[1. R. Fisher, The wave of advance of advantageous genes, Ann Hum Genet, vol. 7, pp. 355{369, 1937.10.1111/j.1469-1809.1937.tb02153.x]Search in Google Scholar
[2. A. D. Bazykin, Hypothetical mechanism of speciation, Evolution, vol. 23, pp. 685{687, 1969.10.1111/j.1558-5646.1969.tb03550.x28562864]Search in Google Scholar
[3. B. Bradshaw-Hajek, Reaction-di usion equations for population genetics. PhD thesis, School of Math- ematics and Applied Statistics, University of Wollongong, 2004.]Search in Google Scholar
[4. J. G. Skellam, Random dispersal in theoretical populations, Biometrika, vol. 38, pp. 196{218, 1951.10.1093/biomet/38.1-2.196]Search in Google Scholar
[5. A. M. Turing, The chemical basis of morphogenesis, Phil. Trans. R. Soc. Lond., pp. 37{72, 1952.10.1098/rstb.1952.0012]Search in Google Scholar
[6. A. Gierer and H. Meinhardt, A theory of biological pattern formation, kybernetik, vol. 12, pp. 30{39, 1972.10.1007/BF002892344663624]Search in Google Scholar
[7. J. D. Murray, Mathematical Biology: I. An Introduction. Springer, 1989.10.1007/978-3-662-08539-4]Search in Google Scholar
[8. J. D. Murray, Mathematical Biology: II. Spatial Models and Biomedical Applications. Springer, 2003.10.1007/b98869]Search in Google Scholar
[9. J. J. Tyson and P. C. Fife, Target patterns in a realistic model of the belousov-zhabotinskii reaction, J. Chem. Phys., vol. 73, pp. 2224{2237, 1980.]Search in Google Scholar
[10. J. Sneyd, A. C. Charles, and M. J. Sanderson, A model for the propagation of intracellular calcium waves, Am. J. Physiol., vol. 266, pp. 293{302, 1994.10.1152/ajpcell.1994.266.1.C2938304425]Search in Google Scholar
[11. J. Sneyd, B. T. R. Wetton, A. C. Charles, and M. J. Sanderson, Intracellular calcium waves mediated by diffusion of inositol triphosphate; a two dimensional model, Am. J. Physiol., vol. 268, pp. 1537-1545, 1995.]Search in Google Scholar
[12. S. Means, A. J. Smith, J. Shepherd, J. Shadid, J. Fowler, R. J. H. Wojcikiewicz, T. Mazel, G. D. Smith, and B. S. Wilson, Reaction-diffusion modelling of calcium dynamics with realistic er geometry, Biophysical Journal, vol. 91, pp. 537{557, 2006.10.1529/biophysj.105.075036148311516617072]Search in Google Scholar
[13. X.-S. Yang, Computational modelling of nonlinear calcium waves, Appl. Math. Model., vol. 30, pp. 200{208, 2006.10.1016/j.apm.2005.03.013]Search in Google Scholar
[14. M. A. Colman, C. Pinali, A. W. Trafford, H. Zhang, and A. Kitmitto, A computational model of spatio- temporal cardiac intracellular calcium handling with realistic structure and spatial flux distribution from sarcoplasmic reticulum and t-tubule reconstructions, PLOS Comput. Biol., vol. 13, 2017.10.1371/journal.pcbi.1005714]Search in Google Scholar
[15. E. Meron, Pattern formation in excitable media, Physics Reports, vol. 218, no. 1, pp. 1 { 66, 1992.10.1016/0370-1573(92)90098-K]Search in Google Scholar
[16. J. M. Hyman, The method of lines solution of partial differential equations, Tech. Rep. C00-3077-139, New York University, October 1976.10.2172/7311903]Search in Google Scholar
[17. L. Brugnano, F. Mazzia, and D. Trigiante, Fifty years of stiffness, in Recent Advances in Computational and Applied Mathematics (T. E. Simos, ed.), ch. 1, pp. 1{21, Springer Netherlands, 2011.10.1007/978-90-481-9981-5_1]Search in Google Scholar
[18. K. Radhakrishnan, Comparison of numerical techniques for integration of stiff ordinary differential equations arising in combustion chemistry, Tech. Rep. NASA-TP-2372, NASA, October 1984.]Search in Google Scholar
[19. J. Crank and P. Nicolson, A practical method for numerical evaluation of solutions of partial differential equations of the heat-conduction type, Adv. Comput. Math., vol. 6, pp. 207{226, 1996.10.1007/BF02127704]Search in Google Scholar
[20. R. Glowinski, Finite element methods for incompressible viscous ow, Handbook of Numerical Anal- ysis, vol. 9, pp. 3{1176, 2003.10.1016/S1570-8659(03)09003-3]Search in Google Scholar
[21. A. Madzvamuse and A. H. Chung, Fully implicit time-stepping schemes and non-linear solvers for systems of reaction diffusion equations, Appl. Math. Comput., vol. 244, pp. 361{374, 2014.10.1016/j.amc.2014.07.004]Search in Google Scholar
