Two contact surgery diagrams represent contactomorphic manifolds if and only if they are related by planar isotopies, Legendrian Reidemeister moves, cancelling pairs, handle slides, lantern moves, and chain moves.
An algorithm to Legendrian realize a curve on a ribbon surface
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abstract
We give an explicit algorithm to Legendrian realize a homologically nontrivial simple closed curve on a ribbon surface of a Legendrian graph in the standard contact structure $(\mathbb{R}^3,\xi_{\rm st})$. As an application, we obtain an algorithm that converts an abstract open book whose monodromy is written as a product of Dehn twists along homologically nontrivial curves into a contact surgery diagram for the supported contact manifold. Along the way, we also record a uniqueness statement which is implicit in earlier work but, to our knowledge, was never written in the form needed here: any two Legendrian realizations of the same curve on a ribbon surface are Legendrian isotopic, and likewise for Legendrian knots lying on pages of open books and representing the same isotopy class on the page.
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math.GT 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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A contact version of Kirby's theorem
Two contact surgery diagrams represent contactomorphic manifolds if and only if they are related by planar isotopies, Legendrian Reidemeister moves, cancelling pairs, handle slides, lantern moves, and chain moves.