A Mixture Theory for Micropolar Thermoelastic Solids | Zendy

Cătălin Galeş | Zendy

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A Mixture Theory for Micropolar Thermoelastic Solids

Author(s) -

Cătălin Galeş

Publication year - 2007

Publication title -

mathematical problems in engineering

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.262

H-Index - 62

eISSN - 1026-7077

pISSN - 1024-123X

DOI - 10.1155/2007/90672

Subject(s) - thermoelastic damping , uniqueness , nonlinear system , mathematics , boundary value problem , mixture theory , mathematical analysis , kinematics , classical mechanics , thermodynamics , physics , thermal , statistics , quantum mechanics , mixture model

We derive a nonlinear theory of heat-conducting micropolar mixtures in Lagrangian description. The kinematics, balance laws, and constitutive equations are examined and utilized to develop a nonlinear theory for binary mixtures of micropolar thermoelastic solids. The initial boundary value problem is formulated. Then, the theory is linearized and a uniqueness result is established

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