A class of summing operators acting in spaces of operators

Abstract

Let X, Y and Z be Banach spaces and let U be a subspace of L(X*,Y), the Banach space of all operators from X* to Y. An operator S: U Z is said to be (sp,p)-summing (where 1≤ p <∞) if there is a constant K≥ 0 such that ( Σi=1n \|S(Ti)\|Zp )1/p K x* ∈ BX* (Σi=1n \|Ti(x*)\|Yp)1/p for every n∈ N and every T1,…,Tn ∈ U. In this paper we study this class of operators, introduced by Blasco and Signes as a natural generalization of the (p,Y)-summing operators of Kislyakov. On one hand, we discuss Pietsch-type domination results for (sp,p)-summing operators. In this direction, we provide a negative answer to a question raised by Blasco and Signes, and we also give new insight on a result by Botelho and Santos. On the other hand, we extend to this setting the classical theorem of Kwapie\'n characterizing those operators which factor as S1 S2, where S2 is absolutely p-summing and S1* is absolutely q-summing (1<p,q<∞ and 1/p+1/q ≤ 1).