Limit behavior of the convolution iterates of a probability measure on a semigroup of matrices

We consider the di!usion limit of a model transport equation on the torus or the whole space, as a scaling parameter (the mean free path), tends to zero. We show that, for arbitrary initial data u (x, v), the solution converges in norm topology for each t'0, to the solution of a di!usion equation wi

## Some interesting properties of an indexed family of probability junctions {P,} whose application to the theory of pattern recognition as given by Cooper (1) are presented. It is shown that as m approaches in$nity P, converges to a well-defined probability function on En. !

## Abstract The space of probability measures on a Riemannian manifold is endowed with the Fisher information metric. In [4] T. Friedrich showed that this space admits also Poisson structures {, }. In this note, we give directly another proof for the structure {, } being Poisson. (© 2007 WILEY‐VCH

Ideas cultivated in spectral geometry are applied to obtain an asymptotic property of a reversible random walk on an infinite graph satisfying a certain periodic condition. In the course of our argument, we employ perturbation theory for the maximal eigenvalues of twisted transition operator. As a r