Contact action functional, calculus of variation and canonical generating function of Legendrian submanifolds

Abstract

In the present paper, we formulate a contact analogue on the one-jet bundle J1B of Weinstein's observation which reads the classical action functional on the cotangent bundle is a generating function of any Hamiltonian isotope of the zero section. We do this by identifying the correct action functional which is defined on the space of Hamiltonian-translated (piecewise smooth) horizontal curves of the contact distribution, which we call the Carnot path space. Then we give a canonical construction of the Legendrian generating function which is the Legendrian counterpart of Laudenbach-Sikorav's canonical construction of the generating function of Hamiltonian isotope of the zero section on the cotangent bundle which utilizes a finite dimensional approximation of the action functional. Motivated by this construction, we develop a Floer theoretic construction of spectral invariants for the Legendrian submanifolds in the sequel [OY] which is the contact analog to the construction given in [Oh97, Oh99] for the Lagrangian submanifolds in the cotangent bundle.