Existence of radial solutions with a prescribed number of nodes is established, via variational methods, for a system of weakly coupled nonlinear Schrodinger equations. The main goal is to obtain nodal solution with all vector components not identically zero and an estimate on their energies
summary:In this paper we construct radial solutions of equation (1) (and (13)) having prescribed num...
The paper deals with the existence of non-radial solutions for an $N$-coupled nonlinear elliptic sys...
In this paper, we are interested in nodal solutions of nonlinear Schrodinger-Poisson equations. In p...
Existence of radial solutions with a prescribed number of nodes is established, via variational met...
Existence of radial solutions with a prescribed number of nodes is established, via variational meth...
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 ...
In this paper we develop a general critical point theory to deal with existence and locations of mul...
We consider the problem an elliptic nonlinear problem with a symmetric potential vanishing at the in...
In this work, we study existence, non-existence and multiplicity results of nodal solutions for the ...
We consider the following system of Schrodinger equations {-Delta U + lambda U = alpha U-0(3) + beta...
The authors establish non-existence theorems of nodal and one-signed solutions for nonlinear variati...
summary:In this paper we construct radial solutions of equation (1) (and (13)) having prescribed num...
The paper deals with the existence of non-radial solutions for an $N$-coupled nonlinear elliptic sys...
In this paper, we are interested in nodal solutions of nonlinear Schrodinger-Poisson equations. In p...
Existence of radial solutions with a prescribed number of nodes is established, via variational met...
Existence of radial solutions with a prescribed number of nodes is established, via variational meth...
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 ...
In this paper we develop a general critical point theory to deal with existence and locations of mul...
We consider the problem an elliptic nonlinear problem with a symmetric potential vanishing at the in...
In this work, we study existence, non-existence and multiplicity results of nodal solutions for the ...
We consider the following system of Schrodinger equations {-Delta U + lambda U = alpha U-0(3) + beta...
The authors establish non-existence theorems of nodal and one-signed solutions for nonlinear variati...
summary:In this paper we construct radial solutions of equation (1) (and (13)) having prescribed num...
The paper deals with the existence of non-radial solutions for an $N$-coupled nonlinear elliptic sys...
In this paper, we are interested in nodal solutions of nonlinear Schrodinger-Poisson equations. In p...
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