10.22190/FUME190401029F

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In this paper foundations are laid for a future solution of a fully coupled flow problem for the micropolar medium undergoing structural change in a funnel-shaped crusher. Initially the fundamental equations of micropolar media are revisited and the problem of structural changes of micropolar media moving in a crusher is explained. Then a review of the current state-of-the-art is presented and a necessary extension of the problem is motivated. The need for using numerical methods of fluid mechanics is emphasized. As a prerequisite for the study of the fully coupled initial boundary value 2D-flow problem of a micropolar fluid the funnel flow of a Navier-Stokes fluid is investigated based on an implicit finite difference scheme using the Thomas algorithm. Numerical results for velocities, stresses, and for the pressure dependence of the funnel flow are presented. The correctness of the algorithm is checked by specializing to the case of a flow through a tunnel of constant cross-section under the influence of gravity, for which an analytical solution is available.

Micropolar media, Structural change, Microinertia, Viscous medium

Eremeyev, V.A., Lebedev, L.P., Altenbach, H., 2012, Foundations of micropolar mechanics, Springer Science & Business Media, Heidelberg, New York, Dordrecht, London.

Eringen, A.C., Kafadar, C.B., 1976, Polar field theories, In: Continuum physics IV, Academic Press, London.

Ivanova, E.A., Vilchevskaya, E.N., 2016, Micropolar continuum in spatial description, Continuum Mechanics and Thermodynamics, 28(6), pp. 1759-1780.

Bain, O., Billingham, J., Houston, P., Lowndes, I., 2015, Flows of granular material in two-dimensional channels, Journal of Engineering Mathematics, 98(1), pp. 49-70.

Fomicheva, M., Vilchevskaya, E.N., Müller, W., Bessonov, N., 2019, Milling matter in a crusher: Modeling based on extended micropolar theory, Continuum Mechanics and Thermodynamics (in print).

Glane, S., Rickert, W., Müller, W.H., Vilchevskaya, E., 2017, Micropolar media with structural transformations: Numerical treatment of a particle crusher, Proceedings of XLV International Summer School — Conference APM 2017, pp. 197-211.

Müller, W.H., Vilchevskaya, E.N., Weiss, W., 2017, A meso-mechanics approach to micropolar theory: A farewell to material description, Physical Mesomechanics, 20(3), pp. 13-24.

Ivanova, E., Vilchevskaya, E., Müller, W.H., 2016, Time derivatives in material and spatial description – What are the differences and why do they concern us?, in K. Naumenko, M. Aßmus (Eds.), Advanced Methods of Mechanics for Materials and Structures, pp. 3-28, Springer.

Eringen, A., 1997, A unified continuum theory of electrodynamics of liquid crystals, International Journal of Engineering Science, 35(12-13), pp. 1137–1157.

Truesdell, C., Toupin, R.A., 1960, The classical field theories, Springer, Heidelberg.

Mindlin, R., 1964, Micro-structure in linear elasticity, Archive of Rational Mechanics and Analysis, 16(1), pp. 51-78.

Eringen, A., 1976, Continuum Physics, Vol. IV, Academic Press, New York.

Eringen, A., 1999, Microcontinuum Field Theory I, Foundations and Solids, Springer, New York.

Oevel, W., Schröter, J., 1981, Balance equation for micromorphic materials, Journal of Statistical Physics, 25(4), pp. 645–662.

Chen, K., 2007, Microcontinuum balance equations revisited: The mesoscopic approach, Journal of Non-Equilibrium Thermodynamics, 32(4), pp. 435-458.

Dłuzewski, P.H., 1993, Finite deformations of polar elastic media, International journal of solids and structures, 30(16), pp. 2277-2285.

Müller, W.H., Vilchevskaya, E.N., 2018, Micropolar theory with production of rotational inertia: A rational mechanics approach, Generalized Models and Non-classical Approaches in Complex Materials, 1, pp. 195-229. Springer, Cham.

Morozova, A.S., Vilchevskaya, E.N., Müller, W.H., Bessonov, N.M., 2019, Interrelation of heat propagation and angular velocity in micropolar media, Dynamical Processes in Generalized Continua and Structures, pp. 413-425. Springer, Cham.

Chorin, A.J., 1997, A numerical method for solving incompressible viscous flow problems, Journal of computational physics, 135(2), pp. 118-125.