On Legendrian representatives of non-fibered knots
Abstract
We show that in (S3,std) if K is a non-trivial knot that realizes the three-dimensional Thurston-Bennequin bound (i.e. K has a Legendrian representative with tb()-rot()=2g(K)-1), then K has a Legendrian representative L with tb=0. Moreover, this result can be easily generalized to contact manifolds that uniquely represent the associated contact invariants. This is the first result on Legendrian representatives of non-fibered knots in 3-manifolds other than S3. We also show that if K is a nearly fibered knot in S3 then τ(K)=g(K) implies that K realizes the three-dimensional Thurston-Bennequin bound.
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