Boundary Value Problems for Fourth Order Nonlinearp-Laplacian Difference Equations

Boundary value problems for Caputo-Hadamard fractional differential inclusions with Integral Conditions

Moroccan Journal of Pure and Applied Analysis ◽

10.2478/mjpaa-2020-0006 ◽

2020 ◽

Vol 6 (1) ◽

pp. 62-75

Author(s):

Ahmed Zahed ◽

Samira Hamani ◽

Johnny Henderson

Keyword(s):

Boundary Value Problem ◽

Boundary Value Problems ◽

Differential Inclusions ◽

Existence Of Solutions ◽

Boundary Value ◽

Sufficient Conditions ◽

Fractional Differential Inclusions ◽

Integral Conditions ◽

Right Hand ◽

Fractional Differential

AbstractFor r ∈ (1, 2], the authors establish sufficient conditions for the existence of solutions for a class of boundary value problem for rth order Caputo-Hadamard fractional differential inclusions satisfying nonlinear integral conditions. Both cases of convex and nonconvex valued right hand sides are considered.

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On Nonlinear Boundary Value Problems for Functional Difference Equations withp-Laplacian

Discrete Dynamics in Nature and Society ◽

10.1155/2010/396840 ◽

2010 ◽

Vol 2010 ◽

pp. 1-12 ◽

Cited By ~ 1

Author(s):

Yong Wan ◽

Yuji Liu

Keyword(s):

Boundary Value Problems ◽

Difference Equations ◽

Nonlinear Boundary ◽

Existence Of Solutions ◽

Boundary Value ◽

Sufficient Conditions ◽

Functional Difference ◽

Nonlinear Boundary Value Problems ◽

Nonlinear Boundary Value ◽

Functional Difference Equations

Sufficient conditions for the existence of solutions of nonlinear boundary value problems for higher-order functional difference equations withp-Laplacian are established by making of continuation theorems. We allowfto be at most linear, superlinear, or sublinear in obtained results.

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Existence Theorems for Some Classes of Boundary Value Problems Involving the P(X)-Laplacian

Nonlinear Analysis Modelling and Control ◽

10.15388/na.2008.13.2.14575 ◽

2008 ◽

Vol 13 (2) ◽

pp. 145-158

Author(s):

Ionica Andrei

Keyword(s):

Eigenvalue Problem ◽

Boundary Value Problem ◽

Boundary Value Problems ◽

Theoretical Approach ◽

Eigenvalue Problems ◽

Nonlinear Eigenvalue Problem ◽

Existence Theorems ◽

Boundary Value ◽

Mountain Pass ◽

Mountain Pass Lemma

We prove an alternative for a nonlinear eigenvalue problem involving the p(x)-Laplacian and study a subcritical boundary value problem for the same operator. The theoretical approach is the Mountain Pass Lemma and one of its variants, which is very useful in the study of eigenvalue problems.

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On a regularization method for solving linear Noetherian boundary value problem for difference system

Proceedings of the Institute of Applied Mathematics and Mechanics NAS of Ukraine ◽

10.37069/1683-4720-2018-32-14 ◽

2018 ◽

Vol 32 ◽

pp. 133-148

Author(s):

Sergei Chuiko ◽

Elena Chuiko ◽

Yaroslav Kalinichenko

Keyword(s):

