Mass velocity of Bose-gas in the problem about isothermal sliding

Bedrikova, E. A.; Латышев, А. В.

doi:10.48550/arxiv.1208.5231

Cited by 1 publication

(2 citation statements)

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“…Настоящая работа является продолжением работ [67] и [68]. В [67] была решена полупространственная задача Крамерса для квантовых Бозегазов: найдена скорость изотермического скольжения вдоль плоской по-верхности и построена функция распределения летящих к стенке молекул непосредственно у стенки.…”

Section: история проблемыunclassified

“…В работе [68] для задачи Крамерса построено распределение массовой скорости Бозе-газа в полупространстве и находится ее значение непосредственно у стенки. Для этого выводится формула факторизации дисперсионной функции.…”

Section: история проблемыunclassified

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The Kramers problem for quantum bose-gases with constant collision frequency and specular-diffusive boundary conditions

Bedrikova,

Latyshev

2012

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The Kramers problem for quantum Bose-gases with specular-diffuse boundary conditions of the kinetic theory is considered. On an example of Kramers problem the new generalized method of a source of the decision of the boundary problems from the kinetic theory is developed. The method allows to receive the decision with any degree of accuracy. At the basis of a method lays the idea of representation of a boundary condition on distribution function in the form of a source in the kinetic equation. By means of integrals Fourier the kinetic equation with a source is reduced to the integral equation of Fredholm type of the second kind. The decision is received in the form of Neumann's series.

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Section: история проблемыunclassified