfies stop=n-()2=1, and in addition rk\:HFL*(L)[1]=2 and rk\:HFL*(L)[s]=0 for every s>1. The proof of the main theorem is inspired by the one of a similar recent result for knots by Baldwin and Sivek; and involves techniques from sutured Floer homology. Furthermore, we also compute the group HFL for each of these links.