On Factorizations of Smooth Nonnegative Matrix-Values Functions and on Smooth Functions with Values in Polyhedra

In this paper we prove that the mth root of a nonnegative definite matrix-valued function with continuous entries is continuous. In particular, if all the entries are , which generalizes the result on the square Ž .

We prove Meyer's inequalities for functionals on the Wiener space that take values on a Banach space belonging to the Burkholder U.M.D. class. As an application we analyse the quasi sure regularity in time of the stochastic flow of diffeomorphisms generated by a stochastic differential equation with

We study boundary value problems of the form -u = f on and Bu = g on the boundary j , with either Dirichlet or Neumann boundary conditions, where is a smooth bounded domain in R n and the data f, g are distributions. This problem has to be first properly reformulated and, for practical applications,