New versions of Suen's correlation inequality

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

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.

By introducing three parameters A, B, and , we give some generalizations of Hilbert's integral inequality and its equivalent form with the best constant factors. We also consider their associated double series forms.

In this paper, we obtain some new Hardy type integral inequalities. These w inequalities generalize the results obtained by Y. Bicheng et al.

This paper deals with some new generalizations of Hardy's integral inequality. An improvement of some inequality is also presented.