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Numerical solution of system of random Volterra integral equations II:Newton's method *  

Authors: N. Medhin a;  M. Sambandham bc; C. K. Zoltani d
Affiliations:   a Department of Mathematics and Computer Science, Atlanta University, Atlanta, GA
b Center for Computational Sciences, Atlanta University,
c Department of Mathematics, Morehouse College, Atlanta, GA
d U.S. Army Ballistic Research Laboratory, Ignition and Combustion Branch, Aberdeen Proving Ground, Maryland
DOI: 10.1080/07362999008809201
Publication Frequency: 6 issues per year
Published in: journal Stochastic Analysis and Applications, Volume 8, Issue 1 1990 , pages 105 - 125
Formats available: PDF (English)
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Abstract

In this article we discuss Newton's method to find the numerical solution of a system of random volterra integral equations. An example is presented to implement the theory and Kolmogorov-Smirnov test is used to fit a distribution of the solutions.
* 1Research supported by U.S. Army Research Contract No: DAAG29-85-G0109 and ONR Grant No. N0001-87-K-9276.
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