Wellposedness of nonlinear flows on manifolds of bounded geometry

Abstract

We present simple conditions which ensure that a strongly elliptic operator L generates an analytic semigroup on H\"older spaces on an arbitrary complete manifold of bounded geometry. This is done by establishing the equivalent property that L is "sectorial", a condition that specifies the decay of the resolvent (λ I - L)-1 as λ diverges from the H\"older spectrum of L. As one step, we prove existence of this resolvent if λ is sufficiently large, and on this general class of manifolds, use a geometric microlocal version of the semiclassical pseudodifferential calculus. The properties of L and e-tL we obtain can then be used to prove wellposedness of a wide class of nonlinear flows. We illustrate this by proving wellposedness on H\"older spaces of the flow associated to the ambient obstruction tensor on complete manifolds of bounded geometry.