This article is concerned with the multiplicity results of the solutions for a Kirchhoff-type three-point boundary value problem. The method observed here is according to variational methods and critical point theory. In fact, through a consequence of the local minimum theorem due Bonanno and mountain pass theorem, we look into the existence results for our problem under algebraic conditions with the classical Ambrosetti-Rabinowitz (AR) condition on the nonlinear term. Furthermore, by combining two algebraic conditions on the nonlinear term, employing two consequences of the local minimum theorem due Bonanno we guarantee the existence of two solutions, and applying the mountain pass theorem given by Pucci and Serrin we establish the existence of third solution for the problem

Multiplicity Results for Kirchhoff-Type Three-Point Boundary Value Problems / Ferrara, Massimiliano; Heidarkhani, S; Caristi, G; Salari, A. - In: ACTA APPLICANDAE MATHEMATICAE. - ISSN 0167-8019. - 156:1(2018), pp. 133-157. [10.1007/s10440-018-0157-2]

Multiplicity Results for Kirchhoff-Type Three-Point Boundary Value Problems

FERRARA, Massimiliano
Supervision
;
2018-01-01

Abstract

This article is concerned with the multiplicity results of the solutions for a Kirchhoff-type three-point boundary value problem. The method observed here is according to variational methods and critical point theory. In fact, through a consequence of the local minimum theorem due Bonanno and mountain pass theorem, we look into the existence results for our problem under algebraic conditions with the classical Ambrosetti-Rabinowitz (AR) condition on the nonlinear term. Furthermore, by combining two algebraic conditions on the nonlinear term, employing two consequences of the local minimum theorem due Bonanno we guarantee the existence of two solutions, and applying the mountain pass theorem given by Pucci and Serrin we establish the existence of third solution for the problem
2018
Three solutions; Three-point boundary value problem; Second-order Kirchhoff-type equation; Lipschitz condition; Variational methods; Critical point theory
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/20.500.12318/4594
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