EXISTENCE OF SOLUTIONS FOR NONLINEAR NONMONOTONE EVOLUTION EQUATIONS IN BANACH SPACES WITH ANTI-PERIODIC BOUNDARY CONDITIONS

Boussandel Sahbi

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EXISTENCE OF SOLUTIONS FOR NONLINEAR NONMONOTONE EVOLUTION EQUATIONS IN BANACH SPACES WITH ANTI-PERIODIC BOUNDARY CONDITIONS

机译：具有周期边界条件的Banach空间中非线性非单调演化方程解的存在性。

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The paper is devoted to the study of the existence of solutions for nonlinear nonmonotone evolution equations in Banach spaces involving anti-periodic boundary conditions. Our approach in this study relies on the theory of monotone and maximal monotone operators combined with the Schaefer fixed-point theorem and the monotonicity method. We apply our abstract results in order to solve a diffusion equation of Kirchhoff type involving the Dirichlet p-Laplace operator.

机译：本文致力于研究涉及反周期边界条件的Banach空间中非线性非单调演化方程解的存在性。我们在本研究中的方法依赖于单调和最大单调算子的理论，并结合Schaefer定点定理和单调性方法。为了解决涉及Dirichlet p-Laplace算子的Kirchhoff型扩散方程，我们应用了抽象结果。

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来源
《Applications of Mathematics》 |2018年第5期|523-539|共17页
作者
Boussandel Sahbi;
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作者单位

Univ Carthage, Fac Sci Bizerte, Dept Math, Lab EDP & Applicat LR03ES04, 7021 Jarzouna Bizerte, Bizerte, Tunisia;

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正文语种 eng
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关键词
existence of solutions; anti-periodic; monotone operator; maximal monotone operator; Schaefer fixed-point theorem; monotonicity method; diffusion equation;

机译：解的存在性;反周期;单调算子;最大单调算子;Schaefer不动点定理;单调性法;扩散方程;

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专利

1. Existence of solutions for nonlinear nonmonotone evolution equations in Banach spaces with anti-periodic boundary conditions [J] . Sahbi Boussandel Applications of mathematics . 2018,第5期

机译：具有反周期边界条件的Banach空间中非线性非单调发展方程解的存在性
2. Existence of solutions for evolution equations in Hilbert spaces with anti-periodic boundary conditions and its applications [J] . Sahbi Boussandel Applications of mathematics . 2018,第4期

机译：具有反周期边界条件的希尔伯特空间中演化方程解的存在性及其应用
3. EXISTENCE OF SOLUTIONS FOR EVOLUTION EQUATIONS IN HILBERT SPACES WITH ANTI-PERIODIC BOUNDARY CONDITIONS AND ITS APPLICATIONS [J] . Boussandel Sahbi Applications of Mathematics . 2018,第4期

机译：具有反周期边界条件的希尔伯特空间中演化方程解的存在性及其应用
4. Existence of Solution for Boundary Value Problem of Impulsive Differential Equations in Banach Spaces [C] . Dehong Ji, Weigao Ge Advances in computer science and engineering . 2012

机译：Banach空间中脉冲微分方程边值问题解的存在性。
5. Iteration methods for approximation of solutions of nonlinear equations in Banach spaces. [D] . Chidume, Chukwudi. 2008

机译：Banach空间中非线性方程解的逼近迭代方法。
6. ON A „MONOTONICITY METHOD FOR THE SOLUTION OF NONLINEAR EQUATIONS IN BANACH SPACES [O] . George J. Minty 1963

机译：Banach空间中非线性方程解的单调性方法
7. Existence of solutions for evolution equations in Hilbert spaces with anti-periodic boundary conditions and its applications [O] . Sahbi Boussandel 2018

机译：抗周期边界条件及其应用的希尔伯特空间中演化方程解的存在性
8. The Existence, Uniqueness, Differentiability, and Analyticity of the Solutions of Non-Linear Differential Equations in Banach Spaces with Applications to Navier Stokes Equations [R] . Khatchatooriantz, L. A. 1968

机译：Banach空间中非线性微分方程解的存在唯一性，可微性和解析性及其在Navier stokes方程中的应用

EXISTENCE OF SOLUTIONS FOR NONLINEAR NONMONOTONE EVOLUTION EQUATIONS IN BANACH SPACES WITH ANTI-PERIODIC BOUNDARY CONDITIONS

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