Dynamics of $L^p$-Multiplier for $p\leq 2$ on Harmonic Manifolds of Purely Exponential Volume Growth

TL;DR

This paper investigates the behavior of $L^p$-multipliers on harmonic manifolds with exponential volume growth, showing they are not chaotic for $p\, extless=2$ and exploring related harmonic analysis properties.

Contribution

It extends the understanding of $L^p$-multipliers on harmonic manifolds, proving non-chaotic behavior for certain operators and establishing new inequalities and holomorphicity results.

Findings

$L^p$-multipliers are not chaotic for $p\, extless=2$ on these manifolds.

Established a Young inequality for convolution on harmonic manifolds.

Analyzed the domain of holomorphicity of the Fourier transform.

Abstract

We study the dynamics of $L^p$-multipliers on non-compact simply connected harmonic manifolds of purely exponential volume growth. These are linear operators on the $L^p$-spaces which behave nicely on radial functions under Fourier transformation. In the process we complement the results of Kingshook Biswas and Rudra P. Sarkar by showing that if they are acting nicely on smooth function with compact support under Fourier transform for $p\leq 2$ these can not be chaotic. Furthermore, we use this to study the behaviour of the heat semi-group, the resolvent and the convolution algebra arising from convolution with radial functions. In the process, we obtain a Young inequality for the convolution on non-compact simply connected harmonic manifolds, an extension of the Kunz-Stein and study the domain of holomorphicity of the Fourier transform.