A Problem in Discretization Theory Related to the Approximation Property of Banach Spaces

The purpose of this paper is to introduce and study a class of set-valued variational inclusions in Banach spaces. By using Michael's selection theorem and Nadler's theorem, some existence theorems and iterative algorithms for solving this kind of set-valued variational inclusion in Banach spaces ar

## Abstract We study computability of the abstract linear Cauchy problem equation image where __A__ is a linear operator, possibly unbounded, on a Banach space __X__. We give necessary and sufficient conditions for __A__ such that the solution operator __K__: __x__ ↦ __u__ of the problem (1) is c

We present a new variant of the simultaneous Stone-Weierstrass approximation of a function and its partial derivatives, when the function takes its values in a Banach space, and provide an explicit and direct computation of this approximation. In the particular case of approximation by means of poly

A general formulation for discrete-time quantum mechanics, based on Feynman's method in ordinary quantum mechanics, is presented. It is shown that the ambiguities present in ordinary quantum mechanics (due to noncommutativity of the operators), are no longer present here. Then the criteria for the u