Riesz transforms on a class of non-doubling manifolds

TL;DR

This paper characterizes the boundedness of the Riesz transform on a class of non-doubling manifolds formed by connected sums of different Euclidean and compact manifolds, revealing how asymptotic dimensions influence $L^p$ bounds.

Contribution

It extends the analysis of Riesz transforms to non-doubling manifolds with varying asymptotic dimensions, providing a complete description of $L^p$ boundedness ranges.

Findings

Riesz transform is of weak type (1,1) on these manifolds.

Bounded on $L^p$ for $p$ in (1, min_i n_i).

Unbounded outside this $p$ range.

Abstract

We consider a class of manifolds $\mathcal{M}$ obtained by taking the connected sum of a finite number of $N$-dimensional Riemannian manifolds of the form $(\mathbb{R}^{n_i}, \delta) \times (\mathcal{M}_i, g)$, where $\mathcal{M}_i$ is a compact manifold, with the product metric. The case of greatest interest is when the Euclidean dimensions $n_i$ are not all equal. This means that the ends have different `asymptotic dimension', and implies that the Riemannian manifold $\mathcal{M}$ is not a doubling space. We completely describe the range of exponents $p$ for which the Riesz transform on $\mathcal{M}$ is a bounded operator on $L^p(\mathcal{M})$. Namely, under the assumption that each $n_i$ is at least $3$, we show that Riesz transform is of weak type $(1,1)$, is continuous on $L^p$ for all $p \in (1, \min_i n_i)$, and is unbounded on $L^p$ otherwise. This generalizes results of the first-named author with Carron and Coulhon devoted to the doubling case of the connected sum of several copies of Euclidean space $\mathbb{R}^{N}$, and of Carron concerning the Riesz transform on connected sums.