We obtain the existence of radially symmetric and decreasing solutions to a general class of quasi-linear elliptic problems by a nonsmooth version of a symmetric minimax principle recently obtained by Van Schaftingen
A result of existence of a nonnegative and a nontrivial solution is proved via critical point theore...
A result of existence of a nonnegative and a nontrivial solution is proved via critical point theore...
A result of existence of a nonnegative and a nontrivial solution is proved via critical point theore...
We obtain the existence of radially symmetric and decreasing solutions to a general class of quasi-...
For a class of lower semicontinuous functions we obtain a Mountain-Pass theorem incapsulating some s...
We provide a simple proof of the radial symmetry of any nonnegative minimizer for a general class of...
We obtain the radial symmetry of any minimizer for a general class of quasi-linear constrained minim...
We develop a method to prove that some critical levels for functionals invariant by symmetry obtaine...
We develop a method to prove that some critical levels for functionals invariant by symmetry obtaine...
We study existence, multiplicity, perturbation, and concentration results for a class of quasi-linea...
AbstractWe study a minimization problem in the space W1,10(BR) where BR is the ball of radius R with...
For a general class of autonomous quasi-linear elliptic equations on R^n we prove the existence of a...
For a general class of autonomous quasi-linear elliptic equations on Rn we prove the existence of a ...
Abstract. Pour une large classe d’équations quasilinéaire elliptiques qui sont au-tonomes sur RN, ...
summary:We discuss variational problems on two-dimensional domains with energy densities of linear g...
A result of existence of a nonnegative and a nontrivial solution is proved via critical point theore...
A result of existence of a nonnegative and a nontrivial solution is proved via critical point theore...
A result of existence of a nonnegative and a nontrivial solution is proved via critical point theore...
We obtain the existence of radially symmetric and decreasing solutions to a general class of quasi-...
For a class of lower semicontinuous functions we obtain a Mountain-Pass theorem incapsulating some s...
We provide a simple proof of the radial symmetry of any nonnegative minimizer for a general class of...
We obtain the radial symmetry of any minimizer for a general class of quasi-linear constrained minim...
We develop a method to prove that some critical levels for functionals invariant by symmetry obtaine...
We develop a method to prove that some critical levels for functionals invariant by symmetry obtaine...
We study existence, multiplicity, perturbation, and concentration results for a class of quasi-linea...
AbstractWe study a minimization problem in the space W1,10(BR) where BR is the ball of radius R with...
For a general class of autonomous quasi-linear elliptic equations on R^n we prove the existence of a...
For a general class of autonomous quasi-linear elliptic equations on Rn we prove the existence of a ...
Abstract. Pour une large classe d’équations quasilinéaire elliptiques qui sont au-tonomes sur RN, ...
summary:We discuss variational problems on two-dimensional domains with energy densities of linear g...
A result of existence of a nonnegative and a nontrivial solution is proved via critical point theore...
A result of existence of a nonnegative and a nontrivial solution is proved via critical point theore...
A result of existence of a nonnegative and a nontrivial solution is proved via critical point theore...
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