Weak continuity and compactness of nonlinear mappings

In generalizing a result of Pełczynski the sequential weak to norm continuity of `Ž N-linear mappings between certain Banach spaces including spaces of type and . cotype will be studied. In particular, it is shown that every N-linear continuous n Ž . mapping from l l = иии = l l into l l is compact

In this paper, two kinds of approximate dimensions are introduced, namely one is the approximate dimension of the compact nonlinear mappings on infinite dimensional topological vector spaces, and the other is the approximate dimension of the compact nonlinear mappings on finite dimensional topologic

The paper is devoted to a general factorization theorem for "continuous" set-valued mappings defined on arbitrary topological spaces. This result fits naturally into the selection theory showing that several known selection theorems remain valid under minimal hypotheses. Also, the result is successf