Poincaré inequalities and Neumann problems for the variable exponent setting-Reference-Cited by-同舟云学术

Poincaré inequalities and Neumann problems for the variable exponent setting

Published:2022 Issue:5 Volume:4 Page:1-22
ISSN:2640-3501
Container-title:Mathematics in Engineering
language:
Short-container-title:MINE

Author:

Cruz-Uribe David, ,Penrod Michael,Rodney Scott,

Abstract

<abstract><p>In an earlier paper, Cruz-Uribe, Rodney and Rosta proved an equivalence between weighted Poincaré inequalities and the existence of weak solutions to a family of Neumann problems related to a degenerate $ p $-Laplacian. Here we prove a similar equivalence between Poincaré inequalities in variable exponent spaces and solutions to a degenerate $ {p(\cdot)} $-Laplacian, a non-linear elliptic equation with nonstandard growth conditions.</p></abstract>

Publisher

American Institute of Mathematical Sciences (AIMS)

Subject

Applied Mathematics,Mathematical Physics,Analysis

Reference19 articles.

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2. D. Cruz-Uribe, A. Fiorenza, Variable Lebesgue spaces, Heidelberg: Birkhäuser/Springer, 2013.

3. D. Cruz-Uribe, K. Moen, S. Rodney, Matrix $\mathcal A_p$ weights, degenerate Sobolev spaces, and mappings of finite distortion, J. Geom. Anal., 26 (2016), 2797–2830.

4. D. Cruz-Uribe, S. Rodney, Bounded weak solutions to elliptic PDE with data in Orlicz spaces, J. Differ. Equations, 297 (2021), 409–432.

5. D. Cruz-Uribe, S. Rodney, E. Rosta, Poincaré inequalities and neumann problems for the $p$-laplacian, Can. Math. Bull., 61 (2018), 738–753.

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