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Asymptotic partition of energy in micropolar mixture theory of porous media

Domenii publicaţii > Matematica + Tipuri publicaţii > Articol în revistã ştiinţificã

Autori: I.D. Ghiba

Editorial: Meccanica, 43, p.639-649, 2008.


The aim of this paper is to study the asymptotic partition of the energy associated with the solution of the initial-boundary value problem who describes the behavior of binary homogeneous micropolar mixtures of an isotropic micropolar elastic solid with an incompressible micropolar viscous fluid. Some Lagrange-Brun identities are established. Using the Cesáro means of various parts of total energy, the relations that describe the asymptotic behavior of mean energies are established.

Cuvinte cheie: Micropolar mixture, Micropolar elastic solid, Incompressible micropolar viscous fluid, Asymptotic partition of energy, Mechanics of solids and structures