✦ LIBER ✦

Applications of a variational method for mixed differential equations

✍ Scribed by P. K. Khosla; S. G. Rubin

Publisher: Springer
Year: 1981
Tongue: English
Weight: 680 KB
Volume: 15
Category: Article
ISSN: 0022-0833
DOI: 10.1007/bf00042779

No coin nor oath required. For personal study only.

✦ Synopsis

Variational principles for elliptic boundary-value problems as well as linear initial-value problems have been derived by various investigators. For initial-value problems Tonti and Reddy have used a convolution type of bilinear form of the functional for the time-like coordinate. This introduces a certain amount of directionality thereby reflecting the initial-value nature of tire problem. In the present investigation the methods of Tonti and Reddy are used to derive the appropriate variational formulation for the transonic flow problem. A number of linear and non-linear examples have been investigated. As a test for the existence of directionality, finite-differences are used to discretize the variational integral. For initial-value problems of wave equation and diffusion equation type, fully implicit finite-difference approximations are recovered. The small-disturbance transonic equation leads to the Murman and Cole differencing theory ; when applied to the full potentialflow equations, the rotated difference scheme due to Jameson is obtained.

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