Topological structure of the space of composition operators onH∞

Various concepts related to smooth topological spaces have been introduced, and relations among them studied by several authors [-2-6]. In this paper we introduce the notions of smooth, quasi-smooth and weak smooth structure, showing that various properties of a smooth topological space can be expre

its space of convolution operators, and let O O be the predual of O O X . We prove , ࠻ , ࠻ that the topology of uniform convergence on bounded subsets of H H and the strong dual toplogy coincide on O O X . Our technique, involving Mackey topologies, differs , ࠻ from, and is simpler than, those usual

The present paper introduces a very simple, but very useful notion of the so called quasi-extension of l 1 -operators and proves that a large class of topological vector spaces admit continuous hypercyclic operators. In particular, it answers in the affirmative a question of S. Rolewicz, posed in 19

Smooth topological spaces and their fundamental concepts have been discussed in the literature E2, 4-7]. In this paper, we present the notions of base and two sorts of neighborhood structure of smooth topological spaces and give some of their properties which are results in J'3] extended to smooth t