Boundary Value Problem ◽

Boundary Value Problems ◽

Difference Equations ◽

Critical Case ◽

Boundary Value ◽

Sufficient Conditions ◽

Bounded Solutions ◽

Homogeneous Part ◽

System Of Difference Equations ◽

Regularization Problem

The article proposes unusual regularization conditions as well as a scheme for finding bounded solutions of the linear Noetherian boundary value problem for a system of difference equations in the critical case, significantly using the Moore-Penrose matrix pseudo-inversion technology. The problem posed in the article continues the study of the a sufficient condition for solvability and regularization conditions for linear Noetherian boundary value problems in the critical case given in the monographs by A.N. Tikhonov, V.Ya. Arsenin, S.G. Krein, A.M. Samoilenko, N.V. Azbelev, V.P. Maksimov, L.F. Rakhmatullina and A.A. Boichuk. The general case is studied in which a linear bounded operator corresponding to a homogeneous part of a linear Noetherian boundary value problem has no inverse. The noninvertibility of the operators corresponding to a homogeneous part of a linear Noetherian boundary value problem is a consequence of the fact that the number of boundary conditions does not coincide with the number of unknown variables of the difference equations. Using the theory of generalized inverse operators and Moore-Penrose pseudoinverse matrix in the article, a generalized Green operator is constructed and the type of a linear perturbation of a regularized linear Noether boundary value problem for a system of difference equations in the critical case is found. The proposed regularization conditions, as well as the scheme for finding of bounded solutions to linear Noetherian boundary value problems for a system of difference equations in the critical case, are illustrated in details with examples. In contrast to the earlier articles of the authors, the regularization problem for a linear Noether boundary value problem for a system of difference equations in the critical case has been resolved constructively, and sufficient conditions has been obtained for the existence of a bounded solution to the regularization problem.

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Linear Noetherian boundary value problem for a matrix difference-algebraic Lyapunov equation

V N Karazin Kharkiv National University Ser Mathematics Applied Mathematics and Mechanics ◽

10.26565/2221-5646-2020-92-01 ◽

2020 ◽

Keyword(s):

Boundary Value Problem ◽

Boundary Value Problems ◽

Difference Equations ◽

Boundary Value ◽

Sufficient Conditions ◽

Lyapunov Equation ◽

Linear Boundary ◽

Actual Problem ◽

Linear Differential ◽

Necessary And Sufficient

The study of differential-algebraic boundary value problems was initiated in the works of K. Weierstrass, N. N. Luzin and F. R. Gantmacher. Systematic study of differential-algebraic boundary value problems is devoted to the work of S. Campbell, Yu. E. Boyarintsev, V. F. Chistyakov, A. M. Samoilenko, M. O. Perestyuk, V. P. Yakovets, O. A. Boichuk, A. Ilchmann and T. Reis. The study of the differential-algebraic boundary value problems is associated with numerous applications of such problems in the theory of nonlinear oscillations, in mechanics, biology, radio engineering, theory of control, theory of motion stability. At the same time, the study of differential algebraic boundary value problems is closely related to the study of boundary value problems for difference equations, initiated in A. A. Markov, S. N. Bernstein, Ya. S. Besikovich, A. O. Gelfond, S. L. Sobolev, V. S. Ryaben’kii, V. B. Demidovich, A. Halanay, G. I. Marchuk, A. A. Samarskii, Yu. A. Mitropolsky, D. I. Martynyuk, G. M. Vayniko, A. M. Samoilenko, O. A. Boichuk and O. M. Standzhitsky. Study of nonlinear singularly perturbed boundary value problems for difference equations in partial differences is devoted to the work of V. P. Anosov, L. S. Frank, P. E. Sobolevskii, A. L. Skubachevskii and A. Asheraliev. Consequently, the actual problem is the transfer of the results obtained in the articles by S. Campbell, A. M. Samoilenko and O. A. Boichuk on linear boundary value problems for difference-algebraic equations, in particular finding the necessary and sufficient conditions for the existence of the desired solutions, and also the construction of the Green’s operator of the Cauchy problem and the generalized Green operator of a linear boundary value problem for a difference-algebraic equation. Thus, the actual problem is the transfer of the results obtained in the articles and monographs of S. Campbell, A. M. Samoilenko and O. A. Boichuk on the linear boundary value problems for the differential-algebraic boundary value problem for a matrix Lyapunov equation, in particular, finding the necessary and sufficient conditions of the existence of the desired solutions of the linear differential-algebraic boundary value problem for a matrix Lyapunov equation. In this article we found the conditions of the existence and constructive scheme for finding the solutions of the linear Noetherian differential-algebraic boundary value problem for a matrix Lyapunov equation. The proposed scheme of the research of the linear differential-algebraic boundary value problem for a matrix Lyapunov equation in the critical case in this article can be transferred to the seminonlinear differential-algebraic boundary value problem for a matrix Lyapunov equation.

