Knot Floer homology and fixed points
Abstract
If K is a fibered knot in a closed, oriented 3--manifold Y with fiber F, and HFK(Y,K,[F], g(F)-1; Z/2 Z) has rank r, then the monodromy of K is freely isotopic to a diffeomorphism with at most r-1 fixed points. This generalizes earlier work of Baldwin--Hu--Sivek and Ni. We also clarify a misleading formula in Cotton-Clay's computation of the symplectic Floer homology of mapping classes of surfaces.
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