Global hypoellipticity for involutive systems on non-compact manifolds

Abstract

We study the global hypoellipticity of the operator L = dt + Σk=1m ωk ∂xk, defined on differential forms over product manifolds of the form M × Tm, where M is a non-compact manifold homeomorphic to the interior of a compact manifold with boundary, equipped with a scattering metric, and ω1,…,ωm are smooth closed 1-forms on M. Extending previous results obtained in the compact setting, we characterize global hypoellipticity of L in terms of arithmetic properties of the forms ωk. The analysis relies on microlocal techniques adapted to the scattering setting and a version of the Hodge Theorem for scattering manifolds.