Calderón–Zygmund theory for nonlinear elliptic problems with irregular obstacles

REGULARITY OF SOLUTIONS OF OBSTACLE PROBLEMS FOR ELLIPTIC EQUATIONS WITH OBLIQUE BOUNDARY CONDITIONS

Gary M. Lieberman
Gary M. Lieberman

January 2001

Much has been written about various obstacle problems in the context of variational inequalities. In...

Calderón–Zygmund type estimates for a class of obstacle problems with p(x) growth

Eleuteri, Michela
Habermann, Jens

December 2010

AbstractFor local minimizers u∈Wloc1,p(⋅)(Ω) of quasiconvex integral functionals of the typeF[u]:=∫Ω...

Gradient estimate in Orlicz spaces for elliptic obstacle problems with partially BMO nonlinearities

Shuang Liang
Shenzhou Zheng

March 2018

We prove a global Orlicz estimate for the gradient of weak solutions to a class of nonlinear obstac...

Calderón–Zygmund theory for nonlinear elliptic problems with irregular obstacles

Byun, Sun-Sig
Cho, Yumi
Wang, Lihe

November 2012

AbstractWe consider a nonhomogeneous elliptic problem with an irregular obstacle involving a discont...

Elliptic equations with BMO nonlinearity in Reifenberg domains

Byun, Sun-Sig
Wang, Lihe

December 2008

AbstractGiven p∈[2,+∞), we obtain the global W1,p estimate for the weak solution of a boundary-value...

Lorentz estimates for the gradient of weak solutions to elliptic obstacle problems with partially BMO coefficients

Zheng, S.
Tian, H.

January 2017

We prove global Lorentz estimates for variable power of the gradient of weak solution to linear ell...

The Calderòn-Zygmund property for quasilinear divergence form equations over Reifenberg flat domains

PALAGACHEV, Dian
SOFTOVA, Lyoubomira

January 2011

The results by Palagachev (2009) [3] regarding global Holder continuity for the weak solutions to qu...

Calder\'on-Zygmund Property for Quasilinear Divergence Form Equations over Reifenberg Flat Domains

PALAGACHEV D. K.
SOFTOVA PALAGACHEVA, Lyoubomira

January 2011

The results by Palagachev (2009) [3] regarding global Holder continuity for the weak solutions to qu...

Regularity results for p-Laplacians in pre-fractal domains

Raffaela Capitanelli
Salvatore Fragapane
Maria Agostina Vivaldi

June 2018

Abstract We study obstacle problems involving p-Laplace-type operators in non-convex pol...

Weighted and regularity estimates for nonlinear equations on Reifenberg flat domains

Mengesha, Tadele
Phuc, Nguyen Cong

March 2011

AbstractGlobal weighted Lp estimates are obtained for the gradient of solutions to nonlinear ellipti...

An elliptic problem involving critical Choquard and singular discontinuous nonlinearity

Anthal, Gurdev C.
Giacomoni, Jacques
Sreenadh, Konijeti

September 2023

The present article investigates the existence, multiplicity and regularity of weak solutions of pro...

Gradient regularity via rearrangements for $p$-Laplacian type elliptic boundary value problems

Vladimir Maz'ya
Andrea Cianchi

January 2014

A sharp estimate for the decreasing rearrangement of the length of the gradient of solutions to a cl...

Gradient regularity for elliptic equations in the Heisenberg group

Mingione, Giuseppe
Zatorska-Goldstein, Anna
Zhong, Xiao

September 2009

AbstractWe give dimension-free regularity conditions for a class of possibly degenerate sub-elliptic...

An obstacle problem for nonlinear hemivariational inequalities at resonance

Kyritsi, Sophia Th.
Papageorgiou, Nikolaos S.

December 2002

AbstractIn this paper we examine an obstacle problem for a nonlinear hemivariational inequality at r...

Calderón–Zygmund estimates and non-uniformly elliptic operators

Colombo, Maria
Mingione, Giuseppe

February 2020

We consider a class of non-uniformly nonlinear elliptic equations whose model is given by -div(verti...

REGULARITY OF SOLUTIONS OF OBSTACLE PROBLEMS FOR ELLIPTIC EQUATIONS WITH OBLIQUE BOUNDARY CONDITIONS

Gary M. Lieberman
Gary M. Lieberman

January 2001

Much has been written about various obstacle problems in the context of variational inequalities. In...

Calderón–Zygmund type estimates for a class of obstacle problems with p(x) growth

Eleuteri, Michela
Habermann, Jens

December 2010

AbstractFor local minimizers u∈Wloc1,p(⋅)(Ω) of quasiconvex integral functionals of the typeF[u]:=∫Ω...

