On the correct definition of the flow of a discontinuous solenoidal vector field

А. И. Ноаров

On the correct definition of the flow of a discontinuous solenoidal vector field

Authors

A. I. Noarov

Abstract

UDC 517.51
We prove inequalities connecting a flow through the

$(n- 1)$ -dimensional surface

$S$ of a smooth solenoidal vector field with its

$L^{p}(U)$ -norm (

$U$ is an

$n$ -dimensional domain that contains

$S$ ). On the basis of these inequalities, we propose a correct definition of the flow through the surface

$S$ of a discontinuous solenoidal vector field

$f \in L^{p}(U)$ (or, more precisely, of the class of vector fields that are equal almost everywhere with respect to the Lebesque measure).

Downloads

PDF (Russian)

Published

25.08.2019

Issue

Vol. 71 No. 8 (2019)

Section

Short communications

How to Cite

Noarov, A. I. “On the Correct Definition of the Flow of a Discontinuous Solenoidal Vector Field”. Ukrains’kyi Matematychnyi Zhurnal, vol. 71, no. 8, Aug. 2019, pp. 1141-9, https://umj.imath.kiev.ua/index.php/umj/article/view/1505.

ACM
ACS
APA
ABNT
Chicago
Harvard
IEEE
MLA
Turabian
Vancouver

Download Citation

Endnote/Zotero/Mendeley (RIS)
BibTeX

On the correct definition of the flow of a discontinuous solenoidal vector field

Authors

Abstract

Downloads

Published

Issue

Section

How to Cite

Language

Information