Add to ORKGLet Ω be a bounded domain in IRN, N ≥ 3, containing the origin. Motivated by a question of Brezis and Vázquez, we consider an Improved Hardy Inequality with best constant b, that we formally write as: − ∆ ≥ (N−22)2 1|x|2+bV (x).We first give necessary conditions on the potential V, under which the previous inequality can or cannot be further improved. We show that the best constant b is never achieved in H10 (Ω), and in particular that the existence or not of further correction terms is not connected to the non achievement of b in H10 (Ω). Our analysis reveals that the original inequality can be repeatedly improved by adding in the right hand side specific potentials. This leads to an infinite series expansion of Hardy’s inequality. The s...
AbstractWe consider Hardy inequalities in Rn, n⩾3, with best constant that involve either distance t...
In this paper we prove new Hardy-like inequalities with optimal potential singularities for function...
AbstractLet 1<p<∞ and A=(an,k)n,k⩾0. Denote by ‖A‖p,p the number whose p-power is the infimum of tho...
AbstractLet Ω be a bounded domain in RN, N⩾3, containing the origin. Motivated by a question of Brez...
For Ω⊂Rn, n≥2, a bounded domain, and for 1<p<n, we improve the Hardy-Sobolev ...
Let Ω be a smooth bounded domain in IRN, N ≥ 3. We show that Hardy’s inequality involving the distan...
For\Omega \subset $IR^n$,n\geq 2, a bounded domain, and for 1 < p < n, we improve the Hardy-Sobolev ...
Abstract. For Rn; n 2, a bounded domain, and for 1 < p < n, we improve the Hardy-Sobolev ine...
Abstract. An inequality of Hardy type, with a remainder term, is proved for functions defined on a b...
In this paper, by means of a sharpening of Hölder’s inequality, the extended Hardy-Hilbert’s inequa...
We consider Hardy inequalities in IRn, n ≥ 3, with best constant that involve either the distance to...
AbstractWe show the Hardy inequality for Grushin operator like ∂x2+4x2∂y2 on a bounded domain Ω⊂R2 c...
We show that in the classical Hardy inequalities with optimal constants inW 1,p0 (Ω),W 2,2 0 (Ω), W ...
Copyright c © 2014 Rauf and Omolehin. This is an open access article distributed under the Creative ...
We investigate connections between Hardy's inequality in the whole space Rnand embedding inequalitie...
AbstractWe consider Hardy inequalities in Rn, n⩾3, with best constant that involve either distance t...
In this paper we prove new Hardy-like inequalities with optimal potential singularities for function...
AbstractLet 1<p<∞ and A=(an,k)n,k⩾0. Denote by ‖A‖p,p the number whose p-power is the infimum of tho...
AbstractLet Ω be a bounded domain in RN, N⩾3, containing the origin. Motivated by a question of Brez...
For Ω⊂Rn, n≥2, a bounded domain, and for 1<p<n, we improve the Hardy-Sobolev ...
Let Ω be a smooth bounded domain in IRN, N ≥ 3. We show that Hardy’s inequality involving the distan...
For\Omega \subset $IR^n$,n\geq 2, a bounded domain, and for 1 < p < n, we improve the Hardy-Sobolev ...
Abstract. For Rn; n 2, a bounded domain, and for 1 < p < n, we improve the Hardy-Sobolev ine...
Abstract. An inequality of Hardy type, with a remainder term, is proved for functions defined on a b...
In this paper, by means of a sharpening of Hölder’s inequality, the extended Hardy-Hilbert’s inequa...
We consider Hardy inequalities in IRn, n ≥ 3, with best constant that involve either the distance to...
AbstractWe show the Hardy inequality for Grushin operator like ∂x2+4x2∂y2 on a bounded domain Ω⊂R2 c...
We show that in the classical Hardy inequalities with optimal constants inW 1,p0 (Ω),W 2,2 0 (Ω), W ...
Copyright c © 2014 Rauf and Omolehin. This is an open access article distributed under the Creative ...
We investigate connections between Hardy's inequality in the whole space Rnand embedding inequalitie...
AbstractWe consider Hardy inequalities in Rn, n⩾3, with best constant that involve either distance t...
In this paper we prove new Hardy-like inequalities with optimal potential singularities for function...
AbstractLet 1<p<∞ and A=(an,k)n,k⩾0. Denote by ‖A‖p,p the number whose p-power is the infimum of tho...