Using IIR filters to build high-order finite difference schemes for the unsteady Schrödinger equation

High-order finite difference schemes for the time-dependent Schrödinger equation are investigated. Digital signal processing methods allowed proving the conservativeness of high-order finite difference schemes for the unsteady Schrödinger equation. The eighth-order scheme coefficients were found with the help of the proved theoretical results. The conditions for equivalence between the eighth-order finite difference scheme and the scheme in the form of a cascade of allpass first-order filters were found. The numerical analysis of the proposed scheme was made. It was shown that the high-order finite difference schemes gave better results on solving the linear Schrödinger equations comparing to the well-known fourthorder scheme on the six-point stencil, however, the high-order schemes in couple with the second-order splitting algorithm to the nonlinear Schrödinger equation do not lead to a radical improvement in the quality of numerical results. Practical issues implementing the proposed numerical technique are considered. The obtained results can be used to construct efficient solvers for linear and nonlinear Schrödinger-type equations by applying the splitting schemes of adequate accuracy order.

finite-difference schemes, eighth order, Schrödinger equation, IIR filter, all-pass filter

1. Samarskii A. A. The theory of Finite Difference schemes. Moscow, Nauka Publ., 1989. 616 p. (in Russian).

2. Han F., Dai W. New higher-order compact finite difference schemes for 1D heat conduction equations. Applied Mathematical Modelling, 2013, vol. 37, no. 16-17, pp. 7940–7952. https://doi.org/10.1016/j.apm.2013.03.026

3. Gordin V. A., Tsymbalov E. A. Compact differential schemes for the diffusion and Schrödinger equations. Approximation, stability, convergence, effectiveness, monotony. Journal of Computational Mathematics, 2014, vol. 32, no. 3, pp. 348 370. https://doi.org/10.4208/jcm.1403-cr14

4. Volkov V. M., Hureuski A. N. Spectpal-like resolution of finite-difference schemes for the heat conduction equation. VestsіNatsyianal’naiakademііnavuk Belarusі. Seryia fіzіka-matematychnykhnavuk = Proceedings of the National Academy of Sciences of Belarus. Physics and Mathematics series, 2017, no. 3, pp. 7–14 (in Russian).

5. . Volkov V. M., Gurevskii A. N., Zhukova I. V. Optimization of compact finite difference schemes with spectral-like resolutionа for the non-stationary Schrodinger equation on the base of digital signal processing methods. Vestnik BGU. Seriya 1. Fizika. Matematika. Informatika = Vestnik BSU. Series 1: Physics. Mathematics. Informatics, 2015, no. 3, pp. 84–89 (in Russian).

6. Carena A., Curri V., Gaudino R., Poggiolini P., Benedetto S. A time-domain optical transmission system simulation package accounting for nonlinear and polarization-related effects in fiber. IEEE Journal on Selected Areas in Communications, 1997, vol. 15, no. 4, pp. 751–765. https://doi.org/10.1109/49.585785

7. Sergienko A. G. Digital signal processing. Saint Petersburg, BHV-Petersburg Publ., 2011. 768 p. (in Russian).

8. Askar S. S., Karawia A. A. On Solving Pentadiagonal Linear Systems via Transformations. Mathematical Problems in Engineering, 2015, vol. 2015, pp. 1–9. https://doi.org/10.1155/2015/232456

9. Akhmanov S. A., Vysloukh V. A., Chirkin A. S. Optics of Femtosecond Laser Pulses. Moscow, Nauka Publ., 1988. 312 p. (in Russian).

10. Agrawal G. Nonlinear Fiber Optics. 3rd ed. Academic Press, 2001. 481 p.

11. Sinkin O. V, Holzlohner R., Zweck J., Menyuk C. R. Optimization of the split-step Fourier method in modeling optical-fiber communications systems. Journal of Lightwave Technology, 2003, vol. 21, no. 1, pp. 61 68. https://doi.org/10.1109/JLT.2003.808628

12. Volkov V. M., Gurevskii A. N. Optimization of compact finite difference schemes with spectral-like resolutions in the split-step method for the nonlinear Schrödinger equation. Vestsі BDPU. Seryya 3, Fіzіka. Matematyka. Іnfarmatyka. Bіyalogіya. Geagrafіya [Bulletin of BSPU. Series 3, Physics. Mathematics. Informatics. Biology. Geography], 2016, no. 4, pp. 11–17 (in Russian).

13. Lele S. K. Compact finite difference schemes with spectral-like resolution. Journal of Computational Physics, 1992, vol. 103, no. 1, pp. 16–42. https://doi.org/10.1016/0021-9991(92)90324-r

14. Hureuski A. N. Optimizing the spectral characteristics of the finite-difference schemes for the unsteady Schrödinger equation. Vestsі Natsyianal’nai akademіі navuk Belarusі. Seryia fіzіka-matematychnykh navuk = Proceedings of the National Academy of Sciences of Belarus. Physics and Mathematics series, 2019, vol. 55, no. 1, pp. 62–68 (in Russian). https://doi.org/10.29235/1561-2430-2019-55-1-62-68