Gradient estimate in Orlicz spaces for elliptic obstacle problems with partially BMO nonlinearities

Shuang Liang
Shenzhou Zheng

March 2018

We prove a global Orlicz estimate for the gradient of weak solutions to a class of nonlinear obstac...

Calderón–Zygmund theory for nonlinear elliptic problems with irregular obstacles

Byun, Sun-Sig
Cho, Yumi
Wang, Lihe

November 2012

AbstractWe consider a nonhomogeneous elliptic problem with an irregular obstacle involving a discont...

Elliptic equations with BMO nonlinearity in Reifenberg domains

Byun, Sun-Sig
Wang, Lihe

December 2008

AbstractGiven p∈[2,+∞), we obtain the global W1,p estimate for the weak solution of a boundary-value...

Lorentz estimates for the gradient of weak solutions to elliptic obstacle problems with partially BMO coefficients

Zheng, S.
Tian, H.

January 2017

We prove global Lorentz estimates for variable power of the gradient of weak solution to linear ell...

The Calderòn-Zygmund property for quasilinear divergence form equations over Reifenberg flat domains

PALAGACHEV, Dian
SOFTOVA, Lyoubomira

January 2011

The results by Palagachev (2009) [3] regarding global Holder continuity for the weak solutions to qu...

Calder\'on-Zygmund Property for Quasilinear Divergence Form Equations over Reifenberg Flat Domains

PALAGACHEV D. K.
SOFTOVA PALAGACHEVA, Lyoubomira

January 2011

The results by Palagachev (2009) [3] regarding global Holder continuity for the weak solutions to qu...

Regularity results for p-Laplacians in pre-fractal domains

Raffaela Capitanelli
Salvatore Fragapane
Maria Agostina Vivaldi

June 2018

Abstract We study obstacle problems involving p-Laplace-type operators in non-convex pol...

Weighted and regularity estimates for nonlinear equations on Reifenberg flat domains

Mengesha, Tadele
Phuc, Nguyen Cong

March 2011

AbstractGlobal weighted Lp estimates are obtained for the gradient of solutions to nonlinear ellipti...

An elliptic problem involving critical Choquard and singular discontinuous nonlinearity

Anthal, Gurdev C.
Giacomoni, Jacques
Sreenadh, Konijeti

September 2023

The present article investigates the existence, multiplicity and regularity of weak solutions of pro...

Gradient regularity via rearrangements for $p$-Laplacian type elliptic boundary value problems

Vladimir Maz'ya
Andrea Cianchi

January 2014

A sharp estimate for the decreasing rearrangement of the length of the gradient of solutions to a cl...

Gradient regularity for elliptic equations in the Heisenberg group

Mingione, Giuseppe
Zatorska-Goldstein, Anna
Zhong, Xiao

September 2009

AbstractWe give dimension-free regularity conditions for a class of possibly degenerate sub-elliptic...

An obstacle problem for nonlinear hemivariational inequalities at resonance

Kyritsi, Sophia Th.
Papageorgiou, Nikolaos S.

December 2002

AbstractIn this paper we examine an obstacle problem for a nonlinear hemivariational inequality at r...

Calderón–Zygmund estimates and non-uniformly elliptic operators

Colombo, Maria
Mingione, Giuseppe

February 2020

We consider a class of non-uniformly nonlinear elliptic equations whose model is given by -div(verti...

REGULARITY OF SOLUTIONS OF OBSTACLE PROBLEMS FOR ELLIPTIC EQUATIONS WITH OBLIQUE BOUNDARY CONDITIONS

Gary M. Lieberman
Gary M. Lieberman

January 2001

Much has been written about various obstacle problems in the context of variational inequalities. In...

Calderón–Zygmund type estimates for a class of obstacle problems with p(x) growth

Eleuteri, Michela
Habermann, Jens

December 2010

AbstractFor local minimizers u∈Wloc1,p(⋅)(Ω) of quasiconvex integral functionals of the typeF[u]:=∫Ω...

Gradient estimate in Orlicz spaces for elliptic obstacle problems with partially BMO nonlinearities

Shuang Liang
Shenzhou Zheng

March 2018

We prove a global Orlicz estimate for the gradient of weak solutions to a class of nonlinear obstac...

Calderón–Zygmund theory for nonlinear elliptic problems with irregular obstacles

Abstract

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Calderón–Zygmund theory for nonlinear elliptic problems with irregular obstacles

Abstract

Extracted data

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