Geometry and analysis of contact instantons and entanglement of Legendrian links I

Abstract

The purposes of the present paper are two-fold. Firstly we further develop the interplay between the contact Hamiltonian geometry and the geometric analysis of Hamiltonian-perturbed contact instantons with the Legendrian boundary condition, which is initiated by the present author in oh:contacton-Legendrian-bdy. We introduce the class of tame contact manifolds (M,λ), which includes compact ones but not necessarily compact, and establish uniform a priori C0-estimates for the contact instantons. Then we study the problem of estimating the Reeb-untangling energy of one Legendrian submanifold from another, and formulate a particularly designed parameterized moduli space for the study of the problem. We establish the Gromov-Floer-Hofer type convergence result for contact instantons of finite energy and construct its compactification of the moduli space, first by defining the correct energy and then by proving uniform a priori energy bounds in terms of the oscillation of the relevant contact Hamiltonian. Secondly, as an application of this geometry and analysis of contact instantons, we prove that the self Reeb-untangling energy of a compact Legendrian submanifold R in any tame contact manifold (M,λ) is greater than that of the period gap Tλ(M,R) of the Reeb chords of R. This is an optimal result in general. In a sequel oh:shelukhin-conjecture, we also prove Shelukhin's conjecture specializing to the Legendrianization of contactomorphisms of closedcoorientable contact manifold (Q,) and utilizing its Z2-symmetry as the fixed point set of anti-contact involution to overcome the nontameness of contact product M = Q × Q × R.