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1. Existence and asymptotic behavior of sign-changing solutions for the Schr\"{o}dinger-Bopp-Podolsky system with concave-convex nonlinearities | |||
Yi-Xin Hu, Xing-Ping Wu, Chun-Lei Tang | |||
Mathematics 28 March 2022 | |||
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Abstract:In this paper, we study the Schr\"{o}dinger-Bopp-Podolsky system with con-cave-convex nonlinearities. If $0< \lambda < \lambda^{*}$, the system has a sign-changing solution by variational methods. Besides, we argument the asymptotic behavior of the solution as $a\rightarrow 0$. | |||
TO cite this article:Yi-Xin Hu, Xing-Ping Wu, Chun-Lei Tang. Existence and asymptotic behavior of sign-changing solutions for the Schr\"{o}dinger-Bopp-Podolsky system with concave-convex nonlinearities[OL].[28 March 2022] http://en.paper.edu.cn/en_releasepaper/content/4757256 |
2. Variational Minimizers on Periodic Solutions of Singular Hamiltonian Systems with a Fixed Energy | |||
Zhang Shiqing | |||
Mathematics 26 August 2009 | |||
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Abstract:In this paper, we apply the variational minimizing method with Cerami-Palais- Smale conditin to study the existence of new periodic solutions with a prescribed energy for a class of symmetrical singular second order Hamiltonian systems . | |||
TO cite this article:Zhang Shiqing. Variational Minimizers on Periodic Solutions of Singular Hamiltonian Systems with a Fixed Energy[OL].[26 August 2009] http://en.paper.edu.cn/en_releasepaper/content/34637 |
3. Existence of solutions for a p(x)-Kirchhoff-type | |||
Ruifang Hao | |||
Mathematics 04 January 2009 | |||
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Abstract:This paper is concerned with the existence and multiplicity solutions to a class of p(x)- Kirchhoff-type problem with Dirichlet boundary data. By means of a direct variational approach and the theory of the variable exponent Sobolev spaces, we establish conditions ensuring the existence and multiplicity of solutions for the problem. | |||
TO cite this article:Ruifang Hao. Existence of solutions for a p(x)-Kirchhoff-type[OL].[ 4 January 2009] http://en.paper.edu.cn/en_releasepaper/content/27271 |
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