On strong summability and convergence


Eberhard Malkowsky




We give a survey of the recent results concerning the fundamental topological properties of spaces of stronly summable and convergent sequences, their β– and continuous duals, and the characterizations of classes of linear operators between them. Furthermore we demonstrate how the Hausdorff measure of noncompactness can be used in the characterization of classes of compact operators between the spaces of strongly summable and bounded sequences.