In this paper, we will introduce the rotation number for the one-dimensional asymmetric p-Laplacian with a pair of periodic potentials. Two applications of this notion will be given. One is a clear characterization of two unbounded sequences of Fučik curves of the periodic Fučik spectrum of the p-Laplacian with potentials. With the help of the Poincaré–Birkhoff fixed point theorem, the other application is some existence result of multiple periodic solutions of nonlinear ordinary differential equations concerning with the p-Laplacian
Using the theory of coincidence degree, we prove the existence of periodic solutions for the p-Lapl...
(Communicated by the associate editor name) Abstract. Using the relation between the Hill’s equation...
AbstractBy using the theory of coincidence degree, we study a kind of periodic solutions to p-Laplac...
The paper studies the periodic and anti-periodic eigenvalues of the one-dimensional p-Laplacian with...
AbstractExistence of infinitely many periodic solutions for the 1-dimensional p-Laplacian equationdd...
AbstractIn this paper, we study the Fučik spectrum of the problem: (*) ẍ+(λ++q+(t))x++(λ−+q−(t))x−=0...
AbstractBy using the recent generalization of coincidence degree method, the existence of multiple p...
Existence of infinitely many periodic solutions for the 1-dimensional p-Laplacian equation [GRAPH...
Using some recent results on the rotation numbers approach to the periodic problem, we obtain multip...
AbstractIn this paper, we study the existence and multiplicity of non-trivial periodic solutions of ...
ABSTRACT. By exploiting the Denjoy theorem in topological dynamics and the unique ergodic theorem in...
AbstractWe consider one-dimensional p-Laplacian eigenvalue problems of the form−Δpu=(λ−q)|u|p−1sgnu,...
By employing Mawhin's continuation theorem, the existence of periodic solutions of the p-Laplacian d...
AbstractUsing the relation between rotation numbers and eigenvalues, we prove the existence of nontr...
Using the relation between rotation numbers and eigenvalues, we prove the existence of nontrivial T-...
Using the theory of coincidence degree, we prove the existence of periodic solutions for the p-Lapl...
(Communicated by the associate editor name) Abstract. Using the relation between the Hill’s equation...
AbstractBy using the theory of coincidence degree, we study a kind of periodic solutions to p-Laplac...
The paper studies the periodic and anti-periodic eigenvalues of the one-dimensional p-Laplacian with...
AbstractExistence of infinitely many periodic solutions for the 1-dimensional p-Laplacian equationdd...
AbstractIn this paper, we study the Fučik spectrum of the problem: (*) ẍ+(λ++q+(t))x++(λ−+q−(t))x−=0...
AbstractBy using the recent generalization of coincidence degree method, the existence of multiple p...
Existence of infinitely many periodic solutions for the 1-dimensional p-Laplacian equation [GRAPH...
Using some recent results on the rotation numbers approach to the periodic problem, we obtain multip...
AbstractIn this paper, we study the existence and multiplicity of non-trivial periodic solutions of ...
ABSTRACT. By exploiting the Denjoy theorem in topological dynamics and the unique ergodic theorem in...
AbstractWe consider one-dimensional p-Laplacian eigenvalue problems of the form−Δpu=(λ−q)|u|p−1sgnu,...
By employing Mawhin's continuation theorem, the existence of periodic solutions of the p-Laplacian d...
AbstractUsing the relation between rotation numbers and eigenvalues, we prove the existence of nontr...
Using the relation between rotation numbers and eigenvalues, we prove the existence of nontrivial T-...
Using the theory of coincidence degree, we prove the existence of periodic solutions for the p-Lapl...
(Communicated by the associate editor name) Abstract. Using the relation between the Hill’s equation...
AbstractBy using the theory of coincidence degree, we study a kind of periodic solutions to p-Laplac...
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