Epsilon: Jurnal Matematika Murni dan Terapan
Vol 11, No 1 (2017): JURNAL EPSILON VOLUME 11 NOMOR 1

KEKONVERGENAN SOLUSI PERSAMAAN DIFERENSIAL BIASA ORDE SATU MENGGUNAKAN METODE ITERASI VARIASIONAL

Dita Apriliani (Program Studi Matematika FMIPA Universitas Lambung Mangkurat)
Akhmad Yusuf (Program Studi Matematika FMIPA Universitas Lambung Mangkurat)
Mohammad Mahfuzh Shiddiq (Program Studi Matematika FMIPA Universitas Lambung Mangkurat)

Article Info

Publish Date
21 Nov 2017

Abstract

Ordinary differential equation (ODE) is an equation involving derivatives of one or more dependent variables with respect to single independent variable. ODE is grouped into two part; linear and nonlinear. There are some methods to determine the solution of nonlinear ODE, one of them is Variational Iteration Method. This method create a correction functional using general Lagrange multiplier and a restricted variational. The purpose of this research is to prove convergence and solution ordinary differential equation using variational iteration method. This study was conducted by literary method. This result is show that If operator of correction satisfy contraction inequality ‖????????????????+1‖≤???????? ‖????????????????‖ where 0<????????<1, then series solution from differential equation nonlinear converge to exact solution and can be used to determine the nonlinear solution.

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Journal Info
Epsilon: Jurnal Matematika Murni dan Terapan
Website

Abbrev

epsilon

Publisher

Universitas Lambung Mangkurat

Subject

Decision Sciences, Operations Research & Management Transportation

Description

Jurnal Matematika Murni dan Terapan Epsilon is a mathematics journal which is devoted to research articles from all fields of pure and applied mathematics including 1. Mathematical Analysis 2. Applied Mathematics 3. Algebra 4. Statistics 5. Computational ...