Siberian Mathematical Journal

, Volume 10, Issue 2, pp 321–327 | Cite as

Criteria for the unique solution of two-point boundary value problems for an ordinary n-TH order differential equation

  • V. A. Churikov
Article

Keywords

Differential Equation Unique Solution Order Differential Equation 

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Literature Cited

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    N. V. Azbelev and Z. B. Tsalyuk, “The problem of the uniqueness of the solution of an integral equation,” Dokl. Akad. Nauk SSSR,156, No. 2, 239–242 (1964).Google Scholar
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    É. Bekkenbakh and R. Bellman, Inequalities, Mir, Moscow (1965).Google Scholar
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    S. A. Pak, “A sequence converging to the solution of a system of ordinary differential equations,” Sib. Matem. Zh.,3, No. 4, 569–574 (1962).Google Scholar
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    V. A. Churikov, “The existence, uniqueness and bounds for the solution of a boundary value problem,” Diff. Urav.,1, No. 7, 933–945 (1965).Google Scholar
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    V. A. Churikov, “The existence of and bounds for the solution of a class of boundary value problems,” Diff. Urav.,2, No. 4, 463–478 (1966).Google Scholar
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    V. A. Churikov, “Criteria for the existence of Green's function for a boundary value problem,” Diff. Urav.,2, No. 9, 1184–1192 (1966).Google Scholar
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    V. A. Churikov, “Criteria for a Green's function constant sign for a two-point boundary value problem,” Vysshikh Uch. Zav., Matematika,57, No. 2, 93–99 (1967).Google Scholar

Copyright information

© Consultants Bureau 1969

Authors and Affiliations

  • V. A. Churikov

There are no affiliations available

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