SPECIAL HYPERBOLIC TYPE APPROXIMATION AND FOURIER METHOD FOR SOLVING 3-D STATIONARY DIFFUSION PROBLEM

Authors

  • Ilmārs Kangro Rezekne Academy of Riga Technical University (LV)
  • Harijs Kalis Institute of Mathematics and Computer Sciences, University of Latvia (LV)

DOI:

https://doi.org/10.17770/etr2025vol2.8576

Keywords:

Partial differential equation, conservative averaging method, 3-D boundary-value problem, 2-D and 1-D boundary-value problems

Abstract

In this paper, we explore the conservative averaging methods (CAM) used to solve three-dimensional boundary-value problems of second order. We investigate various interpretations of CAM to address these problems. We consider a special type of hyperbolic approximation - spline interpolation, that estimates middle integral values of piecewise smooth functions. By employing these splines, along with parabolic-type splines, we can reduce multidimensional mathematical physics problems in three dimensions to problems involving two dimensions for one coordinate. This approach also enables us to further simplify the two-dimensional problems into one-dimensional problems, where analytical solutions can be obtained. Additionally, we numerically solve the corresponding problem with homogeneous boundary conditions of the first kind using the Fourier series method, and we compare these numerical results with the analytical solutions.

 

 

References

E. Teirumnieka, E. Teirumnieks, I. Kangro, H. Kalis, A. Gedroics. The mathematical modeling of Ca and Fe distribution in peat layers. Proceed. Of the 8-th int. scienti_c practical conference "Environment. Technology. Resources." Rezekne higher education institution, June 20-22, 2 2011, 40-47.

I. Kangro, H. Kalis, A. Gedroics, E. Teirumnieka, E. Teirumnieks. On mathematical modelling of metals distributions in peat layers. Mathematical Modelling and Analysis, 19:4 2014, 568-588.

M. R. Talaee and V. Sarafrazi, Analytical solution for three-dimensional hyperbolic heat conduction equation with time-dependent and distributed heat source. Journal of Mechanics, DOI: 10.1017/jmech.2016.42, 2016, pp.1-11.

A. Buikis, The analysis of schemes for the modelling same processes of filtration in the underground. Riga, Acta Universitatis Latviensis, 592, 1994, 25-32 (in Latvian).

A. Buikis, Modelling filtration processes in layered porous media by the conservative averaging method. Dr. Thesis, Kazan, 1987 (in Rusian).

A. Buikis, Conservative averaging as an approximate method for solution of some direct and inverse heat transfer problems. Advanced Computational Methods in Heat Transfer, WIT Transaction on Engineering Sciences, vol.53 2006, 311-320.

A. Buikis, Conservative Averaging Method: Theory and Applications. Abstracts of MMA2015, May 26-29, Sigulda, Latvia, 2015, pp. 2.

A. Buikis, The conservative averaging method development in the petroleum science. Journal of Scientific and Engineering Research, 2017, 4(4):176-197.

E. Bejaoui and F. Ben Belgacem, Treatment of 3D diffusion problems with discontinuous coefficients and Dirac curvilinear sources, Appl. Numer. Math. 207, 2025, pp. 400–413.

H. Kalis, A. Buikis, A. Aboltins, I. Kangro. Special Splines of Hyperbolic Type for the Solutions of Heat and Mass Transfer 3-D Problems in Porous Multi-Layered Axial Symmetry Domain. Mathematical Modelling and Analysis, 22:4 2017, 425-440.

H. Kalis, A. Buikis and I. Kangro, Special splines of exponential type for the solutions of mass transfer problems in multi-layer domains. Mathematical Modelling and Analysis, 21:4 2016, 450-465.

A. Buikis, H. Kalis and I. Kangro, Special hyperbolic type spline for mass transfer problems in multi-layer 3-D domains. Proc. of 3-rd int. conf. on applied, numerical and computational mathematics (ICANCM 15). Sliema, Malta, 2015, 25-34.

I. Kangro, H. Kalis, E. Teirumnieka, E. Teirumnieks. Special Hyperbolic type approximation for solving of 3-D two-layer stationary diffusion problem. Proc. of the 12th int. scienti_c practical conference Environment. Technology. Resources., Rezekne Academy of Technologies, June 20-22, 2019, 95-100.

A. Aboltins, I. Kangro and H. Kalis, Conservative averaging methods for solving some nonlinear heat transfer problems related to combustion. Proc. Of the 19th int. conf. Engineering for Rural Development, May 20-22, 2020, Jelgava, 2020, 1698-1705.

H. Kalis and I. Kangro, Effective Finite Difference and Conservative Averaging Methods for Solving Problems of sMathematical Physics. Monography, Rēzekne: Rēzeknes Tehnoloģiju akadēmija, 2021.

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Published

08.06.2025

Issue

Vol. 2 (2025): Environment. Technology. Resources. Proceedings of the 16th International Scientific and Practical Conference. Volume 2

Section

Information Technologies

License

Copyright (c) 2025 Ilmārs Kangro, Harijs Kalis

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

[1]
I. Kangro and H. Kalis, “SPECIAL HYPERBOLIC TYPE APPROXIMATION AND FOURIER METHOD FOR SOLVING 3-D STATIONARY DIFFUSION PROBLEM”, ETR, vol. 2, pp. 181–187, Jun. 2025, doi: 10.17770/etr2025vol2.8576.