Transverse and Legendrian invariants of cables in combinatorial link Floer homology

Abstract

We study the Ozsv\'ath-Szab\'o-Thurston transverse invariant in combinatorial link Floer homology for certain transverse cables Lp,q of transverse link L in S3. Transverse cables Lp,q are constructed from the grid diagram of L. The main result is θ(Lp,q)=0 if and only if θ(L)=0 for qp sufficiently large. We also prove a similar result for invariants of Legendrian knots. Our proof uses an inclusion map i of certain grid complexes associated to L and Lp,q. We use these results to generate many infinite families of examples of Legendrian and transversely non-simple topological link types.