We develop a method to prove that some critical levels for functionals invariant by symmetry obtained by minimax methods without any symmetry constraint are attained by symmetric critical points. It is used to investigate the symmetry properties of solutions of elliptic partial differential equations with Dirichlet or Neumann boundary conditions. It is also an alternative to concentration-compactness for some symmetric elliptic problems
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
Key words andphrases: Concentration-compactness principle, critical Sobolev exponent, symmetric and ...
We investigate the symmetry properties of several radially symmetric minimization problems. The mini...
We develop a method to prove that some critical levels for functionals invariant by symmetry obtaine...
We investigate maxima and minima of some functionals associated with solutions to Dirichlet problems...
We study symmetry properties of least energy positive or nodal solutions of semilinear elliptic prob...
We study symmetry properties of least energy positive or nodal solutions of semilinear elliptic prob...
We obtain the existence of radially symmetric and decreasing solutions to a general class of quasi-...
The thesis presents the results of our research on symmetry for some semilinear elliptic problems an...
We obtain the existence of radially symmetric and decreasing solutions to a general class of quasi-...
The first part of this thesis is devoted to symmetrizations. Symmetrizations are tranformations of f...
Abstract. The main aim of this paper is to study H1 versus C1 local mini-mizers for functionals defi...
In this dissertation, we establish existence and multiplicity of positive solutions for semilinear e...
We formulate symmetric versions of classical variational principles. Within the framework of nonsmoo...
In this note, we discuss symmetry properties of solutions for simple scalar and vector-valued system...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
Key words andphrases: Concentration-compactness principle, critical Sobolev exponent, symmetric and ...
We investigate the symmetry properties of several radially symmetric minimization problems. The mini...
We develop a method to prove that some critical levels for functionals invariant by symmetry obtaine...
We investigate maxima and minima of some functionals associated with solutions to Dirichlet problems...
We study symmetry properties of least energy positive or nodal solutions of semilinear elliptic prob...
We study symmetry properties of least energy positive or nodal solutions of semilinear elliptic prob...
We obtain the existence of radially symmetric and decreasing solutions to a general class of quasi-...
The thesis presents the results of our research on symmetry for some semilinear elliptic problems an...
We obtain the existence of radially symmetric and decreasing solutions to a general class of quasi-...
The first part of this thesis is devoted to symmetrizations. Symmetrizations are tranformations of f...
Abstract. The main aim of this paper is to study H1 versus C1 local mini-mizers for functionals defi...
In this dissertation, we establish existence and multiplicity of positive solutions for semilinear e...
We formulate symmetric versions of classical variational principles. Within the framework of nonsmoo...
In this note, we discuss symmetry properties of solutions for simple scalar and vector-valued system...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
Key words andphrases: Concentration-compactness principle, critical Sobolev exponent, symmetric and ...
We investigate the symmetry properties of several radially symmetric minimization problems. The mini...
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