具有非对称势的非线性耦合Schrödinger方程的无限多同步解

IF 0.6 Q4 MATHEMATICS, APPLIED Methods and applications of analysis Pub Date : 2020-01-01 DOI:10.4310/maa.2020.v27.n3.a2

Chunhua Wang, Jing Zhou

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引用次数: 0

摘要

。研究了R N(2≤N < 6)中的非线性耦合Schr¨odinger方程。假设系统中的势是连续函数，满足一定的衰减假设，但不具有任何对称性质，系统中的参数满足一定的限制条件。利用两次Liapunov-Schmidt约简方法，结合局域能量法，证明了该问题具有无穷多个正同步解。

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Infinitely many synchronized solutions to a nonlinearly coupled Schrödinger equations with non-symmetric potentials

. We study a nonlinearly coupled Schr¨odinger equations in R N (2 ≤ N < 6) . Assume that the potentials in the system are continuous functions satisfying some suitable decay assumptions but without any symmetric properties, and the parameters in the system satisfy some restrictions. Applying the Liapunov-Schmidt reduction methods twice and combining localized energy method, we prove that the problem has inﬁnitely many positive synchronized solutions.

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Methods and applications of analysis MATHEMATICS, APPLIED-

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33.30%

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