Laplace transform of temperate holomorphic functions (Q2767768)

\textit{M. Kashiwara} and \textit{P. Schapira} [J. Am. Math. Soc. 10, No. 4, 939-972 (1997; Zbl 0888.32004)] made the Laplace transform act on the tempered cohomology associated with conic \(R\)-constructible sheaves and obtained an inversion formula which they described in the framework of algebraic \({\mathcal D}\)-modules using as an isomorphism between two conic sheaves. The main aim of the paper under review is to give a more elementary proof of this isomorphism. As a by-product the author obtains another proof of a theorem of Brylinski-Malgrange-Verdier and Kashiwara-Hotta on the solutions of monodromic holonomic \({\mathcal D}\)-modules and constructs the complex of tempered hyperfunctions.