Bounds on the Lagrangian spectral metric in cotangent bundles

Abstract

Let N be a closed manifold and U ⊂ T*(N) a bounded domain in the cotangent bundle of N, containing the zero-section. A conjecture due to Viterbo asserts that the spectral metric for Lagrangian submanifolds that are exact-isotopic to the zero-section is bounded. In this paper we establish an upper bound on the spectral distance between two such Lagrangians L0, L1, which depends linearly on the boundary depth of the Floer complexes of (L0, F) and (L1, F), where F is a fiber of the cotangent bundle.