Condition for solvability of a boundary value problem and bifurcation of its solution

Authors

DOI:

https://doi.org/10.26577/JMMCS.2020.v108.i4.01
        100 83

Keywords:

boundary problem with perturbation, generated boundary problem, the criterion of solvability, the critical case, the bifurcation of solution, algebraical system

Abstract

In this paper, we study the solvability of a linear inhomogeneous boundary value problem with perturbations for a system of second-order ordinary differential equations whose coefficients are real, continuous, and continuously differentiable on a segment. It is known that the boundary value problem considered in this paper is not always solvable, provided that the boundary value problem generating it for a system of second-order ordinary differential equations has no solutions for arbitrary inhomogeneities. The relationship between the considered linear inhomogeneous boundary value problem with perturbation for a system of second-order ordinary differential equations and an algebraic system is established. The coefficients of an algebraic system consist of the coefficients of a linear inhomogeneous boundary value problem with perturbation for a system of second-order ordinary differential equations. Based on the relationship between the boundary value problem under consideration and the algebraic system, a condition for the solvability of a linear inhomogeneous boundary value problem with perturbation for a system of second-order ordinary differential equations is found. It turned out that if this solvability condition is met, there is at least one solution of a linear inhomogeneous boundary value problem with perturbation for a system of second-order ordinary differential equations, which has the form of a partial sum of a convergent Laurent series.

References

[1] S.M. Chuiko and I.A. Boichuk, "Autonomous Noetherian boundary-value problem in the critical case", Nonlin. Oscillat. 12:3(2009), 417–428.
[2] A.A. Boichuk, S.M. Chujko, "Autonomous weakly nonlinear boundary value problems", Differ. Equ. 28:10(1992), 1353–1358.
[3] Chuiko S.M., "Domain of convergence of an iterative procedure for an autonomous boundary-value problem", Nonlin. Oscillat. 9:3(2006), 405–422. DOI: https://doi.org/10.1007/s11072-006-0053-y
[4] Chuiko S.M., Boichuk I.A. & Pirus O.E., "On the approximate solution of an autonomous boundary-value problem by the Newton–Kantorovich method", J. Math. Sci. 189:5(2013), 867–881. DOI: https://doi.org/10.1007/s10958-013-1225-9
[5] Chuiko S. M., Starkova O. V., "Avtonomnye kraevye zadachi v chastnom kriticheskom sluchae [Autonomous boundary value problems in a particular critical case]", Dynamic systems 27(2009), 127–142. [in Russian].
[6] Boichuk A. A., Konstruktivnye metody analiza kraevyh zadach [Constructive methods of analysis of boundary value problems] (K.: Scientific.thought, 1990) [in Russian].
[7] A. A. Boichuk, V. F. Zhuravlev and A. M. Samoilenko, Obobshchenno-obratnye operatory i neterovy kraevye zadachi [Generalized inverse operators and Noether boundary-value problem] (Kiyv: Proceedings of the Institute of Mathematics of the National Academy of Sciences of Ukraine, 1995) [in Russian].
[8] Chuiko S.M., "Bifurcation of solutions of a linear Fredholm boundary-value problem", Ukr. Math. J. 59:8(2007), 1274–1279. DOI: https://doi.org/10.1007/s11253-007-0087-z
[9] Boichuk A.A., Samoilenko A.M., Generalized inverse operators and Fredholm boundary-value problems (Utrecht, Boston: VPS. 2004).
[10] Stanzhitskii A.N., Mynbayeva S.T. & Marchuk N.A., "Averaging in Boundary-Value Problems for Systems of Differential and Integrodifferential Equations", Ukr. Math. J. 72:2(2020), 277–301. DOI: https://doi.org/10.1007/s11253-020-01781-2
[11] A.A. Boichuk, L.M. Shegda, "Bifurcation of Solutions of Singular Fredholm Boundary Value Problems", Differ. Equ. 47:4(2011), 453–461. DOI: https://doi.org/10.1134/S001226611104001X
[12] Shovkoplyas T.V., "Dostatochnye usloviya vozniknoveniya resheniya slabovozmushchennoj kraevoj zadachi [Sufficient conditions for the emergence of a solution to a weakly confused boundary value problem]", Dynamical systems 27(2009), 143–149 [in
Ukrainian].
[13] Shovkoplyas T.V., "Slabovozmushchennye linejnye kraevye zadachi dlya sistem differencial’nyh uravnenij vtorogo poryadka [Weakly confused linear boundary value problems for systems of second-order differential equations]", (Reports of the National Academy of Sciences of Ukraine, 4(2002), 31–36) [in Russian].
[14] Shovkoplyas T.S., "A criterion for the solvability of A linear boundary-value problem for A system of the second order", Ukr. Math. J. 52:6(2000), 987–991. DOI: https://doi.org/10.1007/BF02591795
[15] Voevodin V.V., Kuznetsov Yu.A., Matricy i vychisleniya [Matrices and computations] (M.: Science, 1984) [in Russian].
[16] Shovkoplyas T.V., "Dostatochnye usloviya bifurkacii resheniya impul’snoj kraevoj zadachi s vozmushcheniem [Sufficient bifurcation conditions for the solution of a pulsed boundary value problem with perturbation]", Dynamical Systems 28(2010), 141–152 [in Ukrainian].
[17] M.I. Vishik, L.A. Lyusternik, "The solution of some perturbation problems for matrices and selfadjoint or non-selfadjoint differential equations. I", Russian Math. Surveys 15:3(1960), 1–73.

Downloads

How to Cite

Stanzhytskyi, O. M., & Shovkoplyas, T. V. (2020). Condition for solvability of a boundary value problem and bifurcation of its solution. Journal of Mathematics, Mechanics and Computer Science, 108(4), 3–17. https://doi.org/10.26577/JMMCS.2020.v108.i4.01