Applications of the L-space satellite formula

Abstract

We give a formula for the τ-invariant of a satellite knot P(K,n) when P is an L-space satellite operator. Our formula holds for general L-space satellite operators P when the companion K satisfies ε(K)=1. When ε(K) is 0 or -1, we state a formula which requires some additional assumptions on P or n. Our main tool is our algorithm which computes the knot Floer complex of satellite knots constructed using L-space satellite operators, which we developed in a previous paper. Our formula for τ recovers many existing formulas for the behavior of τ under satellite operators, including for cables. We apply our formula to questions about the slice genus of satellite knots, showing, e.g., that if K is a knot with τ(K)=g4(K)>0, then satellites of K by L-space satellite operators have the same property. Another application is a proof that L-space satellite operators satisfy a conjecture of Hedden and Pinz\'on-Caicedo: If P is an L-space satellite operator which acts as a group homomorphism on the smooth concordance group, then P is either the zero operator, the identity operator, or the orientation reversing operator.