Accession Number : AD0674946

Title :   NUMERICAL SOLUTION OF HYPERBOLIC EQUATIONS AND SYSTEMS BY A METHOD OF THE RUNGE-KUTTA TYPE. II,

Corporate Author : REDSTONE SCIENTIFIC INFORMATION CENTER REDSTONE ARSENAL ALA TRANSLATION BRANCH

Personal Author(s) : Nguyen Kong Tuy,

Report Date : 24 JUN 1968

Pagination or Media Count : 26

Abstract : In the first part of this article the two-iteration algorithms of the Runge-Kutta type were applied to the solution of the Cauchy problem for hyperbolic equations and systems with two independent variables, where the initial data are given along the line segment x + y = const. In the second part of this article an analogous problem is discussed for one equation with Cauchy data along the curve segment. (Author)

Descriptors :   (*PARTIAL DIFFERENTIAL EQUATIONS, NUMERICAL METHODS AND PROCEDURES), CAUCHY PROBLEM, ITERATIONS, BOUNDARY VALUE PROBLEMS, INTEGRAL EQUATIONS, ALGORITHMS, USSR

Subject Categories : Theoretical Mathematics

Distribution Statement : APPROVED FOR PUBLIC RELEASE