Microlocal Tempered Inverse Image and Cauchy Problem

Francesco Tonin

Abstract: We prove an inverse image formula for the functor $\tmhom(\cdot,{\cal O})$ of Andronikof \cite{A}, that is, the microlocalization of the functor $\TH(\cdot,{\cal O})$ of tempered cohomology introduced by Kashiwara. As an application, following an approach initiated by D'Agnolo and Schapira, we study the tempered ramified linear Cauchy problem. We deal with ramifications of logarithmic type, or along a swallow's tail subvariety, or at the boundary of the data existence domain.

Keywords: $\cal D$-mo\-du\-les; Cauchy problem; tempered cohomology.

Classification (MSC2000): 32C38, 32S40, 35A10.

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