大冰原下土层的自由移动边界问题

F. dell’Isola, K. Hutter
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引用次数: 0

摘要

我们为可能在冰川或大冰盖下形成的土层(即土壤+水)层制定了一个自由移动的边界问题,当含水量使这些层在剪切变形时光滑时,被认为是它们灾难性前进的原因。我们指出了FMBP是如何形成的,将其专门用于稳定的平面流动,并推导了一个描述固体体积分数在层间分布的常微分方程。这个微分方程是二阶的,并产生一个奇异摄动解过程。这个问题可以在假定流体粘度是固体体积分数的单调函数的情况下进行分析。然而,在本文中,我们证明了通过选择恒定的流体粘度和消失的热力学压力,出现的固体体积分数在物理上是没有意义的。
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A Free Moving Boundary Problem for the Till Layer Below Large Ice Sheets
We formulate a free moving boundary problem for the till (i.e., soil + water) layer that may form below glaciers or large ice sheets and is thought to be responsible for their catastrophic advance when the water content makes such layers slippery against shear deformations. We indicate how the FMBP is formulated, specialize it to steady plane flow and deduce an ordinary differential equation which describes the distribution of the solid's volume fraction across the layer. This differential equation is second order and gives rise to a singular perturbation solution procedure. This problem can be analysed under the assumption that the fluid viscosity is a monotonic function of the solid's volume fraction. However, in this paper we prove that by choosing a constant fluid viscosity and vanishing thermodynamic pressure the emerging solid volume fraction turns out to be physically meaningless.
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On a Structure Theorem for Some Free Boundary Problems for the Heat Equation Instabilities, Bifurcation and Saddle-Points in Some FBPs in Combustion A Free Moving Boundary Problem for the Till Layer Below Large Ice Sheets Adaptive Solution of Parabolic Free Boundary Problems with Error Control On the Bernoulli Free Boundary Problem with Surface Tension
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