Generalised differences and multiplier operators in $L^2({\mathbb R})$
Abstract
Given two real numbers, the functions whose Fourier transforms vanish with a certain rapidity near the given numbers are characterised as those that are expressible as the sum of a certain number of generalised finite differences that is independent of the function. These generalised differences can be regarded as approximating the appropriate powers of first order ordinary differential operators. The upshot of this is that for operators in a certain class of ordinary differential operators that have polynomial multipliers, their ranges on the Sobolev spaces corresponding to the operators are those functions expressible as a finite sum of corresponding generalised differences, so that the latter form a weighted space under the Fourier transform. There is a connection with the continuity properties of invariant forms on spaces. The results presented here complement results previously obtained for the space of the circle group.
Cite
@article{arxiv.1605.06889,
title = {Generalised differences and multiplier operators in $L^2({\mathbb R})$},
author = {Rodney Nillsen},
journal= {arXiv preprint arXiv:1605.06889},
year = {2016}
}
Comments
15 pages