Variational Approaches to Kirchhoff-Type Second-Order Impulsive Differential Equations on the Half-Line

被引:0
作者
Giuseppe Caristi
Shapour Heidarkhani
Amjad Salari
机构
[1] University of Messina,Department of Economics
[2] Razi University,Department of Mathematics, Faculty of Sciences
[3] Islamic Azad University,Young Researchers and Elite Club, Kermanshah Branch
来源
Results in Mathematics | 2018年 / 73卷
关键词
Multiple solutions; half-line; impulsive differential equation; Kirchhoff-type problem; variational methods; critical point theory; 34B15;
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摘要
In this work we continue the study of the multiplicity results for a Kirchhoff-type second-order impulsive differential equation on the half-line. In fact, using a consequence of the local minimum theorem due Bonanno we look into the existence one solution under algebraic conditions on the nonlinear term and two solutions for the problem under algebraic conditions with the classical Ambrosetti–Rabinowitz condition on the nonlinear term. Furthermore, by employing two critical point theorems, one due Averna and Bonanno, and another one due Bonanno we guarantee the existence of two and three solutions for the problem in a special case.
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