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Existence of solutions for fourth-order nonlinear boundary value problems

Advances in Difference Equations ◽

10.1186/s13662-021-03354-4 ◽

2021 ◽

Vol 2021 (1) ◽

Author(s):

Mingzhu Huang

Keyword(s):

Boundary Value Problem ◽

Boundary Value Problems ◽

Fourth Order ◽

Nonlinear Boundary ◽

Existence Of Solutions ◽

Boundary Value ◽

Lower Solution ◽

Nonlinear Boundary Value Problems ◽

Nonlinear Boundary Value ◽

Quasilinearization Technique

AbstractIn this paper, we discuss the existence and approximation of solutions for a fourth-order nonlinear boundary value problem by using a quasilinearization technique. In the presence of a lower solution α and an upper solution β in the reverse order $\alpha \geq \beta $ α ≥ β , we show the existence of (extreme) solution.

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On the solvability of the degenerate Noetherian difference-algebraic boundary value problem

Proceedings of the Institute of Applied Mathematics and Mechanics NAS of Ukraine ◽

10.37069/1683-4720-2019-33-16 ◽

2019 ◽

Vol 33 ◽

pp. 204-217

Author(s):

Sergei Chuiko ◽

Yaroslav Kalinichenko ◽

Nikita Popov

Keyword(s):

Boundary Value Problem ◽

Boundary Value Problems ◽

Difference Equations ◽

Nonlinear Oscillations ◽

Bounded Operator ◽

Boundary Value ◽

Homogeneous Part ◽

Solvability Conditions ◽

Engineering Control ◽

Generalized Green Operator

The original conditions of solvability and the scheme of finding solutions of a linear Noetherian difference-algebraic boundary-value problem are proposed in the article, while the technique of pseudoinversion of matrices by Moore-Penrose is substantially used. The problem posed in the article continues to study the conditions for solvability of linear Noetherian boundary value problems given in the monographs of A.M. Samoilenko, A.V. Azbelev, V.P. Maximov, L.F. Rakhmatullina and A.A. Boichuk. The study of differential-algebraic boundary-value problems is closely related to the investigation of boundary-value problems for difference equations, initiated in the works of A.A. Markov, S.N. Bernstein, Y.S. Bezikovych, O.O. Gelfond, S.L. Sobolev, V.S. Ryabenkyi, V.B. Demidovych, A. Halanai, G.I. Marchuk, A.A. Samarskyi, Yu.A. Mytropolskyi, D.I. Martyniuk, G.M. Vainiko, A.M. Samoilenko and A.A. Boichuk. On the other hand, the study of boundary-value problems for difference equations is related to the study of differential-algebraic boundary-value problems initiated in the papers of K. Weierstrass, N.N. Lusin and F.R. Gantmacher. Systematic study of differential-algebraic boundary value problems is devoted to the works of S. Campbell, Yu.E. Boyarintsev, V.F. Chistyakov, A.M. Samoilenko, N.A. Perestiyk, V.P. Yakovets, A.A. Boichuk, A. Ilchmann and T. Reis. The study of differential-algebraic boundary value problems is also associated with numerous applications of such problems in the theory of nonlinear oscillations, in mechanics, biology, radio engineering, control theory, motion stability theory. The general case of a linear bounded operator corresponding to the homogeneous part of a linear Noetherian difference-algebraic boundary value problem has no inverse is investigated. The generalized Green operator of a linear difference-algebraic boundary value problem is constructed in the article. The relevance of the study of solvability conditions, as well as finding solutions of linear Noetherian difference-algebraic boundary-value problems, is associated with the widespread use of difference-algebraic boundary-value problems obtained by linearizing nonlinear Noetherian boundary-value problems for systems of ordinary differential and difference equations. Solvability conditions are proposed, as well as the scheme of finding solutions of linear Noetherian difference-algebraic boundary value problems are illustrated in detail in the examples.

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Nonlinear boundary-value problems for degenerate differential-algebraic systems

Ukrainian Mathematical Bulletin ◽

10.37069/1810-3200-2020-17-3-2 ◽

2020 ◽

Vol 17 (3) ◽

pp. 313-324

Author(s):

Sergii Chuiko ◽

Ol'ga Nesmelova

Keyword(s):

