A CHARACTERIZATION OF THE MOUNTAIN PASS GEOMETRY FOR FUNCTIONALS BOUNDED FROM BELOW

Gabriele Bonanno

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A CHARACTERIZATION OF THE MOUNTAIN PASS GEOMETRY FOR FUNCTIONALS BOUNDED FROM BELOW

机译：从下面绑定的函数的山口几何特征

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In this paper it is proved that, when a regular functional is bounded from below, the mountain pass geometry and the existence of at least two distinct local minima are equivalent conditions. As a consequence, the classical mountain pass theorem, under the additional assumption of boundedness from below of the functional, ensures actually three distinct critical points. Moreover, as application, the existence of three solutions to Hamiltonian systems is established.

机译：本文证明，当一个常规函数从下面定界时，山pass的几何形状和至少两个不同的局部最小值的存在是等效条件。结果，在从函数的下方开始有界的附加假设下，经典的山路定理实际上确保了三个不同的临界点。此外，作为应用，建立了哈密顿系统的三个解的存在。

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《Differential and integral equations》 |2012年第12期|共8页
作者
Gabriele Bonanno;
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原文格式 PDF
正文语种 eng
中图分类微分方程、积分方程;
关键词
CHARACTERIZATION; MOUNTAIN; FUNCTIONALS BOUNDED;

机译：特色;山;功能绑定;

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1. A CHARACTERIZATION OF THE MOUNTAIN PASS GEOMETRY FOR FUNCTIONALS BOUNDED FROM BELOW [J] . Gabriele Bonanno Differential and integral equations . 2012,第11a12期

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2. Bounded Palais-Smale sequences for functionals with a mountain pass geometry [J] . Patrick J. Rabier Archiv der Mathematik . 2007,第2期

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3. On perturbation of a functional with the mountain pass geometry Applications to the nonlinear Schr?dinger–Poisson equations and the nonlinear Klein–Gordon–Maxwell equations [J] . Wonjeong Jeong, Jinmyoung Seok Calculus of variations and partial differential equations . 2014,第1a2期

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A CHARACTERIZATION OF THE MOUNTAIN PASS GEOMETRY FOR FUNCTIONALS BOUNDED FROM BELOW

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