References
- M. Valorani and S. Paolucci, The G-Scheme: A framework for multi-scale adaptive model reduction, J. Comput. Phys. 228 (2009), pp. 4665–4701.
- M. Valorani and S. Paolucci, Entropy production and the G-Scheme, in Proceedings of the 12th Joint European Thermodynamics Conference, 1–5 July2013, Brescia, Italy. Available at http://jetc2013.ing.unibs.it/Proceedings/Panel-J-Valorani-JETC2013-p7.pdf.
- S.H. Lam and D.A. Goussis, The CSP method for simplifying kinetics, Int. J. Chem. Kinetics 26 (1994), pp. 461–486.
- A. Tikhonov, Systems of differential equations containing a small parameter multiplying the derivative, Mat. Sb. 31 (1952), pp. 575–586.
- N. Fenichel, Geometric singular perturbation theory for ordinary differential equations, J. Diff. Eqns 31 (1979), pp. 53–98.
- M. Valorani, S. Paolucci, E. Martelli, T. Grenga, and P. Ciottoli, Dynamical system analysis of ignition phenomena using the tangential stretching rate concept, Combust. Flame 162 (2015), pp. 2963–2990.
- G.P. Smith, D.M. Golden, M. Frenklach, N.W. Moriarty, B. Eiteneer, M. Goldenberg, C.T. Bowman, R.K. Hanson, S. Song, W.C. Gardiner, Jr., V.V. Lissianski, and Z. Qin, GRI—Mech 3.0 (1999). Available at http://www.me.berkeley.edu/gri_mech/
- S.D. Cohen and A.C. Hindmarsh, CVODE, a stiff/nonstiff ODE solver in C, Comput. Phys. 10 (1996), pp. 138–143. Available at http://dx.doi.org/10.1063/1.4822377.
- M. Kooshkbaghi, C.E. Frouzakis, K. Boulouchos, and I.V. Karlin, Entropy production analysis for mechanism reduction, Combust. Flame 161 (2014), pp. 1507–1515.
- M. Valorani, F. Creta, D. Goussis, J. Lee, and H. Najm, An automatic procedure for the simplification of chemical kinetic mechanisms based on CSP, Combust. Flame 146 (2006), pp. 29–51.
- A.S. Eddington, The Nature of the Physical World, Macmillan, New York, 1928. Available at https://archive.org/stream/natureofphysical00eddi/natureofphysical00eddi_djvu.txt.
- J.L. Lebowitz, Boltzmann's entropy and time's arrow, Phys. Today 46 (1993), pp. 32–38.