Riemannian distance and symplectic embeddings in cotangent bundle

Abstract

Given an open neighborhood W of the zero section in the cotangent bundle of N we define a distance-like function W on N using certain symplectic embeddings from the standard ball B2n(r) to W. We show that when W is the unit disc-cotangent bundle of a Riemannian metric on N, W recovers the metric. As an intermediate step, we give a new construction of the ball of capacity 4 to the product of Lagrangian discs PL := Bn(1)× Bn(1), and we give a new proof of the strong Viterbo conjecture about normalized capacities for PL. We also give bounds of the symplectic packing number of two balls in a unit disc-cotangent bundle relative to the zero section N.