The convolution algebra of an absolutely locally compact topos

Abstract

We introduce a class of toposes called "absolutely locally compact" toposes and of "admissible" sheaf of rings over such toposes. To any such ringed topos (T,A) we attach an involutive convolution algebra Cc(T,A) which is well defined up to Morita equivalence and characterized by the fact that the category of non-degenerate modules over Cc(T,A) is equivalent to the category of sheaf of A-module over T. In the case where A is the sheaf of real or complex Dedekind numbers, we construct several norms on this involutive algebra that allows to complete it in various Banach and C*-algebras: L1(T,A), C*red(T,A) and C*max(T,A). We also give some examples where this construction corresponds to well known constructions of involutive algebras, like groupoids convolution algebra and Leavitt path algebras.