Unsteady Flow of two Binary Mixtures in a Cylindrical Capillary with Changes in the Internal Energy of the Interface

Описание

Тип публикации: статья из журнала

Год издания: 2022

Идентификатор DOI: 10.17516/1997-1397-2022-15-5-623-634

Ключевые слова: binary mixture, energy condition, interface, internal energy, inverse problem, non-stationary solution, pressure gradient, tau-method, thermal diffusion

Аннотация: The problem of two-dimensional unsteady flow of two immiscible incompressible binary mixtures in a cylindrical capillary in the absence of mass forces is studied. The mixtures are contacted through a common interface on which the energy condition is taken into account. The temperature and concentration of mixtures are distributed aПоказать полностьюccording to the quadratic law. It is in good agreement with the velocity field of the Hiemenz type. The resulting conjugate boundary value problem is a non-linear problem. It is also an inverse problem with respect to the pressure gradient along the axis of the cylindrical tube. To solve the problem the tau-method is used. It was shown that with increasing time the solution of the non-stationary problem tends to a steady state. It was established that the effect of increments of the internal energy of the inter-facial surface significantly affects the dynamics of the flow of mixtures in the layers. © Siberian Federal University.

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Издание

Журнал: Journal of Siberian Federal University - Mathematics and Physics

Выпуск журнала: Vol. 15, Is. 5

Номера страниц: 623-634

ISSN журнала: 19971397

Издатель: Siberian Federal University

Персоны

  • Sobachkina N.L. (Siberian Federal University, Krasnoyarsk, Russian Federation)

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