Probability and Mathematical Statistics: Vol. 3, Fasc. 2

INEQUALITIES BETWEEN INTEGRALS OF $p$ -STABLE SYMMETRIC MEASURES ON BANACH SPACES

Werner Linde
Peter Mathe

Abstract: Let $n$ and $n$ be symmetric Gaussian probability measures on a Banach space $E$ and let $E'$ be the dual of $E.$ Then, as is well known, the inequality

integral 2 integral 2 ' E |<x,a>|dm(x) < E|<x,a>|dn(x) foralla (- E

implies

integral 2 integral 2 ||x ||dm(x) < ||x|| dn(x). E E

If we replace Gaussian measures by $p$ -stable ones ( $0 < p < 2$ ), the property does not hold. Thus we consider the class $Ap$ of such Banach spaces, where a generalization to the $p$ -stable case is true. Furthermore, we give relations of $Ap$ to some other classes of Banach spaces and we get also inclusion properties of $Ap,$ $0 < p < 2.$ Recently, similar classes of Banach spaces have been investigated by Mandrekar, Thang, Tien, and Weron.

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

Key words and phrases: -