摘要
利用变分方法和临界点理论,研究了一类Schr?dinger-Poisson系统,其中泊松项为更一般的形式,通过给非线性项加拟临界增长和AR条件,得到了该系统非平凡解的存在性。补充和推广了以往研究Schr?dinger-Poisson系统的相关结果。
We investigate a class of Schr?dinger-Poisson systems, by means of variational method and critical point theory. Here, the Poisson term is a more general form. By adding quasi-critical growth and AR conditions to the nonlinear term, we prove the existence of nontrival solution of the system. The result supplement and promote the previous resluts on the Schr?dinger-Poisson systems.
引文
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