Riesz transform on manifolds with ends of different volume growth for   $1<p<2$

Renjin Jiang; Hongquan Li; Haibo Lin

arXiv:2211.11433·math.CA·November 22, 2022

Riesz transform on manifolds with ends of different volume growth for $1<p<2$

Renjin Jiang, Hongquan Li, Haibo Lin

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TL;DR

This paper proves the boundedness of the Riesz transform on a connected sum of manifolds with different volume growth rates for the range 1<p<2, under certain heat kernel conditions.

Contribution

It establishes the boundedness of the Riesz transform on manifolds formed by gluing multiple manifolds with varying volume growth behaviors for 1<p<2.

Findings

01

Riesz transform is bounded on the constructed manifold for 1<p<2.

02

Manifolds satisfy doubling condition and Gaussian heat kernel bounds.

03

Volume growth conditions influence Riesz transform boundedness.

Abstract

Let $M_{1}$ , $\dots$ , $M_{ℓ}$ be complete, connected and non-collapsed manifolds of the same dimension, where $2 \leq ℓ \in N$ , and suppose that each $M_{i}$ satisfies a doubling condition and a Gaussian upper bound for the heat kernel. If each manifold $M_{i}$ has volume growth either bigger than two or equal to two, then we show that the Riesz transform $\nabla \L^{- 1/2}$ is bounded on $L^{p} (M)$ for each $1 < p < 2$ on the gluing manifold $M = M_{1} # M_{2} # \dots # M_{ℓ}$ .

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Taxonomy

TopicsAdvanced Harmonic Analysis Research · advanced mathematical theories · Geometric Analysis and Curvature Flows