Shift-invariant spaces of tempered distributions and Lp-functions

In [19] we described a method for the construction of spaces of distributions of BESOY type (and similar type) with weights, including spaces having negative order of differentiation. The main idea was the decomposition of the Euclidean wspace R, with the aid of special systems of smooth functions.

## Abstract This paper is concerned with continuity and differentiability of NEMYTSKIJ operators acting between spaces of summable abstract functions. In a first part, necessary and sufficient conditions for continuity are collected. Then main emphasis is given to sufficient conditions for differen

Let (Q, a, p) be a positive measure space and D ( p ) , 0 < p 5 00, the space of (equivalence classes of) functions which are p-integrable with respect to p. In a nice short paper [9] A. VILLANI stated necessary and sufficient conditions for the measure p such that inclusions of the form D ( p ) D (

The concept of phase invariance on shifting the origin formulated for the structure factors of crystallography is transferred to momentum space quantum chemistry. The resulting mathematical constraints in the form of inequalities are given for tractable one-electron molecules.