Microsupport of tempered solutions of D-Modules associated to smooth morphisms

Abstract

Let f:X Y be a smooth morphism of complex analytic manifolds and let F be an R-constructible complex on Y. Let M be a coherent X-module. We prove that the microsupport of the solution complex of in the tempered holomorphic functions t om (f-1 F, X), is contained in the 1-characteristic variety of M associated to f, and that the microsupport of the solution complex in the tempered microfunctions tμ hom(f-1F, X) is contained in the 1-microcharacteristic variety of the microlocalized of along T*Y×Y X. This applies in particular to the complex of solutions of in the sheaf of distributions holomorphic in the fibers of an arbitrary smooth morphism.