Constructing stochastic flows of kernels

Abstract

In the paper we suggest a new construction of stochastic flows of kernels in a locally compact separable metric space M. Starting from a consistent sequence of Feller transtition function (P(n): n≥ 1) on M we prove existence of a stochastic flow of kernels K=(Ks,t: -∞<s≤ t<∞) in M, such that distributions of n-point motions of K are determined by P(n). Presented construction allows to find a single idempotent measurable presentation p of distributions of all kernels Ks,t from the flow, and to construct a flow that is invariant under p and is jointly measurable in all arguments.