Involutive knot Floer homology and bordered modules

Abstract

We prove that, up to local equivalences, a suitable truncation of the involutive knot Floer homology of a knot in S3 and the involutive bordered Heegaard Floer theory of its complement determine each other. In particular, given two knots K1 and K2, we prove that the F2[U,V]/(UV)-coefficient involutive knot Floer homology of K1 -K2 is K-locally trivial if CFD(S3 K1) and CFD(S2 K2) satisfy a certain condition which can be seen as the bordered counterpart of K-local equivalence. We further establish an explicit algebraic formula that computes the hat-flavored truncation of the involutive knot Floer homology of a knot from the involutive bordered Floer homology of its complement. It follows that there exists an algebraic satellite operator defined on the local equivalence group of knot Floer chain complexes, which can be computed explicitly up to a suitable truncation.