Localization and the link Floer homology of doubly-periodic knots

Abstract

A knot K ⊂ S3 is q-periodic if there is a Zq-action preserving K whose fixed set is an unknot U. The quotient of K under the action is a second knot K. We construct equivariant Heegaard diagrams for q-periodic knots, and show that Murasugi's classical condition on the Alexander polynomials of periodic knots is a quick consequence of these diagrams. For K a two-periodic knot, we show there is a spectral sequence whose E1 page is HFL(S3,K U) V (2n-1)) Z2((θ)) and whose E∞ pages is isomorphic to (HFL(S3,K U) V (n-1)) Z2((θ)), as Z2((θ))-modules, and a related spectral sequence whose E1 page is (HFK(S3,K) V (2n-1) W) Z2((θ)) and whose E∞ page is isomorphic to (HFK(S3,K) V (n-1) W) Z2((θ)). As a consequence, we use these spectral sequences to recover a classical lower bound of Edmonds on the genus of K, along with a weak version of a classical fibredness result of Edmonds and Livingston.