The fundamental solution and Hardy inequality for a class of degenerated elliptics operators with a double-weight;

In this paper,the existence of the nontrivial solution to a class of quasi-linear elliptic problem is investigated based on the Hardy inequality and the Mountain Pass Geometry.

This paper discusses a class special elliptic equation with strong singular item and critical Sobolev exponents by Variational method in PDE and Hardy inequality.

The Hardy-Littlewood inequality is important in analysis mathematics and its applications.

A local Aλ_r (Ω)-weighted Hardy-Littlewood inequality for differential forms satisfying the A-harmonic tensors is proved.

IIn this paper, we consider the Hardy-Littlewood inequality for p-harmonic type equation.

(Using) Sobolev-Hardy inequality,Mountain Pass lemma and Concentration compactness principle,the existence of positive solution was proved under the certain conditions that the cofficients and exponents of the(equation) meet.

The authors discuss the existence of positive solution for a p-Laplace equation with singular weight by using Sobolev-Hardy inequality and the Mountain Pass Lemma.

We use the decomposition of the filtration of the Nehair manifold via the variation of domain shape and Sobolev-Hardy inequality.