A short elementary proof based on polarizations yields a useful (new) rearrangement inequality for symmetrically weighted Dirichlet type functionals. It is then used to answer some symmetry related open questions in the literature. The non symmetry of the Henon equation ground states (previously proved in [19]) as well as their asymptotic behavior are analyzed more in depth. A special attention is also paid to the minimizers of the Caffarelli-Kohn-Nirenberg [8] inequalities
In this article, we give a simple proof of the result due to Lin and Wang ensuring the foliated Schw...
In this note, we present symmetry and monotonicity results corresponding to two cases where the clas...
In this note, we discuss symmetry properties of solutions for simple scalar and vector-valued system...
We investigate the symmetry properties of several radially symmetric minimization problems. The mini...
We investigate maxima and minima of some functionals associated with solutions to Dirichlet problems...
Abstract. This work presents new results and applications for the continuous Steiner symmetrization....
We study symmetry properties of least energy positive or nodal solutions of semilinear elliptic prob...
The thesis presents the results of our research on symmetry for some semilinear elliptic problems an...
Abstract. We investigate partial symmetry of solutions to semi-linear and quasi-linear elliptic prob...
We study symmetry properties of least energy positive or nodal solutions of semilinear elliptic prob...
We investigate the geometric configuration of the maxima of some functionals associated with solutio...
This article concerns the antisymmetry, uniqueness, and monotonicity properties of solutions to some...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
The partial anisotropic symmetrization is defined, extending Steiner symmetrization and convex symme...
We develop a method to prove that some critical levels for functionals invariant by symmetry obtaine...
In this article, we give a simple proof of the result due to Lin and Wang ensuring the foliated Schw...
In this note, we present symmetry and monotonicity results corresponding to two cases where the clas...
In this note, we discuss symmetry properties of solutions for simple scalar and vector-valued system...
We investigate the symmetry properties of several radially symmetric minimization problems. The mini...
We investigate maxima and minima of some functionals associated with solutions to Dirichlet problems...
Abstract. This work presents new results and applications for the continuous Steiner symmetrization....
We study symmetry properties of least energy positive or nodal solutions of semilinear elliptic prob...
The thesis presents the results of our research on symmetry for some semilinear elliptic problems an...
Abstract. We investigate partial symmetry of solutions to semi-linear and quasi-linear elliptic prob...
We study symmetry properties of least energy positive or nodal solutions of semilinear elliptic prob...
We investigate the geometric configuration of the maxima of some functionals associated with solutio...
This article concerns the antisymmetry, uniqueness, and monotonicity properties of solutions to some...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
The partial anisotropic symmetrization is defined, extending Steiner symmetrization and convex symme...
We develop a method to prove that some critical levels for functionals invariant by symmetry obtaine...
In this article, we give a simple proof of the result due to Lin and Wang ensuring the foliated Schw...
In this note, we present symmetry and monotonicity results corresponding to two cases where the clas...
In this note, we discuss symmetry properties of solutions for simple scalar and vector-valued system...