44 citations to https://www.mathnet.ru/rus/smj2495
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N. N. Vassiliev, I. N. Parasidis, E. Providas, “Exact solution method for Fredholm integro-differential equations with multipoint and integral boundary conditions. Part 1. Extention method”, Informacionno-upravlâûŝie sistemy, 2018, no. 6, 14
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T. Sh. Kal'menov, “Boundary conditions for the Cauchy potential for two-dimensional hyperbolic equations”, International Conference Functional Analysis In Interdisciplinary Applications (FAIA 2017), AIP Conf. Proc., 1880, ed. T. Kalmenov, M. Sadybekov, Amer. Inst. Phys., 2017, UNSP 040002
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Т. Ш. Кальменов, М. А. Садыбеков, “О задаче типа Франкля для уравнения смешанного параболо-гиперболического типа”, Сиб. матем. журн., 58:2 (2017), 298–304 ; T. Sh. Kal'menov, M. A. Sadybekov, “On a Frankl-type problem for a mixed parabolic-hyperbolic equation”, Siberian Math. J., 58:2 (2017), 227–231
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Т. Ш. Кальменов, М. Отелбаев, “Критерий граничности интегральных операторов”, Докл. РАН, 466:4 pages 395–398 (2016) ; T. Sh. Kal'menov, M. Otelbaev, “Boundary criterion for integral operators”, Dokl. Math., 93:1 (2016), 58–61
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N. E. Erzhanov, I. Orazov, “On one mathematical model of the extraction process of polydisperse porous material”, Вестн. ЮУрГУ. Сер. Матем. моделирование и программирование, 9:2 (2016), 5–15
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T. Sh. Kal'menov, G. D. Arepova, “On a heat and mass transfer model for the locally inhomogeneous initial data”, Вестн. ЮУрГУ. Сер. Матем. моделирование и программирование, 9:2 (2016), 124–129
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T. Sh. Kal'menov, G. D. Arepova, “Quasi-spectral decomposition of the heat potential”, Electron. J. Differ. Equ., 2016, 76
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T. Kal'menov, G. Arepova, “On a heat and mass transfer model for the locally inhomogeneous initial data”, Applications of Mathematics in Engineering and Economics (AMEE'16), AIP Conf. Proc., 1789, eds. V. Pasheva, N. Popivanov, G. Venkov, Amer. Inst. Phys., 2016, UNSP 040028
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M. Sadybekov, B. Torebek, “On a class of nonlocal boundary value problems for the Laplace operator in a disk”, Applications of Mathematics in Engineering and Economics (AMEE'16), AIP Conf. Proc., 1789, eds. V. Pasheva, N. Popivanov, G. Venkov, Amer. Inst. Phys., 2016, UNSP 040025
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A. A. Sarsenbi, L. K. Zhumanova, “First regularized trace of integro-differential Sturm–Liouville operator on a segment with punctured points at generalized conditions of bonding in deleted points”, Applications of Mathematics in Engineering and Economics (AMEE'16), AIP Conf. Proc., 1789, eds. V. Pasheva, N. Popivanov, G. Venkov, Amer. Inst. Phys., 2016, UNSP 040009