Add to ORKGWe prove here the multiplicity results for the solutions of compact $H$-surfaces in Euclidean space. Some minimax methods and topological arguments are used for the existence of such solutions in multiply connected domains
[[abstract]]In this article, we present various compactness and minimizations from very classical th...
We discuss some aspects of the global behavior of surfaces in H2 × R with constant mean curvature H ...
We show that the number of solutions of a nonlinear elliptic problem on a Riemannian manifold depend...
The existence of multiple cylindrically symmetric solutions for a class of non-autonomous elliptic N...
We prove generic multiplicity of solutions for a scalar field equation on compact surfaces via Morse...
AbstractConsider the periodic solutions of autonomous Hamiltonian systems x˙=J∇H(x) on the given com...
AbstractWe prove generic multiplicity of solutions for a scalar field equation on compact surfaces v...
We consider a scalar field equation on compact surfaces which have variational structure. When the s...
We consider a scalar field equation on compact surfaces which has variational structure. When the su...
The problem -epsilon(2)Deltau + a(epsilon)(x)u = u(p-1) with zero Dirichlet boundary condition is co...
We consider a scalar field equation on compact surfaces which has variational structure. When the su...
We show that the critical problem% \[ -\Delta u=|u|^{{{4}}/({{N-2}})}u\quad \text{in }\Omega,\qquad\...
In the present paper we initiate the variational analysis of a super sinh-Gordon system on compact s...
Here is a particular case of the main result of this paper: Let Q C R n be a bounded domain, with a...
Let , and . Our purpose in this paper is to consider multiple existence of solutions of problemwher...
[[abstract]]In this article, we present various compactness and minimizations from very classical th...
We discuss some aspects of the global behavior of surfaces in H2 × R with constant mean curvature H ...
We show that the number of solutions of a nonlinear elliptic problem on a Riemannian manifold depend...
The existence of multiple cylindrically symmetric solutions for a class of non-autonomous elliptic N...
We prove generic multiplicity of solutions for a scalar field equation on compact surfaces via Morse...
AbstractConsider the periodic solutions of autonomous Hamiltonian systems x˙=J∇H(x) on the given com...
AbstractWe prove generic multiplicity of solutions for a scalar field equation on compact surfaces v...
We consider a scalar field equation on compact surfaces which have variational structure. When the s...
We consider a scalar field equation on compact surfaces which has variational structure. When the su...
The problem -epsilon(2)Deltau + a(epsilon)(x)u = u(p-1) with zero Dirichlet boundary condition is co...
We consider a scalar field equation on compact surfaces which has variational structure. When the su...
We show that the critical problem% \[ -\Delta u=|u|^{{{4}}/({{N-2}})}u\quad \text{in }\Omega,\qquad\...
In the present paper we initiate the variational analysis of a super sinh-Gordon system on compact s...
Here is a particular case of the main result of this paper: Let Q C R n be a bounded domain, with a...
Let , and . Our purpose in this paper is to consider multiple existence of solutions of problemwher...
[[abstract]]In this article, we present various compactness and minimizations from very classical th...
We discuss some aspects of the global behavior of surfaces in H2 × R with constant mean curvature H ...
We show that the number of solutions of a nonlinear elliptic problem on a Riemannian manifold depend...