On Banach spaces of strongly convergent trigonometric series

We show that any series Ý K of operators in L X, Y that is unconditionally n n convergent in the weak operator topology and satisfies the condition that Ý K n g F n is a compact operator for every index set F : ‫ގ‬ is unconditionally convergent in the uniform operator topology if and only if X \*, t

Our concern is to find a representation theorem for operators in B ( c ( X ) , c ( Y ) ) where S and Y are Banach spaces with Y containing an isomorphic copy of Q. CASS and GAO [l] obtained a iq,resentation theorem that always applies if Y does not contain an isomorphic copy of Q. MADDOX [:$I, MELVI

To generalize the HausdorfF measure of noncompactness to other classes of bounded sets (like e. g. conditionally weakly compact or Asplund sets), we introduce Grothendieck classes. We deduce integral inequalities for quantities (called Grothendieck measures) related to these classes. As a by-product