# Distributions with Decay and Restriction Problems

**Authors:** G. Hoepfner, A. Raich

arXiv: 1905.06793 · 2019-05-17

## TL;DR

This paper introduces a new restriction problem with moments, exploring how certain measures satisfy these restrictions, and develops the theory of distributions with decay and their wavefront sets in various function spaces.

## Contribution

It defines distributions with decay, introduces global wavefront sets, and characterizes distributions with decay via microglobal regularity, advancing restriction theory and distribution analysis.

## Key findings

- Sphere surface measure satisfies restriction problem with moments for specific p
- Salem's Frostman measure satisfies restriction problem with moments under certain parameters
- Developed a framework for distributions with decay and their wavefront sets

## Abstract

In this paper we introduce a new type of restriction problem, called the \textit{restriction problem with moments}. We show that the surface area measure of the sphere satisfies the $L^p$-$L^2$ restriction problem with moments if $1 \leq p < \frac{2(d+2)}{d+3}$ and that the Frostman measure constructed by Salem satisfies the $L^p$-$L^2$ restriction problem with moments if $1 \leq p < \frac{2(2-2\alpha+\beta)}{4(1-\alpha)+\beta}$ for certain values of $\alpha$ and $\beta$.   The main tool to obtain these new type of restriction phenomenon is the notion of distributions with decay in connection with classes of global $L^q$ ultradifferentiable functions. We develop the notion of distributions with decay and use it to define global wavefront sets of classes of function spaces, including $L^p$-Sobolev spaces on \mathbb{R}^d$ as well as global $L^q$-Denjoy Carleman functions. We also introduce the corresponding notion of microglobal regularity. We prove a characterization of distributions (in a given function space) with decay in terms of microglobal regularity in every direction of their Fourier transforms.

## Full text

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## References

9 references — full list in the complete paper: https://tomesphere.com/paper/1905.06793/full.md

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Source: https://tomesphere.com/paper/1905.06793