Invariant Parabolic equations and Markov process on Ad\'eles

Abstract

In this article a class of additive invariant positive selfadjoint pseudodifferential unbounded operators on L2(Af), where Af is the ring of finite ad\'eles of the rational numbers, is considered to state a Cauchy problem of parabolic--type equations. These operators come from a set of additive invariant non-Archimedean metrics on Af. The fundamental solutions of these parabolic equations determines normal transition functions of Markov process on Af. Using the fractional Laplacian on the Archimedean place, R, a class of parabolic--type equations on the complete ad\`ele ring, A, is obtained.