Marino—Prodi perturbation type results and Morse indices of minimax critical points for a class of functionals in Banach spaces

Silvia Cingolani; Giuseppina Vannella

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Marino—Prodi perturbation type results and Morse indices of minimax critical points for a class of functionals in Banach spaces

机译：Banach空间中一类泛函的Marino-Prodi摄动类型结果和极小极大临界点的Morse指数

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In this work, we study a class of Euler functionals defined in Banach spaces, associated with quasilinear elliptic problems involving p-Laplace operator (p > 2). First we obtain perturbation results in the spirit of the remarkable paper by Marino and Prodi (Boll. U.M.I. (4) 11(Suppl. fasc. 3): 1–32, 1975), using the new definition of nondegeneracy given in (Ann. Inst. H. Poincaré: Analyse Non Linéaire. 2:271–292, 2003). We also extend Morse index estimates for minimax critical points, introduced by Lazer and Solimini (Nonlinear Anal. T.M.A. 12:761–775, 1988) in the Hilbert case, to our Banach setting.

机译：在这项工作中，我们研究了在Banach空间中定义的一类Euler泛函，与涉及p-Laplace算子（p> 2）的拟线性椭圆问题有关。首先，我们使用Marino和Prodi（Boll。UMI（4）11（Suppl。fasc。3）：1-32，1975）的出色论文的精神，使用（Ann。Ann。庞加莱研究所（Inst。H.Poincaré）：分析非里昂（LinLinéaire）：2：271-292，2003年）。我们还将Lazer和Solimini（Nillinear Anal。T.M.A. 12：761-775，1988）在Hilbert案例中引入的最小极值临界点的莫尔斯指数估计扩展到我们的Banach设置。

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《Annali di Matematica Pura ed Applicata》 |2007年第1期|155-183|共29页
作者
Silvia Cingolani; Giuseppina Vannella;
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作者单位

Dipartimento di Matematica Politecnico di Bari Via Amendola 126/B 70126 Bari Italy;

Dipartimento di Matematica Politecnico di Bari Via Amendola 126/B 70126 Bari Italy;

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正文语种 eng
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关键词
p-Laplace operator; Perturbation results; Morse theory;

机译：p-Laplace算子;摄动结果;莫尔斯理论;

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Marino—Prodi perturbation type results and Morse indices of minimax critical points for a class of functionals in Banach spaces

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