Existence of a nontrivial solution is established, via variational methods, for a system of weakly coupled nonlinear Schrodinger equations. The main goal is to obtain a positive solution, of minimal action if possible, with all vector components not identically zero. Generalizations for nonautonomous systems are considered
In this article, we study weakly coupled systems of elliptic equations without Hamiltonian structure...
By exploiting a variational technique based upon projecting over the Pohožaev manifold, weprove exis...
AbstractUsing concentration compactness type arguments, we prove some results about the existence of...
Existence of a nontrivial solution is established, via variational methods, for a system of weakly ...
Existence of a nontrivial solution is established, via variational methods, for a system of weakly ...
Existence of a nontrivial solution is established, via variational methods, for a system of weakly c...
AbstractExistence of a nontrivial solution is established, via variational methods, for a system of ...
ABSTRACT. Existence of a nontrivial solution is established, via varia-tional methods, for a system ...
Existence of a positive purely vector ground state solution is established, via variational methods,...
We study the existence of solutions for a class of saturable weakly coupled Schrodinger systems. In ...
Existence of radial solutions with a prescribed number of nodes is established, via variational meth...
We consider systems of weakly coupled Schrodinger equations with nonconstant potentials and we inves...
Existence of radial solutions with a prescribed number of nodes is established, via variational met...
We consider systems of weakly coupled Schrodinger equations with nonconstant potentials and investig...
In this article, we study weakly coupled systems of elliptic equations without Hamiltonian structure...
In this article, we study weakly coupled systems of elliptic equations without Hamiltonian structure...
By exploiting a variational technique based upon projecting over the Pohožaev manifold, weprove exis...
AbstractUsing concentration compactness type arguments, we prove some results about the existence of...
Existence of a nontrivial solution is established, via variational methods, for a system of weakly ...
Existence of a nontrivial solution is established, via variational methods, for a system of weakly ...
Existence of a nontrivial solution is established, via variational methods, for a system of weakly c...
AbstractExistence of a nontrivial solution is established, via variational methods, for a system of ...
ABSTRACT. Existence of a nontrivial solution is established, via varia-tional methods, for a system ...
Existence of a positive purely vector ground state solution is established, via variational methods,...
We study the existence of solutions for a class of saturable weakly coupled Schrodinger systems. In ...
Existence of radial solutions with a prescribed number of nodes is established, via variational meth...
We consider systems of weakly coupled Schrodinger equations with nonconstant potentials and we inves...
Existence of radial solutions with a prescribed number of nodes is established, via variational met...
We consider systems of weakly coupled Schrodinger equations with nonconstant potentials and investig...
In this article, we study weakly coupled systems of elliptic equations without Hamiltonian structure...
In this article, we study weakly coupled systems of elliptic equations without Hamiltonian structure...
By exploiting a variational technique based upon projecting over the Pohožaev manifold, weprove exis...
AbstractUsing concentration compactness type arguments, we prove some results about the existence of...
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