Some generalizations on the boundedness of bilinear operators

Let X~,X2 .... be /.i.d. random variables and h be a symmetric measurable real function. We show that the norms of operators on l~ given by the matrix (~h(Xi, X/)6i~i)l<i,i\_<, are a.s. bounded if and only if h is square integrable.

## Abstract We consider a class of multidimensional potential‐type operators with kernels that have singularities at the origin and on the unit sphere and that are oscillating at infinity. We describe some convex sets in the (1/__p,__ 1/__q__)‐plane for which these operators are bounded from __L~p~

## Abstract We study some properties of strongly and absolutely __p__‐summing bilinear operators. We show that Hilbert‐Schmidt bilinear mappings are both strongly and absolutely __p__‐summing, for every __p__ ≥ 1. Giving an example of a strongly 1‐summing bilinear mapping which fails to be weakly c