Global Gevrey Hypoellipticity of Involutive Systems on Non-Compact Manifolds

Abstract

We investigate the global Gevrey hypoellipticity of a class of first-order differential operators associated with tube-type involutive structures on M×Tm, where M is a non-compact manifold diffeomorphic to the interior of a compact manifold with boundary and Tm is the m-dimensional torus. For s>1, we work in Gevrey classes of Roumieu and Beurling type. A key step is the construction, on M, of a scattering metric whose coefficients are Gevrey of order s in every analytic chart; this allows us to use Hodge theory and obtain Gevrey regularity for the harmonic forms. Under a natural condition on the defining closed 1-forms, we obtain a sharp criterion for global Gevrey hypoellipticity in terms of rationality and (Roumieu/Beurling) exponential Liouville behavior.