eprintid: 1352 rev_number: 2 eprint_status: archive userid: 1 dir: disk0/00/00/13/52 datestamp: 2023-11-09 15:49:30 lastmod: 2023-11-09 15:49:30 status_changed: 2023-11-09 15:39:33 type: conference_item metadata_visibility: show creators_name: Sulaiman, J. creators_name: Hasan, M.K. creators_name: Othman, M. creators_name: Karim, S.A.A. title: MEGSOR iterative method for the triangle element solution of 2D poisson equations ispublished: pub keywords: Galerkin methods; Numerical methods, Block iterative method; Finite difference approach; Galerkin scheme; Iterative schemes; Modified explicit group; Numerical experiments; Point block iteration; Triangle element, Iterative methods note: cited By 23 abstract: In previous studies of finite difference approaches, the 4 Point-Modified Explicit Group (MEG) iterative method with or without a weighted parameter, �, has been pointed out to be much faster as compared to the existing four point block iterative methods. The main characteristic of the MEG iterative method is to reduce computational complexity compared to the full-sweep or half-sweep methods. Due to the effectiveness of this method, the primary goal of this paper is to demonstrate the use of the 4 Point- Modified Explicit Group (MEG) iterative method together with a weighted parameter, namely 4 Point-MEGSOR. The effectiveness of this method has been shown via results of numerical experiments, which are recorded and analyzed, show that that the 4 Point-MEGSOR iterative scheme is superior as compared with the existing four point block schemes. date: 2010 publisher: Elsevier B.V. official_url: https://www.scopus.com/inward/record.uri?eid=2-s2.0-78650294283&doi=10.1016%2fj.procs.2010.04.041&partnerID=40&md5=2f80fc2f7f09ab2267db10a520a50b42 id_number: 10.1016/j.procs.2010.04.041 full_text_status: none publication: Procedia Computer Science volume: 1 number: 1 pagerange: 377-385 refereed: TRUE issn: 18770509 citation: Sulaiman, J. and Hasan, M.K. and Othman, M. and Karim, S.A.A. (2010) MEGSOR iterative method for the triangle element solution of 2D poisson equations. In: UNSPECIFIED.