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.
C. Truesdell and R. Toupin, “The classical field theories,” in Handbuch der Physik, S. Flügge, Ed., vol. 3, Springer, Berlin, Germany, 1960.
View at: Google Scholar | MathSciNetP. D. Kelly, “A reacting continuum,” International Journal of Engineering Science, vol. 2, no. 2, pp. 129–153, 1964.
View at: Publisher Site | Google Scholar | Zentralblatt MATH | MathSciNetA. C. Eringen and J. D. Ingram, “A continuum theory of chemically reacting media—I,” International Journal of Engineering Science, vol. 3, no. 2, pp. 197–212, 1965.
View at: Publisher Site | Google ScholarJ. D. Ingram and A. C. Eringen, “A continuum theory of chemically reacting media—II, constitutive equations of reacting fluid mixtures,” International Journal of Engineering Science, vol. 5, no. 4, pp. 289–322, 1967.
View at: Publisher Site | Google ScholarA. E. Green and P. M. Naghdi, “A dynamical theory of interacting continua,” International Journal of Engineering Science, vol. 3, no. 2, pp. 231–241, 1965.
View at: Publisher Site | Google Scholar | MathSciNetA. E. Green and P. M. Naghdi, “A note on mixtures,” International Journal of Engineering Science, vol. 6, no. 11, pp. 631–635, 1968.
View at: Publisher Site | Google ScholarA. E. Green and N. Laws, “Global properties of mixtures,” Archive for Rational Mechanics and Analysis, vol. 43, no. 1, pp. 45–61, 1971.
View at: Publisher Site | Google Scholar | Zentralblatt MATH | MathSciNetI. Müller, “A thermodynamic theory of mixtures of fluids,” Archive for Rational Mechanics and Analysis, vol. 28, no. 1, pp. 1–39, 1968.
View at: Google Scholar | MathSciNetR. M. Bowen and J. C. Wiese, “Diffusion in mixtures of elastic materials,” International Journal of Engineering Science, vol. 7, no. 7, pp. 689–722, 1969.
View at: Publisher Site | Google ScholarR. M. Bowen, “Theory of mixtures,” in Continuum Physics, A. C. Eringen, Ed., vol. 3, pp. 1–317, Academic Press, New York, NY, USA, 1976.
View at: Google Scholar | MathSciNetR. J. Atkin and R. E. Craine, “Continuum theories of mixtures: basic theory and historical development,” The Quarterly Journal of Mechanics and Applied Mathematics, vol. 29, no. 2, pp. 209–244, 1976.
View at: Publisher Site | Google Scholar | Zentralblatt MATH | MathSciNetR. J. Atkin and R. E. Craine, “Continuum theories of mixtures: applications,” Journal of the Institute of Mathematics and Its Applications, vol. 17, no. 2, pp. 153–207, 1976.
View at: Google Scholar | MathSciNetA. Bedford and D. S. Drumheller, “Theories of immiscible and structured mixtures,” International Journal of Engineering Science, vol. 21, no. 8, pp. 863–960, 1983.
View at: Publisher Site | Google Scholar | Zentralblatt MATH | MathSciNetI. Samohýl, Thermodynamics of Irreversible Processes in Fluid Mixtures, vol. 12 of Teubner Texts in Physics, Teubner, Leipzig, Germany, 1987.
View at: Google Scholar | MathSciNetK. R. Rajagopal and L. Tao, Mechanics of mixtures, vol. 35 of Series on Advances in Mathematics for Applied Sciences, World Scientific, River Edge, NJ, USA, 1995.
View at: Google Scholar | Zentralblatt MATH | MathSciNetA. Bedford and M. Stern, “A multi—continuum theory for composite elastic materials,” Acta Mechanica, vol. 14, no. 2–3, pp. 85–102, 1972.
View at: Publisher Site | Google ScholarA. Bedford and M. Stern, “Towards a diffusing continuum theory of composite elastic materials,” Journal of Applied Mechanics, vol. 38, pp. 8–14, 1972.
