Taut foliations, braid positivity, and unknot detection
Abstract
We study positive braid knots (the knots in the three-sphere realized as positive braid closures) through the lens of the L-space conjecture. This conjecture predicts that if K is a non-trivial positive braid knot, then for all r < 2g(K)-1, the 3-manifold obtained via r-framed Dehn surgery along K admits a taut foliation. Our main result provides some positive evidence towards this conjecture: we construct taut foliations in such manifolds whenever r<g(K)+1. As an application, we produce a novel braid positivity obstruction for cable knots by proving that the (n, 1)-cable of a knot K is braid positive if and only if K is the unknot. We also present some curious examples demonstrating the limitations of our construction; these examples can also be viewed as providing some negative evidence towards the L-space conjecture. Finally, we apply our main result to produce taut foliations in some splicings of knot exteriors.
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