On the propagation of small perturbations in viscous compressible fluid (Q1310692)
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scientific article; zbMATH DE number 482329
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On the propagation of small perturbations in viscous compressible fluid |
scientific article; zbMATH DE number 482329 |
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On the propagation of small perturbations in viscous compressible fluid (English)
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13 January 1994
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Object is to prove that the paradox of the instantaneous propagation of small perturbations in the flow of a compressible viscous fluid is removed if one takes the relation between the stress tensor and the deformation rate tensor not the one given by the classical theory but that obtained considering the dependence on the time of the distribution function of the molecular velocities.
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Cauchy problem
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characteristic lines
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iterative methods
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paradox of the instantaneous propagation
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stress tensor
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deformation rate tensor
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distribution function
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molecular velocities
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0.9644504
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0.9197733
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0.9086154
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0.90845126
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0.8975047
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0.8942876
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0.89392596
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