Weights of reasonable growth and their application

TL;DR

This paper introduces weights with reasonable growth on locally compact groups, explores their properties, and proves the $L^p$-conjecture for these weights using interpolation techniques.

Contribution

It defines a new class of weights with reasonable growth and proves the $L^p$-conjecture for these weights, extending previous results.

Findings

Weights of reasonable growth form a natural class for analysis.

Established convolution inclusion results for weighted $L^p$ spaces.

Confirmed the $L^p$-conjecture for weights of $(p,q)$-reasonable growth.

Abstract

In the paper, we introduce the concept of weight with reasonable growth on a locally compact group $G$. We verify that these weights form a natural class to work with, by examining the most common examples. We proceed with the discussion of the $L^p-$conjecture. With the use of Riesz-Thorin-Stein-Weiss interpolation, we establish that \mbox{$L^p_{\omega}(G)\star L^p_{\omega}(G)\subset L^p_{\omega}(G)$}, $p>1$ implies that $L^p_{\omega}(G)\star L^q_{\omega}(G)\subset L^q_{\omega}(G)$ for $q$ which lies between $p$ and $p'$. At last, we confirm the $L^p_{\omega}-$conjecture for weights of $(p,q)-$reasonable growth.