On transversally simple knots

Abstract

Final revision. To appear in the Journal of Differential Geometry. This paper studies knots that are transversal to the standard contact structure in 3, bringing techniques from topological knot theory to bear on their transversal classification. We say that a transversal knot type is transversally simple if it is determined by its topological knot type and its Bennequin number. The main theorem asserts that any whose associated satisfies a condition that we call exchange reducibility is transversally simple. As a first application, we prove that the unlink is transversally simple, extending the main theorem in El. As a second application we use a new theorem of Menasco (Theorem 1 of Me) to extend a result of Etnyre Et to prove that iterated torus knots are transversally simple. We also give a formula for their maximum Bennequin number. We show that the concept of exchange reducibility is the simplest of the constraints that one can place on in order to prove that any associated is transversally simple. We also give examples of pairs of transversal knots that we conjecture are not transversally simple.

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