Uniqueness of periodic solution for a class of Liénard -Laplacian equations.
Cao, Fengjuan, Han, Zhenlai, Zhao, Ping, Sun, Shurong (2010)
Advances in Difference Equations [electronic only]
Similarity:
Displaying similar documents to “Existence and uniqueness of periodic solutions for a class of nonlinear equations with -Laplacian-like operators.”
Uniqueness of periodic solution for a class of Liénard -Laplacian equations.
On existence of periodic solutions of the Rayleigh equation of retarded type.
Wang, Genqiang, Yan, Jurang (2000)
International Journal of Mathematics and Mathematical Sciences
Similarity:
An improved existence and uniqueness criterion for periodic solutions of a Duffing type p-Laplacian equation.
Wang, Yong (2010)
Applied Mathematics E-Notes [electronic only]
Similarity:
Periodic solutions of a nonlinear evolution problem
Nelson Nery Oliveira Castro, Nirzi G. de Andrade (2002)
Applications of Mathematics
Similarity:
In this paper we prove existence of periodic solutions to a nonlinear evolution system of second order partial differential equations involving the pseudo-Laplacian operator. To show the existence of periodic solutions we use Faedo-Galerkin method with a Schauder fixed point argument.
The existence of periodic solutions for a class of nonlinear functional differential equations
Jin-Zhi Liu, Zhi-Yuan Jiang, Ai-Xiang Wu (2008)
Applications of Mathematics
Similarity:
This paper is concerned with periodic solutions of first-order nonlinear functional differential equations with deviating arguments. Some new sufficient conditions for the existence of periodic solutions are obtained. The paper extends and improves some well-known results.
Periodic solutions to a -Laplacian neutral Rayleigh equation with deviating argument
Bo Du, Xueping Hu (2011)
Applications of Mathematics
Similarity:
By using the coincidence degree theory, we study a type of -Laplacian neutral Rayleigh functional differential equation with deviating argument to establish new results on the existence of -periodic solutions.