Slyvka-Tylyshchak, A. I.A. I.Slyvka-TylyshchakMykhasiuk, M. M.M. M.MykhasiukPohoriliak, O. O.O. O.Pohoriliak2026-06-302026-06-302020Slyvka-Tylyshchak, A. I., Mykhasiuk, M. M., Pohoriliak, O. O. (2020). The Cauchy problem for the heat equation on the plane with a random right part from the Orlicz space. Bulletin of Taras Shevchenko National University of Kyiv. Physics and Mathematics(3), 103–109. https://doi.org/10.17721/1812-5409.2020/3.1110.17721/1812-5409.2020/3.11https://ir.library.knu.ua/handle/15071834/26169The heat equation with random conditions is a classical problem of mathematical physics. Recently, a number of works appeared, which in many ways investigated this equation according to the type of random initial conditions. We consider a Cauchy problem for the heat equations with a random right part. We study the inhomogeneous heat equation on the plane with a random right part. We consider the right part as a random function of the Orlicz space. The conditions of existence with probability one classical solution of the problem are investigated. For such a problem has been got the estimation for the distribution of the supremum solution.Key words: stochastic processes of the Orlicz space, heat equation, estimation for the distribution of the supremum solution.Pages of the article in the issue: 103 - 109Language of the article: UkrainianenThe Cauchy problem for the heat equation on the plane with a random right part from the Orlicz spaceСтаття