On a new nonlocal boundary value problem for an equation of the mixed parabolic-hyperbolic type

Authors

  • М. А. Садыбеков Institute of Mathematics and Mathematical Modeling, Almaty, Republic of Kazakhstan
  • Г. Дилдабек al-Farabi Kazakh National University, Almaty, Republic of Kazakhstan
  • А. А. Тенгаева Kazakh National Agrarian University, Almaty, Republic of Kazakhstan
        64 129

Keywords:

nonlocal boundary conditions, equation of the parabolic-hyperbolic type, Green’s function, strong solution

Abstract

In the present work a new nonlocal boundary value problem for an equation of the mixed type
is formulated. This equation is parabolic-hyperbolic and belongs to the first kind because the
line of type change is not a characteristic of the equation. Nonlocal condition links points on
boundaries of the parabolic and hyperbolic parts of the domain with each other. This problem
is generalization of the well-known problems of Frankl type. A boundary value problem for the
heat equation with conditions of the Samarskii-Ionlin type arises in solving this problem. Unlike
the existing publications of the other authors related to the theme it is necessary to note that
in this papers nonlocal problems were considered in rectangular domains. But in our formulation
of the problem the hyperbolic part of the domain coincides with a characteristical triangle. The
formulated problem is equivalently reduced to an integral Volterra equation of the second kind.
Unique strong solvability of the formulated problem is proved.

References

[1] Kapustin N.Yu. A generalized solvability of Tricomi problem for parabolic-hyperbolic equation // Doklady Akademii Nauk SSSR. – 1984. – Т. 274, No 6. – С. 1294 – 1298.
[2] Kapustin N.Yu. The existence and uniqueness of L 2 –solutions of Tricomi problem for a parabolic-hyperbolic equation // Doklady Akademii Nauk SSSR. – 1986. – Т. 291, No 2. – С. 288 – 292.
[3] Berdyshev A.S. Kraevye zadachi i ih spektral’nye svoistva dlya uravneniya smeshannogo parabolo-giperbolicheskogo i smeshanno-sostavnogo tipov. – Almaty. – 2015. – 224 p. (in Russ.).
[4] Frankl F. To the theory of the Laval nozzle // Izv. Akad. Nauk SSSR Ser. Mat. — 1945. – Т. 9, No 2. – P. 121 – 142.
[5] Frankl F.I. Subsonic flow about a profile with a supersonic zone // Prikl. Mat. Mekh. – 1956. – Т. 20, No 2. – P. 196 – 202.
[6] Rakhmanova L.Kh. Solution of a nonlocal problem for a mixed-type parabolic-hyperbolic equation in a rectangular domain by the spectral method // Izv. Vyssh. Uchebn. Zaved. Mat. – 2007. – No 11 (546). – P. 36 – 40.
[7] Sabitov K.B., Rakhmanova L.K. Initial-boundary value problem for an equation of mixed parabolic-hyperbolic type in a rectangular domain // Differential Equations. – 2008. – Т.44, No 9. – P. 1175 – 1181.
[8] Sabitov K.B. Nonlocal Problem for a Parabolic-Hyperbolic Equation in a Rectangular Domain // Mat. Zametki. – 2011. – Т. 89, No4. – P. 596 – 602.
[9] Moiseev E.I., Nefedov P.V., Kholomeeva A.A. Analogs of the Tricomi and Frankl problems for the Lavrent’ev-Bitsadze equation in three-dimensional domains // Differential Equations. – 2014. – Т. 50, No 12. – С. 1677 – 1680.
[10] Nakhushev A.M. Problems with displacements for partial differential equations. -– Nauka, Moscow. — 2006.
[11] Ionkin N.I. Solution of a boundary value problem with non-classical boundary condition in heat conduction theory // Differential Equations. – 1977. – Т.13, No 2. – P. 294 – 304.
[12] Ionkin N.I., Moiseev E.I. A problem for the heat conduction equation with two-point boundary condition // Differential Equations. – 1979. – Т.15, No 7. – P. 1284 – 1295.
[13] Dildabek G., Tengayeva A.A. Constructing a basis from systems of eigenfunctions of one not strengthened regular boundary value problem // ВVestnik KаzNU, ser. mаt., meh., inf. – 2015. – No 1(84). – P. 36 – 44.
[14] Babich V.M. et al., Mihlin S.G. Ed. Linear equations of mathematical physics // Ref. Math. Library. – Nauka, Moscow. – 1964.
[15] Sadybekov M.A., Toizhanova G.D. Spectral properties of a class of boundary value problems for a parabolic-hyperbolic equation // Differential Equations. – 1992. – Т. 28, No 1. – P. 176 – 179.
[16] Berdyshev A.S. The volterra property of some problems with the Bitsadze–Samarskii-type conditions for a mixed parabolic-hyperbolic equation // Sibirsk. Mat. Zh. – 2005. – Т. 46, No3. — P. 500 – 510.
[17] Akhtaeva N.S., Karimov E.T. A boundary value problem with adjointing condition of integral type for mixed parabolic-hyperbolic equations with non-characteristic line type change // Vestnik KаzNU, ser. mаt., meh., inf. – 2013. – No 2(77). – P. 64 – 70.

Downloads

How to Cite

Садыбеков, М. А., Дилдабек, Г., & Тенгаева, А. А. (2017). On a new nonlocal boundary value problem for an equation of the mixed parabolic-hyperbolic type. Journal of Mathematics, Mechanics and Computer Science, 88(1), 55–66. Retrieved from https://bm.kaznu.kz/index.php/kaznu/article/view/330