Branched covers of quasipositive links and L-spaces

Abstract

Let L be a oriented link such that n(L), the n-fold cyclic cover of S3 branched over L, is an L-space for some n ≥ 2. We show that if either L is a strongly quasipositive link other than one with Alexander polynomial a multiple of (t-1)2g(L) + (|L|-1), or L is a quasipositive link other than one with Alexander polynomial divisible by (t-1)2g4(L) + (|L|-1), then there is an integer n(L), determined by the Alexander polynomial of L in the first case and the Alexander polynomial of L and the smooth 4-genus of L, g4(L), in the second, such that n ≤ n(L). If K is a strongly quasipositive knot with monic Alexander polynomial such as an L-space knot, we show that n(K) is not an L-space for n ≥ 6, and that the Alexander polynomial of K is a non-trivial product of cyclotomic polynomials if n(K) is an L-space for some n = 2, 3, 4, 5. Our results allow us to calculate the smooth and topological 4-ball genera of, for instance, quasi-alternating quasipositive links. They also allow us to classify strongly quasipositive alternating links and 3-strand pretzel links.