Characterizations of Tauberian and Related Operators on Banach Spaces

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

We show that for the Köthe space X = c 0 + 1 (w), equipped with the Luxemburg norm, the set of norm attaining operators from X into any infinite-dimensional strictly convex Banach space Y is not dense in the space of all bounded operators. The same assertion holds for any infinitedimensional L 1 (µ)

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

## Abstract We develop some parts of the theory of compact operators from the point of view of computable analysis. While computable compact operators on Hilbert spaces are easy to understand, it turns out that these operators on Banach spaces are harder to handle. Classically, the theory of compac

In this article we shall introduce and investigate a notion of generalized 5 5 5 5 5 5 Daugavet equation I q S q T s 1 q S q T for operators S and T on a uniformly convex Banach space into itself, where I denotes the identity operator. This extends the well-known Daugavet equation 5 5 5 5 IqT s1q T