Approximate Solution Using Elementary Functions of Mixed Problem with Boundary Conditions of the Second Kind for One-Dimensional Wave Equation

The paper considers a mixed problem with boundary conditions of the second kind for a one-dimensional wave equation. The solution to this problem is written in integral form using the Green’s function. For practical use, this solution is of little use, since, firstly, the Green’s function is a trigonometric series and, therefore, its calculation presents certain difficulties, secondly, it is necessary to calculate approximately the five integrals with the Green’s function included in the solution of the problem, and, thirdly, it is extremely difficult to estimate the error of the approximate calculation of the solution.  In this work, these difficulties are overcome, namely, simple expression for the Green’s function  is found in terms of a periodic piecewise linear function, the integrals included in the approximate solution are calculated using periodic piecewise linear, piecewise quadratic and piecewise cubic functions, and, finally,  a  simple and efficient estimate of the approximation error is obtained. The error estimate is linear in the grid steps of the problem and uniform in the spatial variable at any fixed point in time.  Thus, an approximate solution of the problem with an arbitrarily small error is effectively expressed in terms of elementary functions.   An example of solving the problem by the proposed method is given, and graphs of the exact and approximate solutions are plotted.

1. Koshlyakov N. S., Gliner E. B., Smirnov M. M. (1962) Differential Equations of Mathematical Physics. Moscow, State Publishing House of Physical and Mathematical Literature, 767 (in Russian).

2. Vladimirov V. S., Zharinov V. V. (2000) Equations of Mathematical Physics. Moscow, Fizmatlit Publ, 400 (in Russian).

3. Tikhonov A. N. Samarsky A. A. (2004) Equations of Mathematical Physics. Moscow, Nauka Publ, 798 (in Russian).

4. Myshkis A. D. (2007) Lectures on Higher Mathematics. Saint-Petersburg, Lan Publ, 688 (in Russian).

5. Ostapenko V. (2012) Telegraph Equation. Boundary Prob-lems. Saabrucken: LAP Lambert Academic Publishing, 272 (in Russian).

6. Dubnishchev Yu. N. (2011) Vibrations and Waves. Saint-Petersburg, Lan Publ, 384 (in Russian).

7. Lasy P. G., Meleshko I. N. (2017) Approximate Solution of One Problem on Electrical Oscillations in Wires with the Use of Polylogarithms. Energetika. Izvestiya Vysshikh Uchebnykh Zavedenii i Energeticheskikh Ob’edenenii SNG = Energetika. Proceedings of the CIS Higher Educational Institutions and Power Engineering Associations, 60 (4), 334–340. https://doi.org/10.21122/1029-7448-2017-60-4-334-340 (in Russian).

8. Lasy P. G., Meleshko I. N. (2019) Application of Polylogarithms to the Approximate Solution of the Inhomogeneous Telegraph Equation for the Distortionless Line. Energetika. Izvestiya Vysshikh Uchebnykh Zavedenii i Energeticheskikh Ob’edenenii SNG = Energetika. Proceedings of the CIS Higher Educational Institutions and Power Engineering Associations, 62 (5), 413–421. https://doi. org/10.21122/1029-7448-2019-62-5-413-421 (in Russian).

9. Lasy P. G., Meleshko I. N. (2021) Approximate Solution of Mixed Problem for Telegrapher Equation with Homogeneous Boundary Conditions of First Kind Using Special Functions. Energetika. Izvestiya Vysshikh Uchebnykh Zavedenii i Energeticheskikh Ob’edenenii SNG = Energetika. Proceedings of the CIS Higher Educational Institutions and Power Engineering Associations, 64 (2), 152–163. https://doi.org/10.21122/1029-7448-2021-64-2-152-163 (in Russian).

10. Polyanin A. D. (2001) Handbook of Linear Equations of Mathematical Physics. Moscow, Fizmatlit Publ, 576 (in Russian).