[22. A.-K. Kassam and L. N. Trefethen, Fourth-order time-stepping for stiff pdes, SIAM J. Sci. Comput., vol. 26, no. 4, pp. 1214{1233, 2005.]Search in Google Scholar
[23. U. M. Ascher, S. J. Ruuth, and B. T. R. Wetton, Implicit-explicit methods for time-dependent partial differential equations, SIAM J. Numer. Anal., vol. 32, no. 3, pp. 797{823, 1995.10.1137/0732037]Search in Google Scholar
[24. H.Wang, C.-W. Shu, and Q. Zhang, Stability and error estimates of local discontinuous galerkin meth- ods with implicit-explicit time-marching for advection-diffusion problems, SIAM J. Numer. Anal., vol. 53, pp. 206{227, 2015.10.1137/140956750]Search in Google Scholar
[25. A. Madzvamuse, Time-stepping schemes for moving grid finite elements applied to reaction-diffusion systems on fixed and growing domains, J. Comput. Phys., vol. 214, pp. 239-263, 2006.10.1016/j.jcp.2005.09.012]Search in Google Scholar
[26. Q. Nie, Y.-T. Wan, Frederic Y. M.and Zhang, and X.-F. Liu, Compact integration factor methods in high spatial dimensions, J. Comput. Phys., vol. 227, pp. 5238{5255, 2008.]Search in Google Scholar
[27. Q. Nie, Y.-T. Zhang, and Z. Rui, Efficient semi-implicit schemes for stiff systems, J. Comput. Phys., vol. 214, pp. 521{537, 2006.10.1016/j.jcp.2005.09.030]Search in Google Scholar
[28. J. W. Thomas, Numerical Partial Differential Equations: Finite Difference Methods. Springer, 1995.10.1007/978-1-4899-7278-1]Search in Google Scholar
[29. D. Ho, Stability and convergence of finite difference methods for systems of nonlinear reaction- diffusion equations, SIAM J. Numer. Anal., vol. 15, no. 6, pp. 1161{1177, 1978.]Search in Google Scholar
[30. A. Araújo, S. Barbeiro, and P. Serranho, Stability of finite difference schemes for complex diffusion processes, SIAM J. Numer. Anal., vol. 50, no. 3, pp. 1284-1296, 2012.]Search in Google Scholar
[31. A. Araújo, S. Barbeiro, and P. Serranho, Stability of finite difference schemes for nonlinear complex reaction-diffusion processes, IMA J. Numer. Anal., vol. 35, pp. 1381-1401, 2015.]Search in Google Scholar
[32. N. Li, J. Steiner, and S. Tang, Convergence and stability analysis of an explicit finite difference method for 2-dimensional reaction-diffusion equations, J. Austral. Math. Soc., vol. 36, pp. 234{241, 1994.10.1017/S0334270000010377]Search in Google Scholar
[33. C. Hirsch, Numerical Computation of Internal and External Flows: Fundamentals of Numerical Discretization. John Wiley & Sons, 1988.]Search in Google Scholar
[34. R. A. Horn and C. R. Johnson, Matrix Analysis. Cambridge, 2013.]Search in Google Scholar
[35. R. D. Richtmyer and K. W. Morton, Difference Methods for Initial-Value Problems. John Wiley & Sons, 1967.]Search in Google Scholar
[36. D. Serre, Matrices; Theory and Applications. Springer, 2010.10.1007/978-1-4419-7683-3_3]Search in Google Scholar
[37. A. J. Laub, Matrix Analysis for Scientists and Engineers. SIAM, 2005.]Search in Google Scholar
[38. B. Dasgupta, Applied Mathematical Methods. Dorling Kindersley (India) Pvt. Ltd., 2006.]Search in Google Scholar
[39. D. Siegel, Chemical reaction networks as compartmental systems, Presented at the 21st International Symposium on Mathematical Theory of Networks and Systems, July 7-11, 2014. Groningen, The Netherlands.]Search in Google Scholar
[40. G. Giorgi and C. Zuccotti, An overview on d-stable matrices. Universita Di Pavia, DEM Working Paper Series, Feb. 2015.]Search in Google Scholar
[41. G. Nicolis and I. Prigogine, Self-organization in nonequilibrium systems : from dissipative structures to order through fluctuations / g. nicolis, i. prigogine, 01 1977.]Search in Google Scholar
[42. I. Prigogine and R. Lefever, Symmetry breaking instabilities in dissipative systems. ii, The Journal of Chemical Physics, vol. 48, no. 4, pp. 1695{1700, 1968.]Search in Google Scholar
[43. M. Marek and I. Schreiber, Chaotic behaviour of deterministic dissipative systems. Cambridge University Press, 1991.10.1017/CBO9780511608162]Search in Google Scholar
