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| Title Details: | |
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Equations of elliptic type |
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| Authors: |
Dassios, George Kyriaki, Kyriaki Vafeas, Panayiotis |
| Description: | |
| Abstract: |
The basic techniques for dealing with elliptical type problems represented by Laplace's equation are analyzed. The proposed techniques refer to both two dimensions (Cartesian and polar systems) and three dimensions (Cartesian, cylindrical and spherical systems). In each of these geometries, the bases of eigensolutions for both Laplace's equation and Helmholtz's equation are produced analytically.
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| Linguistic Editors: |
Spanou, Andromachi |
| Technical Editors: |
Nikas, Ioannis Spanou, Andromachi |
| Graphic Editors: |
Nikas, Ioannis |
| Type: |
Chapter |
| Creation Date: | 08-11-2023 |
| Item Details: | |
| License: |
Attribution - NonCommercial - ShareAlike 4.0 International (CC BY-NC-SA 4.0) |
| Handle | http://hdl.handle.net/11419/11339 |
| Bibliographic Reference: | Dassios, G., Kyriaki, K., & Vafeas, P. (2023). Equations of elliptic type [Chapter]. In Dassios, G., Kyriaki, K., & Vafeas, P. 2023. Partial Differential Equations [Undergraduate textbook]. Kallipos, Open Academic Editions. https://hdl.handle.net/11419/11339 |
| Language: |
Greek |
| Is Part of: |
Partial Differential Equations |
| Publication Origin: |
Kallipos, Open Academic Editions |