References
- Jou, D.; Casas-Vazquez, J.; Lebon, G. Extended Irreversible Thermodynamics, 3rd ed.; Springer-Verlag: Berlin, 2001.
- Tsimpanogiannis, I.N.; Yortsos, Y.C.; Poulou, S.; Kanellopoulos, N.; Stubos, A.K. Scaling theory of drying in porous media. Physical Review E 1999, 59(4), 4353–4365.
- Farkas, I.; Mészáros, Cs.; Bálint, Á. Mathematical and physical foundations of drying theories. Drying Technology 2000, 18(3), 541–559.
- Mészáros, Cs.; Bálint, Á.; Kirschner, I.; Gottschalk, K.; Farkas, I. Mathematical modelling of drying processes using methods of the nonequilibrium thermodynamics and percolation theory. Drying Technology 2007, 25, 1297–1304.
- Mészáros, Cs.; Farkas, I.; Bálint, Á. A new application of percolation theory for coupled transport phenomena through porous media. Mathematics and Computers in Simulation 2001, 56, 395–404.
- Liu, D.; Huai, X.; Hu, X.; Jiang, F. Fundamental research on drying processes in institute of engineering thermophysics. Drying Technology 2004, 22, 145–164.
- Hu, S.T.; Li, X.Q.; Liu, G.D.; Lian, L.M.; Li, L.N. Cross-effect of heat and mass transfer of Luikov equation: Measurement and analysis. Drying Technology 1999, 17(9), 1859–1877.
- Mészáros, Cs.; Farkas, I.; Bálint, Á.; Buzás, J. Modelling of the coupled heat and mass transfer through porous media on the base of the wave approach. Drying Technology 2004, 22(1–2), 71–80.
- Mészáros, Cs.; Kirschner, I.; Bálint, Á. Relevance of the time-quasi-polynomials in the classic linear thermodynamic theory of coupled transport processes. Continuum Mechanics and Thermodynamics 2014, 26, 447–463.
- Randriamboarison, O.C. Impulsive and transient excitation of Bohm–Gross waves in a dissipative plasma. Physics of Plasmas 1997, 4, 2336–2347.
- Gyarmati, I. On the wave approach of thermodynamics and some problems of non-linear theories. Journal of Non-equilibrium Thermodynamics 1977, 2, 233–260.
- Babenkov, M.A.; Ivanova, E.A. Analysis of the wave propagation processes in heat transfer problems of the hyperbolic type. Continuum Mechanics and Thermodynamics 2014, 26, 483–502.
- Eck, Ch.; Garcke, H.; Knabner, P. Mathematische Modellierung; Springer-Verlag: Berlin, 2008.
- Fan, E. Extended tanh-function method and its applications to nonlinear equations. Physics Letters A 2000, 277, 212–218.
- Knabner, P.; Angermann, L. Numerik partieller Differentialgleichungen (Eine anwendungsorientierte Einführung); Springer-Verlag: Berlin, 2000.
- Bouchaud, J.P.; Georges, A. Anomalous diffusion in disordered media: Statistical mechanisms, models and physical applications. Physics Reports 1990, 195, 127–293.
- Klages, R.; Radon, G.; Sokolov, I.M., Eds. Anomalous Transport. Foundations and Applications; Wiley VCH: Weinheim, Germany, 2008.
- Atanacković, T.; Pilipović, S.; Stanković, B.; Zorica, D. Fractional Calculus with Applications in Mechanics: Vibrations and Diffusion Processes (ISTE); Wiley & Sons. Inc: London, 2014.
- Bálint, Á.; Farkas, I.; Gottschalk, K.; Mészáros, Cs. Novel-type solution of the convection-anomalous diffusion transport equation for porous media. In Proceedings of the 5th European Drying Symposium (Eurodrying2015), Budapest, Hungary, October 11–15, 2015; 57–63.
- Jou, D.; Casas-Vázquez, J.; Criado-Sancho, M. Thermodynamics of Fluids Under Flow, 2nd ed.; Springer-Verlag: Dordrecht, 2011.
- Landau, L.D.; Lifshitz, E.M. Fluid Mechanics, 2nd ed.; Butterworth-Heinemann: Oxford, UK, 2000.
- MAPLE 10. A Symbolic Computation System; Maplesoft: Waterloo, ON, Canada, 2005.
- Kristensson, G. Second Order Differential Equations (Special Functions and Their Classification); Springer-Verlag: New York, 2010
- Nield, D.A.; Bejan, A. Convection in Porous Media, 4th ed.; Springer-Verlag: New York, 2012.