Abstract and Applied Analysis
Volume 7 (2002), Issue 12, Pages 627-635
doi:10.1155/S1085337502206053
On the notion of L 1-completeness of a stochastic flow on a manifold
Yu.E. Gliklikh
and L.A. Morozova
Mathematics Faculty, Voronezh State University, Voronezh 394006, Russia
Abstract
We introduce the notion of L 1-completeness for a stochastic flow on manifold and prove a necessary and sufficient condition for a flow to be L 1-complete. L 1-completeness means that the flow is complete (i.e., exists on the given time interval) and that it belongs to some sort of L 1-functional space, natural for manifolds where no Riemannian metric is specified.