Journal of Electromagnetic Analysis and Applications

Volume 6, Issue 10 (September 2014)

ISSN Print: 1942-0730   ISSN Online: 1942-0749

Google-based Impact Factor: 0.55  Citations  h5-index & Ranking

The Exact Formulation of the Inverse of the Tridiagonal Matrix for Solving the 1D Poisson Equation with the Finite Difference Method

HTML  XML Download Download as PDF (Size: 384KB)  PP. 303-308  
DOI: 10.4236/jemaa.2014.610030    5,661 Downloads   8,242 Views  Citations
Author(s)

ABSTRACT

A new method for solving the 1D Poisson equation is presented using the finite difference method. This method is based on the exact formulation of the inverse of the tridiagonal matrix associated with the Laplacian. This is the first time that the inverse of this remarkable matrix is determined directly and exactly. Thus, solving 1D Poisson equation becomes very accurate and extremely fast. This method is a very important tool for physics and engineering where the Poisson equation appears very often in the description of certain phenomena.

Share and Cite:

Gueye, S. (2014) The Exact Formulation of the Inverse of the Tridiagonal Matrix for Solving the 1D Poisson Equation with the Finite Difference Method. Journal of Electromagnetic Analysis and Applications, 6, 303-308. doi: 10.4236/jemaa.2014.610030.

Cited by

[1] On the fundamental solutions-based inversion of Laplace matrices
Results in Applied Mathematics, 2022
[2] Results in Applied Mathematics
2022
[3] Finite-difference methods for solving 1D Poisson problem
Discrete and Continuous Models and Applied …, 2022
[4] Modelling a bioelectrochemical cell from a physics perspective
2021
[5] Multi-source off-grid DOA estimation with single snapshot using non-uniform linear arrays
Signal Processing, 2021
[6] Analysis of discretized parabolic problems modeling electrostatic micro-electromechanical systems.
2019
[7] Analyse mathématique et numérique de plusieurs problèmes non linéaires
2018
[8] Analysis of discretized parabolic problems modeling electrostatic micro-electromechanical systems
2018
[9] Ultrafast spin dynamics in ferromagnetic thin films
Thesis, 2017
[10] Solution of 1D Poisson Equation with Neumann-Dirichlet and Dirichlet-Neumann Boundary Conditions, Using the Finite Difference Method
Journal of Electromagnetic Analysis and Applications, 2014
[11] Generalization of the Exact Solution of 1D Poisson Equation with Robin Boundary Conditions, Using the Finite Difference Method
Journal of Electromagnetic Analysis and Applications, 2014
[12] Semi-Analytical Solution of the 1D Helmholtz Equation, Obtained from Inversion of Symmetric Tridiagonal Matrix
Journal of Electromagnetic Analysis and Applications, 2014
[13] EQUATION DE LAPLACE EN 2D: RESOLUTIONNUMERIQUE AVEC LA METHODE DES DIFFERENCESFINIES EN UTILISANT LES BIBLIOTHEQUES DEFORTRAN LAPACK ET BLAS2D LAPLACE EQUATION: NUMERICAL SOLUTIONWITH THE FINITE DIFFERENCE METHOD USING THEFORTRAN LIBRARIES LAPACK AND BLAS
2014

Journals Menu
Follow SCIRP
Contact us
+1 323-425-8868
customer@scirp.org
WhatsApp +86 18163351462(WhatsApp)
Click here to send a message to me 1655362766
Paper Publishing WeChat

Copyright © 2024 by authors and Scientific Research Publishing Inc.

Creative Commons License

This work and the related PDF file are licensed under a Creative Commons Attribution 4.0 International License.