For citation:
Ivanov D. Y. Semi-analytical approximation of the normal derivative of the heat simple layer potential near the boundary of a two-dimensional domain. Izvestiya of Saratov University. Mathematics. Mechanics. Informatics, 2024, vol. 24, iss. 4, pp. 476-487. DOI: 10.18500/1816-9791-2024-24-4-476-487, EDN: GMVNDF
This is an open access article distributed under the terms of Creative Commons Attribution 4.0 International License (CC-BY 4.0).
Published online:
25.11.2024
Full text:
(downloads: 56)
Language:
Russian
Heading:
Article type:
Article
UDC:
519.644.5
EDN:
GMVNDF
Semi-analytical approximation of the normal derivative of the heat simple layer potential near the boundary of a two-dimensional domain
Autors:
Ivanov Dmitrii Yurievich, Russian University of Transport
Abstract:
A semi-analytical approximation of the normal derivative of the simple layer heat potential near the boundary of a two-dimensional domain with $C^{5} $ smoothness is proposed. The calculation of the integrals that arise after piecewise quadratic interpolation of the density function with respect to the variable of arc length $s$, is carried out using analytical integration over the variable $\rho =\sqrt{r^{2} -d^{2} } $, where $r$ and $d$ are the distances from the observation point to the integration point and to the boundary of the domain, respectively. To do this, the integrand is represented as the sum of two products, each of which consists of two factors, namely: a function smooth in а near-boundary domain containing the Jacobian of the transition from the integration variable $s$ to the variable $\rho $, and a weight function containing a singularity at $r=0$ and uniformly absolutely integrable in the near-boundary region. Smooth functions are approximated with the help of the piecewise quadratic interpolation over the variable $\rho $, and then analytical integration becomes possible. Analytical integration over $\rho $ is carried out on a section of the boundary fixed in width, containing the projection of the observation point, and on the rest of the boundary, the integrals over $s$ are calculated using the Gauss formulas. Integration over the parameter of $C_{0} $-semigroup formed by time shift operators is also carried out analytically. To do this, the $C_{0} $-semigroup is approximated using the piecewise quadratic interpolation over its parameter. It is proved that the proposed approximations have stable cubic convergence in the Banach space of continuous functions with the uniform norm, and such convergence is uniform in the closed near-boundary region. The results of computational experiments on finding of the normal derivative of solutions of the second initial-boundary problem of heat conduction in a unit circle with a zero initial condition are presented, confirming the uniform cubic convergence of the proposed approximations of the normal derivative of the simple layer heat potential.
Key words:
References:
- Brebbia C. A., Telles J. C. F., Wrobel L. C. Boundary element techniques: Theory and applications in engineering. Berlin, Springer-Verlag, 1984. 464 p. https://doi.org/10.1007/978-3-642-48860-3 (Russ. ed.: Moscow, Mir, 1987. 524 p.).
- Smirnov V. I. Kurs vysshey matematiki [A course of higher mathematics]. Vol. 4, pt. 2. Moscow, Nauka, 1981. 550 p. (in Russian).
- Zhang Y.-M., Gu Y., Chen J.-T. Stress analysis for multilayered coating systems using semianalytical BEM with geometric non-linearities. Computational Mechanics, 2011, vol. 47, iss. 5, pp. 493–504. https://doi.org/10.1007/s00466-010-0559-0
- Gu Y., Chen W., Zhang B., Qu W. Two general algorithms for nearly singular integrals in two dimensional anisotropic boundary element method. Computational Mechanics, 2014, vol. 53, iss. 6, pp. 1223–1234. https://doi.org/10.1007/s00466-013-0965-1
- Niu Z., Cheng C., Zhou H., Hu Z. Analytic formulations for calculating nearly singular integrals in two-dimensional BEM. Engineering Analysis with Boundary Elements, 2007, vol. 31, iss. 12, pp. 949–964. https://doi.org/10.1016/j.enganabound.2007.05.001
- Niu Z., Hu Z., Cheng C., Zhou H. A novel semi-analytical algorithm of nearly singular integrals on higher order elements in two dimensional BEM. Engineering Analysis with Boundary Elements, 2015, vol. 61, pp. 42–51. https://doi.org/10.1016/j.enganabound.2015.06.007
- Ivanov D. Yu. A refinement of the boundary element collocation method near the boundary of a two-dimensional domain using semianalytic approximation of the double layer heat potential. Tomsk State University Journal of Mathematics and Mechanics, 2020, iss. 65, pp. 30–52 (in Russian). https://doi.org/10.17223/19988621/65/3
- Dunford N., Schwartz J. T. Linear operators. Part 1: General theory. Hoboken, John Willey and Sons, 1988. 858 p. (Russ. ed.: Moscow, IL, 1962. 896 p.).
- Ivanov D. Yu. A refinement of the boundary element collocation method near the boundary of domain in the case of two-dimensional problems of non-stationary heat conduction with boundary conditions of the second and third kind. Tomsk State University Journal of Mathematics and Mechanics, 2019, iss. 57, pp. 5–25 (in Russian). https://doi.org/10.17223/19988621/57/1
- Berezin I. S., Zhidkov N. P. Metody vychisleniy [Computing Methods]. Vol. 1. Moscow, Fizmatgiz, 1962. 464 p. (in Russian).
Received:
12.04.2023
Accepted:
03.05.2023
Published:
29.11.2024
- 247 reads