Add to ORKGLet be a Hölder conjugate pair of vector fields, both belonging to the space . Suppose that div and curl . In this paper we prove the following isoperimetric type inequality where and . As an application, we recover Hölder continuity for solutions of n-Laplace equation .</p
In the present work we study isoperimetric problem and its description by isoperimetric inequality. ...
The Isoperimetric Inequality has many different proofs using methods from diverse mathematical field...
Given a convex set C R and a set D R C, the inequality is called the relative isoper...
The classical embedding theorem of Sobolev W 1,p(Rn) ↪ → Lq(Rn) was originally proved in the case 1 ...
Let X be a smooth oriented Riemannian n-manifold without boundary and (Phi, Psi) is an element of L-...
International audienceWe prove an isoperimetric inequality of the Rayleigh-Faber-Krahn type for a no...
If C C, does D satisfy the isoperimetric inequality #nVolume(D) ? Does equality h...
We study two related inequalities that arise in Harmonic Analysis: restriction type inequalities an...
This paper deals with various questions related to the isoperimetric problem for a smooth positive m...
We prove some sharp estimates for solutions to Dirichlet problems relative to Monge-Ampère equations...
A simple proof of an integral inequality involving L-1-vector fields is provided. This gives a short...
We prove some sharp estimates for solutions to Dirichlet problems relative to Monge--Ampère equation...
none2We prove an isoperimetric inequality in the Grushin planenoneR. Monti; D. MorbidelliR. Monti; D...
Abstract. We prove an isoperimetric inequality of the Rayleigh-Faber-Krahn type for a nonlinear gene...
AbstractIt is well known that there is a simple equivalence between isoperimetric inequalities and c...
In the present work we study isoperimetric problem and its description by isoperimetric inequality. ...
The Isoperimetric Inequality has many different proofs using methods from diverse mathematical field...
Given a convex set C R and a set D R C, the inequality is called the relative isoper...
The classical embedding theorem of Sobolev W 1,p(Rn) ↪ → Lq(Rn) was originally proved in the case 1 ...
Let X be a smooth oriented Riemannian n-manifold without boundary and (Phi, Psi) is an element of L-...
International audienceWe prove an isoperimetric inequality of the Rayleigh-Faber-Krahn type for a no...
If C C, does D satisfy the isoperimetric inequality #nVolume(D) ? Does equality h...
We study two related inequalities that arise in Harmonic Analysis: restriction type inequalities an...
This paper deals with various questions related to the isoperimetric problem for a smooth positive m...
We prove some sharp estimates for solutions to Dirichlet problems relative to Monge-Ampère equations...
A simple proof of an integral inequality involving L-1-vector fields is provided. This gives a short...
We prove some sharp estimates for solutions to Dirichlet problems relative to Monge--Ampère equation...
none2We prove an isoperimetric inequality in the Grushin planenoneR. Monti; D. MorbidelliR. Monti; D...
Abstract. We prove an isoperimetric inequality of the Rayleigh-Faber-Krahn type for a nonlinear gene...
AbstractIt is well known that there is a simple equivalence between isoperimetric inequalities and c...
In the present work we study isoperimetric problem and its description by isoperimetric inequality. ...
The Isoperimetric Inequality has many different proofs using methods from diverse mathematical field...
Given a convex set C R and a set D R C, the inequality is called the relative isoper...