DocumentCode
52306
Title
Algebraic Second Order Hodge Operator for Poisson´s Equation
Author
Alotto, P. ; Freschi, Fabio ; Repetto, Manuela
Author_Institution
Dipt. di Ing. Ind., Univ. degli Studi di Padova, Padua, Italy
Volume
49
Issue
5
fYear
2013
fDate
May-13
Firstpage
1761
Lastpage
1764
Abstract
Algebraic methods, like the cell method or the finite integration technique are known to be effective in solving numerical problems, but they are limited to linear convergence, i.e., they exactly reconstruct constant fields inside the element. A few attempts in the literature have been aimed at extending the method to higher order, but results have not been completely satisfactory. This paper proposes a novel technique to extend the cell method to second order convergence. The consistency and convergence of the proposed approach are established by numerical results.
Keywords
Poisson equation; convergence of numerical methods; integration; mathematical operators; Poisson equation; algebraic second order Hodge operator; cell method; constant fields; finite integration technique; linear convergence; numerical problems; second order convergence; Cell method; edge elements; finite integration technique; higher order elements;
fLanguage
English
Journal_Title
Magnetics, IEEE Transactions on
Publisher
ieee
ISSN
0018-9464
Type
jour
DOI
10.1109/TMAG.2013.2241406
Filename
6514706
Link To Document