Duality of Type H1-BMO and Bilinear Operators

## 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

## Abstract Let __L__ = −Δ + __V__ be a Schrödinger operator on \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$\mathbb {R}^n$\end{document} (__n__ ≥ 3), where \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$V \not\equiv 0$\end{document} is

A completely bounded bilinear operator ,: M\_M Ä M on a von Neumann algebra M is said to have a factorization in M if there exist completely bounded linear operators j , % j : M Ä M such that ,(x, y)= : where convergence of the sum is made precise below. The main result of the paper is that all com

## Abstract A bounded linear operator __T__ on a Banach space __X__ is called hypercyclic if there exists a vector __x__ ∈ __X__ such that its orbit, {__T^n^x__ }, is dense in __X__. In this paper we show hypercyclic properties of the orbits of the Cesàro operator defined on different spaces. For i