Naturality of Legendrian LOSS invariant under positive contact surgery

Abstract

Ozsvath and Stipsicz showed that the LOSS invariant is natural under +1 contact surgery. We extend their result and prove the naturality of the LOSS invariant of a Legendrian L under any positive integer contact surgery along another Legendrian S . In addition, when S is rationally null-homologous, we also entirely characterize the Spinc structure in the surgery cobordism that makes the naturality of contact invariant or LOSS invariant (without conjugation ambiguity). In particular this implies that contact invariant of the +n contact surgery along a rationally null-homologous Legendrian S depends only on the classical invariants of S. The additional generalityprovided by those results allows us to prove that if two Legendrian knots have different LOSS invariants then after adding the same positive twists to each in a suitable sense, the two new Legendrian knots will also have different LOSS invariants. This leads to new infinite families of examples of Legendrian (or transverse) non-simple knots that are distinguished by their LOSS invariants.