Generalized Path Spaces, II

## Abstract In this paper a unified theory of Cauchy spaces is presented including the classical cases of filter and sequence Cauchy spaces. To by‐pass a lattice‐theoretical barrier the notion of Urysohn modification of a functor is introduced. Employing this notion for many types of generalized Ca

Let {Xt} t≥0 be a Feller process with infinitesimal generator (A, D(A)). If the test functions are contained in D(A), -A|C ∞ c (IR n ) is a pseudo -differential operator p(x, D) with symbol p(x, ξ). We investigate local and global regularity properties of the sample paths t → Xt in terms of (weighte

In [Z] we have introduced and studied generalized symmetric RIEafA"ian spaces. In the present paper we introduce the concept of a generalized affine symmetric space. We also define the group of transvections of such a space, m d we give s ~m e basic properties of this group. Following 0. LOOS, a sy

We say that a subset G of C 0 (T, R k ) is rotation-invariant if [Qg: g # G]=G for any k\_k orthogonal matrix Q. Let G be a rotation-invariant finite-dimensional subspace of C 0 (T, R k ) on a connected, locally compact, metric space T. We prove that G is a generalized Haar subspace if and only if P