A Geometric Property of Banach Spaces Related to the Fixed Point Property

In this paper, we show that the weak nearly uniform smooth Banach spaces have the fixed point property for nonexpansive mappings.

## Introduction. The theory of discrete approximation serves as a framework of approximation and discretization methods for the numerical solution of functional equations. This theory allows a unified functional-analytic treatment of these methods. It was developed by several authors (see e.g. the

Every non-reflexive subspace of K(H), the space of compact operators on a Hilbert space H, contains an asymptotically isometric copy of c 0 . This, along with a result of Besbes, shows that a subspace of K(H) has the fixed point property if and only if it is reflexive.

## Abstract It is well known that the displacement‐based fully compatible finite element method (FEM) provides a lower bound in energy norm for the exact solution to elasticity problems. It is, however, much more difficult to bound the solution from above for general problems in elasticity, and it

A clear-cut correlation between antimalarial potency and the restored in the C-5a-unsubstituted analog 8, bearing a methoxymethyl group at C-3. Reaction of 8 with Mn II TPP alkylative property of synthetic tricyclic trioxanes 5-10 is reported. Thus, trioxanes 5 and 7, substituted at the C-5a furnish