Download this article
Download this article For screen
For printing
Recent Issues

Volume 17
Issue 5, 723–899
Issue 4, 543–722
Issue 3, 363–541
Issue 2, 183–362
Issue 1, 1–182

Volume 16, 5 issues

Volume 15, 5 issues

Volume 14, 5 issues

Volume 13, 5 issues

Volume 12, 8 issues

Volume 11, 5 issues

Volume 10, 5 issues

Volume 9, 5 issues

Volume 8, 5 issues

Volume 7, 6 issues

Volume 6, 4 issues

Volume 5, 4 issues

Volume 4, 4 issues

Volume 3, 4 issues

Volume 2, 5 issues

Volume 1, 2 issues

The Journal
About the journal
Ethics and policies
Peer-review process
 
Submission guidelines
Submission form
Editorial board
Editors' interests
 
Subscriptions
 
ISSN 1944-4184 (online)
ISSN 1944-4176 (print)
 
Author index
To appear
 
Other MSP journals
This article is available for purchase or by subscription. See below.
Elliptic Harnack inequality for ${\mathbb{Z}}^d$

Siva Athreya, Nitya Gadhiwala and Ritvik R. Radhakrishnan

Vol. 15 (2022), No. 4, 687–708
Abstract

We prove the scale-invariant elliptic Harnack inequality (EHI) for nonnegative harmonic functions on d . The purpose of this note is to provide a simplified self-contained probabilistic proof of the EHI in d that is accessible at the undergraduate level. We use the local central limit theorem for simple symmetric random walks on d to establish Gaussian bounds for the n-step probability function. The uniform Green inequality and the classical balayage formula then imply the EHI.

PDF Access Denied

We have not been able to recognize your IP address 18.97.14.85 as that of a subscriber to this journal.
Online access to the content of recent issues is by subscription, or purchase of single articles.

Please contact your institution's librarian suggesting a subscription, for example by using our journal-recom­mendation form. Or, visit our subscription page for instructions on purchasing a subscription.

You may also contact us at contact@msp.org
or by using our contact form.

Or, you may purchase this single article for USD 30.00:

Keywords
random walk, harmonic function, Harnack inequality, Gaussian bounds, balayage
Mathematical Subject Classification
Primary: 05C81
Secondary: 31C05, 31C20
Milestones
Received: 21 September 2021
Revised: 22 November 2021
Accepted: 26 January 2022
Published: 7 January 2023

Communicated by Amarjit Singh Budhiraja
Authors
Siva Athreya
International Centre for Theoretical Sciences of the Tata Institute of Fundamental Research
Bengaluru
India
Indian Statistical Institute, Bangalore Centre
Bengaluru
India
Nitya Gadhiwala
Department of Mathematics
University of British Columbia
Vancouver, BC
Canada
Ritvik R. Radhakrishnan
Department of Mathematics
ETH Zurich
Switzerland