Nonlocal combined problem of Bitsadze-Samarski and Samarski-Ionkin type for a system of pseudoparabolic equations

		ISSN 1683-3414 (Print) • ISSN 1814-0807 (Online)

Home Editorial board Publication ethics Peer review guidelines Current Archive Rules for authors Contacts Address: Markusa st. 22, Vladikavkaz, 362027, RNO-A, Russia Phone: (8672)50-18-06 E-mail: rio@smath.ru	DOI: 10.23671/VNC.2014.1.7420 Nonlocal combined problem of Bitsadze-Samarski and Samarski-Ionkin type for a system of pseudoparabolic equations Mamedov I. G. Vladikavkaz Mathematical Journal 2014. Vol. 16. Issue 1. Abstract: We consider a boundary value problem for a fourth order system of pseudoparabolic equations with discontinuous coefficients and with conditions Bicadze - Samarsky and Samarsky - Ionkin. We find integral representation for a functions in the Sobolev space, which allows one to recover it through the values of certain operators (defining operators), taken at the function. We also justify formulation of the Goursat problem with nonclassical boundary conditions. Keywords: pseudoparabolic equation, nonlocal problem Language: Russian Download the full text For citation: Mamedov I. G. Nonlocal combined problem of Bitsadze-Samarski and Samarski-Ionkin type for a system of pseudoparabolic equations. Vladikavkazskii matematicheskii zhurnal [Vladikavkaz Math. J.], vol. 16, no. 1, pp.30-41. DOI 10.23671/VNC.2014.1.7420 + References 1. Bicadze A. V., Samarskij A. A. O nekotoryh prostejshih obobshhenijah linejnyh jellipticheskih kraevyh zadach Dokl. AN SSSR, 1969, vol. 185, no. 4, pp. 739-740 (Russina). 2. Ionkin N. I. The solution of a certain boundary value problem of the theory of heat conduction with a nonclassical boundary condition. Differ. Uravn. [Differential Equations], 1977, vol. 13, no. 2, pp. 294-304 (Russina). 3. Ionkin N. I., Moiseev E. I. A problem for a heat equation with two-point boundary conditions. Differ. Uravn. [Differential Equations], 1979, vol. 15, no. 7, pp. 1284-1295 (Russina). 4. Samarskij A. A. 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