Add to ORKGWe use bifurcation theory to show the existence of infinitely many solutions at the first eigenvalue for a class of Dirichlet problems in one dimension
Abstract. Combining the minimax arguments and the Morse Theory, by computing the critical groups at ...
Combining the minimax arguments and the Morse Theory, by computing the critical groups at zero, we e...
We consider the existence of weak solutions to the wave equationssubject to the double-periodic cond...
We construct examples of strictly convex functions f on (\Gamma1; 1) satisfying f 0 (\Gamma1) ! n...
We study a Neumann problem in a bounded Euclidean domain. The main result in this Note establishes t...
AbstractWe consider nonlinear elliptic eigenvalue problems on unbounded domains G⊆Rn. Using an exten...
We confirm a conjecture raised by Lazer and McKenna on the number of Dirichlet solutions of the equa...
AbstractIn this paper, we prove the existence of infinitely many classical solutions for a class of ...
With the linear growth of the nonlinearity and a new compactness condition involving the asymptotic ...
We consider positive solutions of the Dirichlet problem where B is unit ball in Rn, λ is a positive ...
this paper, under an eigenvalue separation condition (see (1.5)), we obtain a full description of fi...
We consider nonlinear Dirichlet problems driven by the p-Laplacian, which are resonant at + ∞ with r...
AbstractWe consider two classes of the second-order Hamiltonian systems with symmetry. If the system...
Abstract We investigate the multiplicity of solutions for one-dimensional p-Laplacian Dirichlet boun...
The authors derive the following multiple solution result for a class of Landesman-Lazer type proble...
Abstract. Combining the minimax arguments and the Morse Theory, by computing the critical groups at ...
Combining the minimax arguments and the Morse Theory, by computing the critical groups at zero, we e...
We consider the existence of weak solutions to the wave equationssubject to the double-periodic cond...
We construct examples of strictly convex functions f on (\Gamma1; 1) satisfying f 0 (\Gamma1) ! n...
We study a Neumann problem in a bounded Euclidean domain. The main result in this Note establishes t...
AbstractWe consider nonlinear elliptic eigenvalue problems on unbounded domains G⊆Rn. Using an exten...
We confirm a conjecture raised by Lazer and McKenna on the number of Dirichlet solutions of the equa...
AbstractIn this paper, we prove the existence of infinitely many classical solutions for a class of ...
With the linear growth of the nonlinearity and a new compactness condition involving the asymptotic ...
We consider positive solutions of the Dirichlet problem where B is unit ball in Rn, λ is a positive ...
this paper, under an eigenvalue separation condition (see (1.5)), we obtain a full description of fi...
We consider nonlinear Dirichlet problems driven by the p-Laplacian, which are resonant at + ∞ with r...
AbstractWe consider two classes of the second-order Hamiltonian systems with symmetry. If the system...
Abstract We investigate the multiplicity of solutions for one-dimensional p-Laplacian Dirichlet boun...
The authors derive the following multiple solution result for a class of Landesman-Lazer type proble...
Abstract. Combining the minimax arguments and the Morse Theory, by computing the critical groups at ...
Combining the minimax arguments and the Morse Theory, by computing the critical groups at zero, we e...
We consider the existence of weak solutions to the wave equationssubject to the double-periodic cond...