Extensions of a second order high resolution explicit method for the numerical computation of weak solutions of one dimensonal hyperbolic conservation laws are discussed. The main objectives were (1) to examine the shock resoluton of Harten's method for a two dimensional shock reflection problem, (2) to study the use of a high resolution scheme as a post-processor to an approximate steady state solution, and (3) to construct an implicit in the delta-form using Harten's scheme for the explicit operator and a simplified iteration matrix for the implicit operator

Harten, A.

Warming, R. F.

Yee, H. C.

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NASA Technical Reports Server

On the application and extension of Harten's high resolution scheme

Xost first-order upstream conservative differencing methods can capture shocks quite well for one-dimensional problems. A direct application of these first-order methods to two-dimensional problems does not necessarily produce the same type of accuracy unless the shocks are locally aligned with the mesh. Harten has recently developed a second-order high-resolution explicit method for the numerical computation of weak solutions of one-dimensional hyperbolic conservation laws. The main objectives of this paper are (a) to examine the shock resolution of Harten\u27s method for a two-dimensional shock reflection problem, (b) to study the use of a high-resolution scheme as a post-processor to an approximate steady-state solution, and (c) to construct an implicit method in the delta-form using Harten\u27s scheme for the explicit operator and a simplified iteration matrix for the implicit operator

Yee, Helen C.

Harten, Amiran

DigitalCommons@University of Nebraska

On the Application and Extension of Harten\u27s High-Resolution Scheme

On the application and extension of Harten's high resolution scheme

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DigitalCommons@University of Nebraska