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Analysis of the flows of incompressible fluids with pressure dependent viscosity fulfilling $ u (p, \cdot ) o + \infty $ as $p o +\infty $

机译：分析与压力相关的粘度满足$ \ nu（p，\ cdot）\ to + \ infty $为$ p \ to + \ infty $的不可压缩流体的流动

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summary:Over a large range of the pressure, one cannot ignore the fact that the viscosity grows significantly (even exponentially) with increasing pressure. This paper concerns long-time and large-data existence results for a generalization of the Navier-Stokes fluid whose viscosity depends on the shear rate and the pressure. The novelty of this result stems from the fact that we allow the viscosity to be an unbounded function of pressure as it becomes infinite. In order to include a large class of viscosities and in order to explain the main idea in as simple a manner as possible, we restrict ourselves to a discussion of the spatially periodic problem.

机译：摘要：在很大的压力范围内，人们不能忽视这样一个事实，即粘度随着压力的增加而显着（甚至呈指数增长）增长。本文关注的是Navier-Stokes流体的推广，其长期性和大数据存在性，其粘度取决于剪切速率和压力。该结果的新颖性源于以下事实：当粘度变得无限大时，我们允许粘度成为压力的无限函数。为了包括一大类粘度并以尽可能简单的方式解释主要思想，我们将自己局限于对空间周期性问题的讨论。

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Bulíček, M.; Málek, J.; Rajagopal, K. R.;
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年度 2009
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正文语种 eng
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1. Analysis of the flows of incompressible fluids with pressure dependent viscosity fulfilling $u (p, cdot ) o + infty $ as $p o +infty $ [J] . Bulí?ek M., Málek J., Rajagopal K. R. Czechoslovak Mathematical Journal . 2009,第2期

机译：分析压力依赖性粘度满足$ u（p，cdot）o + infty $ as $ p o + infty $的不可压缩流体的流动
2. ANALYSIS OF THE FLOWS OF INCOMPRESSIBLE FLUIDS WITH PRESSURE DEPENDENT VISCOSITY FULFILLING nu(p, center dot) -> plus infinity AS p -> plus infinity [J] . Bulicek M, Malek J, Rajagopal KR Czechoslovak Mathematical Journal . 2009,第2期

机译：压力依赖性黏度nu（p，中心点）->加无穷大AS p->加无穷大的不可压缩流体的流动分析
3. Analysis of the flows of incompressible fluids with pressure dependent viscosity fulfilling ν(p, ·) → + ∞ AS p → + ∞ [J] . M. Bulíček, J. Málek, K. R. Rajagopal Czechoslovak Mathematical Journal . 2009,第2期

机译：满足ν（p，·）→+∞且压力依赖粘度的不可压缩流体的流动分析AS p→+∞
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8. Flow and Pressure Field Analysis of Parallel Groove Geometry for an Incompressible Fluid with Convective Inertia Effects [R] . Johnson, R. L., Ludwig, L. P., Zuk, J. 1966

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Analysis of the flows of incompressible fluids with pressure dependent viscosity fulfilling $ u (p, \cdot ) o + \infty $ as $p o +\infty $

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