| Author(s) |
Li, Gongbao
Peng, Shuangjie
Yan, Shusen
|
| Publication Date |
2010
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| Abstract |
In this paper, simulated by the paper of Wei and Yan [33] (see also [30–32]), we intend to find infinitely many positive solutions to (1.2) for all p ∈ (1, 5) under weaker integrability conditions on K(y) and Q(y). In [33], a single equation, this is, K(y) ≡ 0 in (1.2), was studied and infinitely many non-radial solutions were found in the case that Q(y) is radial. For this, they employed a very novel idea, that is, they use k, the number of the bumps of the solutions, as the parameter to construct Infinitely Many Solutions for Schrödinger-Poisson System 1071 spike solutions for the Schrödinger equation considered.
|
| Citation |
Communications in Contemporary Mathematics, 12(6), p. 1069-1092
|
| ISSN |
1793-6683
0219-1997
|
| Link | |
| Publisher |
World Scientific Publishing Co Pte Ltd
|
| Title |
Infinitely Many Positive Solutions for Nonlinear Schrödinger-Poisson System
|
| Type of document |
Journal Article
|
| Entity Type |
Publication
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