Kovaleva, Lyudmila Aleksandrovna; Konkina, Aleksandra Sergeevna; Zagrebina, Sof’ya Aleksandrovna Stochastic Barenblatt-Zheltov-Kochina model with Neumann condition and multipoint initial-final value condition. (English) Zbl 1513.60083 J. Comput. Eng. Math. 9, No. 1, 24-34 (2022). Summary: The article deals with the stochastic Barenblatt-Zheltov-Kochina model with the Neumann condition. We prove trajectory-wise unique solvability of the multipoint initial-final value problem for the considered model in the domain. The article, in addition to the introduction and references, contains three parts. The first and second parts present theoretical information about deterministic and stochastic equations of Sobolev type with the multipoint initial-final value condition. The third part examines the solvability of the Bareblatt-Zheltov-Kochina model with the Neumann condition and the initial-final value condition. Cited in 1 Document MSC: 60H15 Stochastic partial differential equations (aspects of stochastic analysis) 35G05 Linear higher-order PDEs Keywords:Sobolev type equations; additive white noise; relatively bounded operator; stochastic Barenblatt-Zheltov-Kochina model; Neumann condition; multipoint initial-final value condition × Cite Format Result Cite Review PDF Full Text: DOI MNR