References
- R. Anguelov and J.M.-S. Lubuma, Contributions to the mathematics of the nonstandard finite difference method and applications, Numer. Methods Partial Differ. Equ. 17 (2001), pp. 518–543.
- R. Anguelov, J.M.-S. Lubuma, and M. Shillor, Dynamically consistent nonstandard finite difference schemes for continuous dynamical systems, in: X. Hou, X. Lu, A. Miranville, J. Su, J. Zhu (Eds.), Dynamical Systems and Differential Equations (Proceedings of the 7th AIMS Conference on Dynamical Systems and Differential Equations, 18–21 May 2008, University of Texas at Arlington, TX, USA), in: American Institute of Mathematical Sciences Conference Series, 2009, pp. 34–43.
- R. Anguelov, J.M.-S. Lubuma, and M. Shillor, Topological dynamic consistency of nonstandard finite difference schemes for dynamical systems, J. Differ. Equ. Appl. 17 (2011), pp. 1769–1791.
- N. Bosch, H. Philipp, and T. Filip, Probabilistic Exponential Integrators, arXiv preprint, arXiv:2305.14978, 2023.
- M.A. Castro, A. Sirvent, and F. Rodríguez, Nonstandard finite difference schemes for general linear delay differential systems, Math. Methods. Appl. Sci. 44 (2021), pp. 3985–3999.
- M.A. Castro, C.J. Mayorga, A. Sirvent, and F. Rodríguez, Exact numerical solutions and high order nonstandard difference schemes for a second order delay differential equation, Math. Methods. Appl. Sci. 46(17) (2023), pp. 17962–17979.
- J.L. Cieśliński, On the exact discretization of the classical harmonic oscillator equation, J. Differ. Equ. Appl. 17 (2011), pp. 1673–1694.
- J.L. Cieśliński, Locally exact modifications of numerical schemes, Comput. Math. with Appl.65 (2013), pp. 1920–1938.
- J.L. Cieśliński and B. Ratkiewicz, Improving the accuracy of the discrete gradient method in the one-dimensional case, Phys. Rev. E. 81 (2010), pp. 016704:1–6.
- J.L. Cieśliński and B. Ratkiewicz, Energy-preserving numerical schemes of high accuracy for one-dimensional Hamiltonian systems, J. Phys. A Math. Theor. 44 (2011), pp. 155206:1–14.
- Y. Dumont and J.M.-S. Lubuma, Non-standard finite difference schemes for multi-dimensional second-order systems in non-smooth mechanics, Math. Methods Appl. Sci. 30 (2007), pp. 789–825.
- M.A. García, M.A. Castro, J.A. Martín, and F. Rodríguez, Exact and nonstandard finite difference schemes for coupled linear delay differential systems, Mathematics 7 (2019), pp. 1038.
- G.B. Gustafson and C.H. Wilcox, Analytical and Computational Methods of Advanced Engineering Mathematics, Springer-Verlag, Berlin, 1998.
- M. Hochbruck and C. Lubich, A Gautschi-type method for oscillatory second-order differential equations, Numer. Math. 83 (1999), pp. 403–426.
- M. Hochbruck and A. Ostermann, Exponential integrators, Acta Numer. 19 (2010), pp. 209–286.
- H. Hu, Exact solution of a quadratic nonlinear oscillator, J. Sound Vib. 295 (2006), pp. 450–457.
- S. Ö. Korkut and U. Erdoǧan, Positivity preserving scheme based on exponential integrators, Appl. Math. Comput. 320 (2018), pp. 731–739.
- J.M.-S. Lubuma and K.C. Patidar, Contributions to the theory of non-standard finite difference methods and applications to singular perturbation problems, in: R.E. Mickens (Ed.), Applications of Nonstandard Finite Difference Schemes, World Scientific (2005), pp. 513–560.
- M.A. Medvedeva, T.E. Simos, and C. Tsitouras, Exponential integrators for linear inhomogeneous problems, Math. Methods Appl. Sci. 44 (2021), pp. 937–944.
- R.E. Mickens, Nonstandard Finite Difference Models of Differential Equations, World Scientific, Singapore, 1994.
- R.E. Mickens, Nonstandard finite difference schemes, in: Applications of Nonstandard Finite Difference Schemes, R. E. Mickens, eds., World Scientific, Singapore, 2000, pp. 1–54.
- R.E. Mickens, Discrete models of differential equations: the roles of dynamic consistency and positivity, in: L.J.S. Allen, B. Aulbach, S. Elaydi, R. Sacker (Eds.), Difference Equations and Discrete Dynamical Systems (Proceedings of the 9th International Conference, Los Angeles, USA, 2–7 August 2004), World Scientific, Singapore (2005), pp. 51–70.
- R.E. Mickens, K. Oyedeji, and S. Rucker, Exact finite difference scheme for second-order, linear ODEs having constant coefficients, J. Sound Vib. 287 (2005), pp. 1052–1056.
- R.E. Mickens and I. Ramadhani, Finite-difference schemes having correct linear stability properties for all step-sizes III, Comput. Math. Appl. 27 (1994), pp. 77–84.
- C. Moler and C. Van Loan, Nineteen dubious ways to compute the exponential of a matrix, twenty-five years later, SIAM Rev. 45 (2003), pp. 3–49.
- K.C. Patidar, Nonstandard finite difference methods: recent trends and further developments, J. Differ. Equ. Appl. 22 (2016), pp. 817–849.
- R.B. Potts, Best difference equation approximation to Duffing's equation, ANZIAM J. 23 (1982), pp. 349–356.
- R.B. Potts, Differential and difference equations, Am. Math. Mon. 89 (1982), pp. 402–407.
- D. Quang A and H. Manh Tuan, Exact finite difference schemes for three-dimensional linear systems with constant coefficient, Vietnam J. Math. 46 (2018), pp. 471–492.
- L.-I.W. Roeger, Exact finite-difference schemes for two-dimensional linear systems with constant coefficients, J. Comput. Appl. Math. 219 (2008), pp. 102–109.
- L.-I.W. Roeger and R.E. Mickens, Exact finite difference scheme for linear differential equation with constant coefficients, J. Differ. Equ. Appl. 19 (2013), pp. 1663–1670.
- X. Shen and L. Melvin, Geometric exponential integrators, J. Comput. Phys. 382 (2019), pp. 27–42.
- M.E. Songolo and B. Bidégaray-Fesquet, Nonstandard finite-difference schemes for the two-level Bloch model, Int. J. Model. Simul. Sci. Comput. 09 (2018), pp. 1850033:1–23.
- M.E. Songolo and B. Bidégaray-Fesquet, Strang splitting schemes for N-level Bloch models, Int. J. Model. Simul. Sci. Comput. 14 (2023), pp. 2350044:1–18.