On strongly l_p-summing m-linear operators

Abstract: Abstract. We introduce and study a new concept of strongly l p -summing m-linear operators in the category of operator spaces. We give some characterizations of this notion such as the Pietsch domination theorem and we show that an m-linear operator is strongly l p -summing if and only if its adjoint is l p -summing.1. Introduction. The development of the theory of polynomials and multilinear operators can be divided into two periods. The first starts in the thirties of the last century, essentially motivated … Show more

“…which means that S * is absolutely p * -summing. From [18,Theorem 2.7], S is a Cohen strongly p-summing m-linear operator and d m p (S) = π p * (S * ) ≤ n m p (T ). This ends the proof.…”

On multilinear generalizations of the concept of nuclear operators

“…which means that S * is absolutely p * -summing. From [18,Theorem 2.7], S is a Cohen strongly p-summing m-linear operator and d m p (S) = π p * (S * ) ≤ n m p (T ). This ends the proof.…”

On multilinear generalizations of the concept of nuclear operators

“…for all k ∈ N and (x j i ) k i=1 ⊂ X j . Many contributions have supported the development of the multilinear theory of summing operators (see for example [1], [6], [18], [19], [26], [27] and [28]). The following remarkable definition appeared in [6]: Given 1 ≤ p 1 , .…”

Factorizing multilinear operators on Banach spaces, C^*-algebras and JB^*-triples