The heat kernel on symmetric spaces via integrating over the group of isometries

We show that the automorphism group of a locally finite tree is discrete, or pro-finite, or not the inverse limit of an inverse system of discrete groups, and provide necessary and sufficient conditions for each of these possibilities to occur. More generally, we demonstrate that for certain proper

We show some integral representations of the heat kernels and explicit expressions of the Green functions for the Laplace-Beltrami operators on three series of hyperbolic spaces.

In this paper we will prove the logarithmic Sobolev inequality on free loop groups for various heat kernel measures which P. Malliavin (1989Malliavin ( , 1991, in ``Diffusion Process and Related Problems in Analysis (M. A. Pinsley, Ed.), Vol. I, Birkha user, Basel) constructed. Those measures are as

It is asserted in Definition 4.2 in [1] that the random operators U(t) defined there are unitary. As was pointed out to the author by Shizan Fang, it is clear that U(t) is an isometry but it is not obvious that U(t) is surjective. The purpose of this note is to fill this gap. 1998 Academic Press 1.

In this paper we define a canonical locally flat generalized conformal structure on a symmetric R-space of the rank greater than I. We prove that the group of automorphisms of this structure coincides with the noncompact group of automorphisms of the symmetric space.