Boundary Value Problem ◽

Boundary Value Problems ◽

Algebraic System ◽

Boundary Value ◽

Sufficient Conditions ◽

Necessary And Sufficient Conditions ◽

Weakly Nonlinear ◽

Differential Algebraic System ◽

Linear Differential ◽

Necessary And Sufficient

The study of the differential-algebraic boundary value problems, traditional for the Kiev school of nonlinear oscillations, founded by academicians M.M. Krylov, M.M. Bogolyubov, Yu.A. Mitropolsky and A.M. Samoilenko. It was founded in the 19th century in the works of G. Kirchhoff and K. Weierstrass and developed in the 20th century by M.M. Luzin, F.R. Gantmacher, A.M. Tikhonov, A. Rutkas, Yu.D. Shlapac, S.L. Campbell, L.R. Petzold, Yu.E. Boyarintsev, V.F. Chistyakov, A.M. Samoilenko, O.A. Boichuk, V.P. Yacovets, C.W. Gear and others. In the works of S.L. Campbell, L.R. Petzold, Yu.E. Boyarintsev, V.F. Chistyakov, A.M. Samoilenko and V.P. Yakovets were obtained sufficient conditions for the reducibility of the linear differential-algebraic system to the central canonical form and the structure of the general solution of the degenerate linear system was obtained. Assuming that the conditions for the reducibility of the linear differential-algebraic system to the central canonical form were satisfied, O.A.~Boichuk obtained the necessary and sufficient conditions for the solvability of the linear Noetherian differential-algebraic boundary value problem and constructed a generalized Green operator of this problem. Based on this, later O.A. Boichuk and O.O. Pokutnyi obtained the necessary and sufficient conditions for the solvability of the weakly nonlinear differential algebraic boundary value problem, the linear part of which is a Noetherian differential algebraic boundary value problem. Thus, out of the scope of the research, the cases of dependence of the desired solution on an arbitrary continuous function were left, which are typical for the linear differential-algebraic system. Our article is devoted to the study of just such a case. The article uses the original necessary and sufficient conditions for the solvability of the linear Noetherian differential-algebraic boundary value problem and the construction of the generalized Green operator of this problem, constructed by S.M. Chuiko. Based on this, necessary and sufficient conditions for the solvability of the weakly nonlinear differential-algebraic boundary value problem were obtained. A typical feature of the obtained necessary and sufficient conditions for the solvability of the linear and weakly nonlinear differential-algebraic boundary-value problem is its dependence on the means of fixing of the arbitrary continuous function. An improved classification and a convergent iterative scheme for finding approximations to the solutions of weakly nonlinear differential algebraic boundary value problems was constructed in the article.

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Existence of Multiple Positive Solutions for Even Order Multi-Point Boundary Value Problems

Georgian Mathematical Journal ◽

10.1515/gmj.2007.775 ◽

2007 ◽

Vol 14 (4) ◽

pp. 775-792

Author(s):

Youyu Wang ◽

Weigao Ge

Keyword(s):

Fixed Point ◽

Fixed Point Theorem ◽

Boundary Value Problem ◽

Boundary Value Problems ◽

Positive Solutions ◽

Boundary Value ◽

Sufficient Conditions ◽

Multiple Positive Solutions ◽

Point Boundary ◽

Even Order

Abstract In this paper, we consider the existence of multiple positive solutions for the 2𝑛th order 𝑚-point boundary value problem: where (0,1), 0 < ξ 1 < ξ 2 < ⋯ < ξ 𝑚–2 < 1. Using the Leggett–Williams fixed point theorem, we provide sufficient conditions for the existence of at least three positive solutions to the above boundary value problem. The associated Green's function for the above problem is also given.

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On Solvability and Well-Posedness of Boundary Value Problems for Nonlinear Hyperbolic Equations of the Fourth Order

Georgian Mathematical Journal ◽

10.1515/gmj.2008.555 ◽

2008 ◽

Vol 15 (3) ◽

pp. 555-569

Author(s):

Tariel Kiguradze

Keyword(s):

Hyperbolic Equation ◽

Boundary Value Problems ◽

Fourth Order ◽

Hyperbolic Equations ◽

Boundary Value ◽

Sufficient Conditions ◽

Nonlinear Hyperbolic Equation ◽

Well Posedness ◽

Nonlinear Hyperbolic Equations ◽

Right Hand

Abstract In the rectangle Ω = [0, a] × [0, b] the nonlinear hyperbolic equation 𝑢(2,2) = 𝑓(𝑥, 𝑦, 𝑢) with the continuous right-hand side 𝑓 : Ω × ℝ → ℝ is considered. Unimprovable in a sense sufficient conditions of solvability of Dirichlet, Dirichlet–Nicoletti and Nicoletti boundary value problems are established.

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