Title: | Convergence problems of integral modeling of 3d electrostatic fields with singularities |
Authors: | Hamar, Roman Doležel, Ivo |
Citation: | AMTEE ’07 : seventh international conference on Advanced Methods in the Theory of Electrical Engineering : September 10-12, 2007 [Pilsen, Czech Republic]. |
Issue Date: | 2007 |
Publisher: | University of West Bohemia |
Document type: | konferenční příspěvek conferenceObject |
URI: | http://amtee.zcu.cz/AMTEE/ArchivedProceedings/proceedings_AMTEE_2007/data/section_i.html http://hdl.handle.net/11025/25772 |
ISBN: | 978-80-7043-564-9 |
Keywords: | elektrostatické pole;integrální rovnice;povrchový náboj;numerická analýza |
Keywords in different language: | electrosstatic field;integral equation;surface charge;numerical analysis |
Abstract in different language: | Numerous electrostatic fields are characterized by the presence of singularities (for example, at the corners or along the edges of electrically conductive charged bodies). Solutions to the tasks involving such elements by classic low-order differential methods often lead to inaccurate results. One of the prospective methods seems to be the integral approach starting from finding the distribution of the charge using the system of the first-kind Fredholm equations. The paper shows an application of this approach to two electrically conductive cubes in a general position in space. Discretization of their surfaces is performed in several different ways and the results are compared with respect to their convergence. |
Rights: | © University of West Bohemia |
Appears in Collections: | CPEE – AMTEE 2007 CPEE – AMTEE 2007 |
Please use this identifier to cite or link to this item:
http://hdl.handle.net/11025/25772
Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.