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. (English). Applications of Mathematics, vol. 63 (2018), issue 5, pp. 523-539

MSC: 35K10, 35K55, 35K57, 35K59, 35K90, 47J35 | MR 3870147 | Zbl 06986924 | DOI: 10.21136/AM.2018.0136-18

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Keywords:
existence of solutions; anti-periodic; monotone operator; maximal monotone operator; Schaefer fixed-point theorem; monotonicity method; diffusion equation

Summary:
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.

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