View at: Google ScholarJ. J. Pop and M. Bowen, “A theory of mixtures with long—range spatial interaction,” Acta Mechanica, vol. 29, no. 1–4, pp. 21–34, 1978.
View at: Publisher Site | Google ScholarH. F. Tiersten and M. Jahanmir, “A theory of composites modeled as interpenetrating solid continua,” Archive for Rational Mechanics and Analysis, vol. 65, no. 2, pp. 153–192, 1977.
View at: Google Scholar | Zentralblatt MATH | MathSciNetD. Ieşan, “On the theory of mixtures of thermoelastic solids,” Journal of Thermal Stresses, vol. 14, no. 4, pp. 389–408, 1991.
View at: Google Scholar | MathSciNetD. Ieşan, “A theory of mixtures of nonsimple elastic solids,” International Journal of Engineering Science, vol. 30, no. 3, pp. 317–328, 1992.
View at: Google Scholar | MathSciNetS. J. Allen and K. A. Kline, “A theory of mixtures with microstructure,” Journal of Applied Mathematics and Mechanics Zeitschrift, vol. 20, pp. 145–155, 1969.
View at: Google ScholarR. J. Twiss and A. C. Eringen, “Theory of mixtures for micromorfic materials—I,” International Journal of Engineering Science, vol. 9, pp. 1019–1044, 1971.
View at: Publisher Site | Google ScholarR. J. Twiss and A. C. Eringen, “Theory of mixtures for micromorfic materials-II. Elastic constitutive equations,” International Journal of Engineering Science, vol. 10, no. 5, pp. 437–465, 1972.
View at: Publisher Site | Google ScholarN. T. Dunwoody, “Balance laws for liquid crystal mixtures,” Zeitschrift für Angewandte Mathematik und Physik, vol. 26, pp. 105–111, 1975.
View at: Google Scholar | Zentralblatt MATH | MathSciNetD. A. Drew and S. L. Passman, “Theory of multicomponent fluids,” in Applied Mathematical Sciences, J. E. Marsden and L. Sirovich, Eds., vol. 135, Springer Verlag, NY, USA, 1999.
View at: Google ScholarA. C. Eringen, “Micropolar mixture theory of porous media,” Journal of Applied Physics, vol. 94, no. 6, pp. 4184–4186, 2003.
View at: Publisher Site | Google ScholarA. C. Eringen, “A mixture theory for geophysical fluids,” Nonlinear Processes in Peophysics, vol. 11, pp. 75–82, 2004.
View at: Google ScholarD. Ieşan, “On the theory of mixtures of elastic solids,” Journal of Elasticity. The Physical and Mathematical Science of Solids, vol. 35, no. 1–3, pp. 251–268, 1994.
View at: Google Scholar | MathSciNetD. Ieşan, “On the theory of viscoelastic mixtures,” Journal of Thermal Stresses, vol. 27, no. 12, pp. 1125–1148, 2004.
View at: Google Scholar | MathSciNetD. Ieşan, “On the nonlinear theory of interacting micromorphic materials,” International Journal of Engineering Science, vol. 42, no. 19–20, pp. 2135–2145, 2004.
View at: Google Scholar | MathSciNetC. B. Kafadar and A. C. Eringen, “Micropolar media—I. The classical theory,” International Journal of Engineering Science, vol. 9, no. 3, pp. 271–305, 1971.
View at: Publisher Site | Google ScholarA. C. Eringen and C. F. Kafadar, “Polar field theories,” in Continuum Physics, A. C. Eringen, Ed., vol. 4, pp. 1–317, Academic Press, New York, NY, USA, 1976.
View at: Google ScholarA. C. Eringen, “Microcontinuum Field Theories I. Foundations and Solids,” Springer, New York, NY, USA, 1999.
View at: Google Scholar | Zentralblatt MATH | MathSciNetA. E. Green and P. M. Naghdi, “On basic equations for mixtures,” The Quarterly Journal of Mechanics and Applied Mathematics, vol. 22, no. 4, pp. 427–438, 1969.
View at: Publisher Site | Google Scholar | Zentralblatt MATH