Exact Solutions to the Oberbeck–boussinesq Equations for Convective Stokes Flows

L. S. Goruleva; I. I. Obabkov; E. Yu. Prosviryakov

doi:10.17804/2410-9908.2024.2.036-049

L. S. Goruleva, I. I. Obabkov, E. Yu. Prosviryakov

EXACT SOLUTIONS TO THE OBERBECK–BOUSSINESQ EQUATIONS FOR CONVECTIVE STOKES FLOWS

DOI: 10.17804/2410-9908.2024.2.036-049

TTo study large-scale convective flows (fluid motion in a thin layer), it is possible, for initial studies, to consider the Stokes approximation when integrating the Oberbeck–Boussinesq equation. The convective derivative in the momentum transfer equations and in the heat conduction equation is in this case assumed to be identically equal to zero. The paper discusses several approaches to constructing exact solutions for slow (creeping) flows of a non-uniformly heated fluid. Formulas for three-dimensional flows in the Lin–Sidorov–Aristov class are given for steady flows. The hydrodynamic fields are described by polynomials. Exact solutions are given for the velocity field nonlinearly depending on two spatial coordinates (longitudinal, or horizontal) with coefficients of nonlinear forms, which depend on the third coordinate. The study shows how it is possible to automate the computation of unknown coefficients for the formation of hydrodynamic fields (velocities and temperatures).

Keywords: exact solution, Navier–Stokes equation, Oberbeck–Boussinesq equation, Stokes approximation, convection

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Л. С. Горулева, И. И. Обабков, Е. Ю. Просвиряков

ТОЧНЫЕ РЕШЕНИЯ ДЛЯ УРАВНЕНИЙ ОБЕРБЕКА – БУССИНЕСКА ДЛЯ КОНВЕКТИВНЫХ ТЕЧЕНИЙ СТОКСА

При изучении конвективных крупномасштабных течений (движение жидкости в тонком слое) можно для первоначальных исследований рассматривать приближение Стокса при интегрировании уравнения Обербека – Буссинеска. В этом случае конвективную производную в уравнениях переноса импульса и в уравнении теплопроводности полагают тождественно равной нулю. В статье рассмотрено несколько подходов к построению точных решений для медленных (ползущих) течений неоднородно нагретой жидкости. Для установившихся течений приведены формулы для трехмерных течений в классе Линя – Сидорова – Аристова. Гидродинамические поля описываются полиномами. Приведены точные решения для поля скоростей, нелинейно зависящего от двух пространственных координат (продольных, или горизонтальных) с коэффициентами нелинейных форм, зависящими от третьей координаты. Показано, как можно автоматизировать вычисления неизвестных коэффициентов для формирования гидродинамических полей (скоростей и температуры).

Ключевые слова: точное решение, уравнение Навье – Стокса, уравнение Обербека – Буссинеска, аппроксимация Стокса, конвекция

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Библиографическая ссылка на статью

Goruleva L. S., Obabkov I. I., Prosviryakov E. Yu. Exact Solutions to the Oberbeck–boussinesq Equations for Convective Stokes Flows // Diagnostics, Resource and Mechanics of materials and structures. - 2024. - Iss. 2. - P. 36-49. -
DOI: 10.17804/2410-9908.2024.2.036-049. -
URL: http://dream-journal.org/issues/2024-2/2024-2_437.html
(accessed: 20.05.2024).