A multivariate version of Samuelson’s inequality

We prove a version of Hardy's type inequality in a domain W … R n which involves the distance to the boundary and the volume of W. In particular, we obtain a result which gives a positive answer to a question asked by H. Brezis and M. Marcus.

In this paper, a probabilistic version of the Ostrowski inequality is shown. Applications of the probabilistic version are also given.

In a recent paper KATO [3] uscd the LITTLEWOOD matrices to generalise CLARK-SON'S inequalities. Our first aim is to indicate how KATO'S result can be deduced from a neglected version of the HAUSDORFP-YOUXG inequnlity which was proved by WELLS m c t WILLIAXS [12]. \Ve next establish "random CLARKSON

A general easily checkable Cochran theorem is obtained for a normal random operator \(Y\). This result does not require that the covariance, \(\Sigma_{\mathbf{r}}\), of \(Y\) is nonsingular or is of the usual form \(A \otimes 2\); nor does it assume that the mean. \(\mu\). of \(Y\) is equal to zero.