Hardy inequalities resulted from nonlinear problems dealing with A-Laplacian

Abstract: Abstract. We derive Hardy inequalities in weighted Sobolev spaces via anticoercive partial differential inequalities of elliptic type involving ALaplacian −ΔAu = −divA(∇u) ≥ Φ, where Φ is a given locally integrable function and u is defined on an open subset Ω ⊆ R n . Knowing solutions we derive Caccioppoli inequalities for u. As a consequence we obtain Hardy inequalities for compactly supported Lipschitz functions involving certain measures, having the formwhereĀ(t) is a Young function related to A and satisf… Show more

“…These cases are recalled in Remark 4.1. Furthermore, we provide here also new inequalities with the optimal constants, see The approach presented here and in the papers [55,56] is a modification of techniques originating in [43]. In all of these papers, the investigations start with derivation of Caccioppoli-type estimates for the solutions to nonlinear problems.…”

“…Other interesting results linking the existence of solutions in elliptic and parabolic PDEs with Hardy type inequalities are presented in [2,4,36,61,62], see also references therein. We refer also to the contribution by the third author [56], where instead of the nonweighted p-Laplacian in (1.1) one deals with the A-Laplacian: A u = div A (|∇u|) |∇u| 2 ∇u , involving a function A from an Orlicz class. Similar estimates in the framework of nonlocal operators can be found e.g.…”

Caccioppoli-type estimates and Hardy-type inequalities derived from weighted p-harmonic problems

“…These cases are recalled in Remark 4.1. Furthermore, we provide here also new inequalities with the optimal constants, see The approach presented here and in the papers [55,56] is a modification of techniques originating in [43]. In all of these papers, the investigations start with derivation of Caccioppoli-type estimates for the solutions to nonlinear problems.…”

“…Other interesting results linking the existence of solutions in elliptic and parabolic PDEs with Hardy type inequalities are presented in [2,4,36,61,62], see also references therein. We refer also to the contribution by the third author [56], where instead of the nonweighted p-Laplacian in (1.1) one deals with the A-Laplacian: A u = div A (|∇u|) |∇u| 2 ∇u , involving a function A from an Orlicz class. Similar estimates in the framework of nonlocal operators can be found e.g.…”

Caccioppoli-type estimates and Hardy-type inequalities derived from weighted p-harmonic problems

“…The approach presented here and in the papers [40] and [42] is the modification of methods from [25]. In all of these papers, the investigations start with derivation of Caccioppoli-type estimates for the solutions to nonlinear problem.…”

“…Other interesting results linking the existence of solutions in elliptic and parabolic PDEs with Hardy type inequalities are presented in [2,4,22,45,46], see also references therein. We refer also to the recent contribution by the third author [42], where, instead of the nondegenerated p-Laplacian in (1.1), one deals with the A-Laplacian:…”

Caccioppoli--type estimates and Hardy--type inequalities derived from degenerated $p$--harmonic problems

“…Let us mention such branches as functional analysis, harmonic analysis, probability theory, and PDEs. Weighted versions of Hardy-type inequalities are also investigated on their own in the classical way [17,22,27], as well as in the various generalised frameworks [4,5,14,29].…”

Variable exponent Hardy-type inequalities in $\mathbb{R}^n$