Maximal Page Crossing Numbers of Legendrian Surfaces in Closed Contact 5-Manifolds

Abstract

We introduce a new Legendrian isotopy invariant for any closed orientable Legendrian surface L embedded in a closed contact 5-manifold (M, ) which admits an "admissable" open book (B, f) (supporting ) for L. We show that to any such L and a fixed page X, one can assign an integer MPX(L), called "Relative Maximal Page Crossing Number of L with respect to X", which is invariant under Legendrian isotopies of L. We also show that one can extend this to a page-free invariant, i.e., one can assign an integer MP(B,f)(L), called "Absolute Maximal Page Crossing Number of L with respect to (B, f)", which is invariant under Legendrian isotopies of L. In particular, this new invariant distinguishes Legendrian surfaces in the standard five-sphere which can not be distinguished by Thurston-Bennequin invariant.