N. D. Filonov, P. A. Hodunov, “On the local boundedness of solutions to the equation <nobr>$-\Delta u+a\partial_zu=0$</nobr>”, Zap. Nauchn. Sem. POMI, 2021, Volume 508,Pages <nobr>173

This article is cited in 1 paper

On the local boundedness of solutions to the equation $-\Delta u+a\partial_zu=0$

N. D. Filonov^ab, P. A. Hodunov^ac

^a St. Petersburg Department of Steklov Mathematical Institute of Russian Academy of Sciences
^b Saint Petersburg State University
^c National Research University "Higher School of Economics", St. Petersburg Branch

Abstract: Equation $-\Delta u+a\partial_zu=0$ is considered in a domain in $n$-dimensional space. The coefficient in a minor term does not depend on the direction of differentiation in this term. For $a\in L_p$ with $p>\frac{n-1}2$ it is proven that a solution $u$ is locally bounded. If $p=\frac{n-1}2$ then a solution can be unbounded.

Key words and phrases: linear elliptic equations, divergence-free drift, local boundedness of solution, anysotropic Sobolev space.

UDC: 517

Received: 23.09.2021