Non-integer characterizing slopes and knot Floer homology

Abstract

Conjecturally, a knot in the 3-sphere has only finitely many non-integer non-characterizing slopes. We verify this conjecture for all knots with knot Floer homology satisfying certain simplicity conditions. The class of knots satisfying our notion of simplicity includes alternating knots, L-space knots and the vast majority of knots with at most 12 crossings. For arbitrary knots in the 3-sphere we show that almost all slopes p/q with |q|≥ 3 are characterizing. In addition, we show that all L-space knots and almost L-space knots have infinitely many integer characterizing slopes.