Spider's webs and sharp $L^p$ bounds for the Hardy--Littlewood maximal operator on Gromov hyperbolic spaces

TL;DR

This paper establishes sharp $L^p$ bounds for the Hardy--Littlewood maximal operator on certain Gromov hyperbolic spaces, using a novel graph discretisation called spider's webs, with applications to trees and negatively curved manifolds.

Contribution

Introduces a new structural theorem for Gromov hyperbolic spaces with exponential growth, employing spider's webs for discretisation, and derives optimal $L^p$ bounds for the maximal operator.

Findings

Maximal operator bounded on $L^p$ for $p> au$

Weak type $( au, au)$ boundedness established

Results apply to trees and Cartan--Hadamard manifolds

Abstract

In this paper we prove that if $1<a\leq b<a^2$ and $X$ is a locally doubling $\delta$-hyperbolic complete connected length metric measure space with $(a,b)$-pinched exponential growth at infinity, then the centred Hardy--Littlewood maximal operator $\mathcal M$ is bounded on $L^p(X)$ for all $p>\tau$, and it is of weak type $(\tau,\tau)$, where $\tau := \log_ab$. A key step in the proof is a new structural theorem for Gromov hyperbolic spaces with $(a,b)$-pinched exponential growth at infinity, consisting in a discretisation of $X$ by means of certain graphs, introduced in this paper and called spider's webs, with ``good connectivity properties". Our result applies to trees with bounded geometry, and Cartan--Hadamard manifolds of pinched negative curvature, providing new boundedness results in these settings. The index $\tau$ is optimal in the sense that if $p<\tau$, then there exists $X$ satisfying the assumptions above such that $\mathcal M$ is not of weak type $(p,p)$. Furthermore, if $b>a^2$, then there are examples of spaces $X$ satisfying the assumptions above such that $\mathcal M$ bounded on $L^p(X)$ if and only if $p=\infty$.