Probability and Mathematical Statistics: Vol. 13, Fasc. 1

VOLUMES

ON THE CLASS OF OPERATOR STABLE DISTRIBUTIONS IN A SEPARABLE BANACH SPACE

Gerhard Siegel

Abstract: This paper characterizes the class of all limit probability measures $m$ of normalized and centralized convolution powers in a separable Banach space $E$ which are defined by

A n*n *d -w--> m u xn

for some linear and bounded operators $An$ and some shifts $xn (- E.$ It is shown that this class coincides with the set of all infinitely divisible laws in $E$ provided that $E$ is infinite dimensional.

2000 AMS Mathematics Subject Classification: Primary: -; Secondary: -;

Key words and phrases: -