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[论文解读] Riesz transforms associated with the Grushin operator with drift

Nishta Garg, Rahul Garg|arXiv (Cornell University)|Mar 16, 2026

Advanced Harmonic Analysis Research被引用 0

一句话总结

本论文通过从海森堡-赖特群结果的转移及指数测度的对称性，建立了带漂移的 Grushin 算子的一阶及高阶 Riesz 变换的强类型 (p,p) 与弱类型 (1,1) 有界性。

ABSTRACT

We consider the Grushin operator with drift which is symmetric with respect to a measure having exponential growth. For the corresponding Riesz transforms, we study strong-type $(p, p)$, $1 < p < \infty$, and weak-type $(1, 1)$ boundedness.

研究动机与目标

Motivate and study Riesz transforms of arbitrary order for the Grushin operator with drift that is symmetric w.r.t. an exponential growth measure.
Extend known Lp boundedness results to the drifted Grushin setting and analyze endpoint weak-type properties.
Leverage transference techniques to relate Grushin problems to drifted sub-Laplacians on Heisenberg–Reiter groups.

提出的方法

Define the Grushin operator with drift G_a as G_a = G - 2 a · ∇_{x'}, symmetric on L^2(R^{n+m}, dμ_a).
Express Riesz transforms R_{α,a} = X^α G_a^{−|α|/2} via functional calculus and heat semigroups.
Relate G_a to the sub-Laplacian with drift on Heisenberg–Reiter groups and apply Coifman–Weiss transference to transfer Lp-boundedness.
Use unitary representation to connect Grushin gradient fields with Heisenberg–Reiter gradients.
Employ asymptotics of ball volumes and heat kernel bounds to control kernels and apply endpoint arguments.
Show convergence (after scaling and translation) to Laplacian with drift to deduce endpoint behavior.

实验结果

研究问题

RQ1What Lp boundedness do the first and higher order Riesz transforms R_{α,a} have with respect to dμ_a for 1<p<∞?
RQ2Are the first order Riesz transforms of G_a weak-type (1,1) on R^{n+1} with uniform bounds in a?
RQ3Do all Riesz transforms of order k≥3 fail to be of weak-type (1,1) with respect to dμ_a?
RQ4How does the Grushin problem with drift relate to drifted sub-Laplacians on Heisenberg–Reiter groups via transference?
RQ5Can endpoint results for the drifted Grushin operator be deduced from the corresponding Laplacian with drift on R^{n+m}?

主要发现

For any multi-index α with |α|=k≥1 and 1<p<∞, the Riesz transform R_{α,a} is bounded on L^p(R^{n+m}, dμ_a), uniformly in a.
On R^{n+1} (i.e., m=1), the first-order Riesz transforms are of weak-type (1,1) with respect to dμ_a, uniformly in a.
For k≥3, not all Riesz transforms of order k are of weak-type (1,1) with respect to dμ_a.
The boundedness results for Riesz transforms of G_a follow from known results for the sub-Laplacian with drift on Heisenberg–Reiter groups via Coifman–Weiss transference.
Proposition establishing that a Riesz transform for Grushin with (scaled) drift, under conjugation by translations and dilations, converges to the Riesz transform for the Laplacian with drift on R^{n+m}.
From this convergence, endpoint weak-type results for G_a follow by comparison to the Laplacian with drift results in Li–Sjögren–Wu and Li–Sjögren.

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