We prove some Liouville theorems for systems of integral equations and inequalities related to weighted Hardy-Littlewood-Sobolev inequality type on RN. Some semilinear singular or degenerate higher order elliptic inequalities associated to polyharmonic operators are considered. Special cases include the Henon-Lane-Emden syste
We peove various results concerning a priori bounds of positive solutions of higher order equations ...
AbstractBoth local and global Ar-weighted Poincaré inequalities for Green's operator applied to the ...
Abstract. Hardy–Sobolev–type inequalities associated with the operator L:= x · ∇ are established, u...
We prove some Liouville theorems for systems of integral equations and inequalities related to weig...
Let m>=1 be an integer and N > 2m. Let \u3bc be a positive Radon measure on RN. We study necessary a...
The purpose of this text is twofold. We present a review of the existing stability results for Sobol...
By using the moving plane method combined with integral inequalities and Hardy's inequality, so...
We prove different Liouville theorems for several classes of quasilinear elliptic systems and applic...
This work is devoted to the nonexistence of positive solutions for polyharmonic systems [GRAPHICS...
openIn this thesis we prove some Liouville theorems for systems of integral equations related to Bec...
The main body of this dissertation can be divided into two separate topics. The first topic deals wi...
This thesis which is a compendium of seven papers, focuses on the study of the semilinear elliptic e...
(Communicated by Wenxiong Chen) Abstract. In this paper, we study a conjecture of J.Serrin and give ...
In this note we review a recent result in [17] in collaboration with N. Garofalo, where we establish...
This thesis consists of two parts: in part one (Chapter 3, 4, 5), we study the qualitative and quant...
We peove various results concerning a priori bounds of positive solutions of higher order equations ...
AbstractBoth local and global Ar-weighted Poincaré inequalities for Green's operator applied to the ...
Abstract. Hardy–Sobolev–type inequalities associated with the operator L:= x · ∇ are established, u...
We prove some Liouville theorems for systems of integral equations and inequalities related to weig...
Let m>=1 be an integer and N > 2m. Let \u3bc be a positive Radon measure on RN. We study necessary a...
The purpose of this text is twofold. We present a review of the existing stability results for Sobol...
By using the moving plane method combined with integral inequalities and Hardy's inequality, so...
We prove different Liouville theorems for several classes of quasilinear elliptic systems and applic...
This work is devoted to the nonexistence of positive solutions for polyharmonic systems [GRAPHICS...
openIn this thesis we prove some Liouville theorems for systems of integral equations related to Bec...
The main body of this dissertation can be divided into two separate topics. The first topic deals wi...
This thesis which is a compendium of seven papers, focuses on the study of the semilinear elliptic e...
(Communicated by Wenxiong Chen) Abstract. In this paper, we study a conjecture of J.Serrin and give ...
In this note we review a recent result in [17] in collaboration with N. Garofalo, where we establish...
This thesis consists of two parts: in part one (Chapter 3, 4, 5), we study the qualitative and quant...
We peove various results concerning a priori bounds of positive solutions of higher order equations ...
AbstractBoth local and global Ar-weighted Poincaré inequalities for Green's operator applied to the ...
Abstract. Hardy–Sobolev–type inequalities associated with the operator L:= x · ∇ are established, u...
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