含变号权的p-Laplcean算子的特征值问题
On the Eigenvalue Problem for p-Laplcean Operator with Indefinite Weights
摘要: 本文研究含不定权的Hardy-Sobolev算子的特征值问题(不定权表示权函数 可以变号,并具有非平凡的正部),讨论了第一特征值的单一性、非第一特征值的特征函数的变号性和特征值序列的无穷性。并证明了Fu ik谱中非平凡曲线的存在性。
Abstract: In this paper we study the eigenvalue problem for the -Laplcean operator with indefinite weights. The simplicity, isolation of the first eigenvalue is studied here. Furthermore, the existence of a nontrivial curve is shown in the Fu ik spectrum.
文章引用:熊辉. 含变号权的p-Laplcean算子的特征值问题[J]. 理论数学, 2011, 1(2): 54-59. http://dx.doi.org/10.12677/pm.2011.12012

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