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On uniqueness and time regularity of flows of power-law like non-Newtonian fluids

✍ Scribed by Miroslav Bulíček,; Frank Ettwein; Petr Kaplický; Dalibor Pražák

Publisher
John Wiley and Sons
Year
2010
Tongue
English
Weight
272 KB
Volume
33
Category
Article
ISSN
0170-4214

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✦ Synopsis

Communicated by M. Renardy

Large class of non-Newtonian fluids can be characterized by index p, which gives the growth of the constitutively determined part of the Cauchy stress tensor. In this paper, the uniqueness and the time regularity of flows of these fluids in an open bounded three-dimensional domain is established for subcritical ps, i.e. for p>11 / 5. Our method works for 'all' physically relevant boundary conditions, the Cauchy stress need not be potential and it may depend explicitly on spatial and time variable. As a simple consequence of time regularity, pressure can be introduced as an integrable function even for Dirichlet boundary conditions.

Moreover, these results allow us to define a dynamical system corresponding to the problem and to establish the existence of an exponential attractor.

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