Schauder type theorems for differentiable and holomorphic mappings

Givena holomorphicmapping of bounded typeg E Hb(u, F), where U E is a balanced open subset, and E , F are complex B a n d spaces, let A : Hb(F) 4 Hb(U) be the homomorphism defined by A ( f ) = f o g for all f E Hb(F). We prove that: (a) for F having the Dunford-Pettis property, A is weakly compact i

We give new Leray-Schauder type theorems for compact or condensing approximable maps in not necessarily locally convex topological vector spaces in two different ways of approach. First, with the help of the \(Z\) type set, our argument is based on a finite dimensional approximation property for top

If B is the open unit ball of a strictly convex Banach space (X, & }&) and f : B Ä B is holomorphic, condensing with respect to : & } & , and fixed-point-free, then there exists ! # B such that the sequence [ f n ] of the iterates of f converges in the compact-open topology to the constant map takin