CEA et al(ID:6928/)
- Country: fr
- Began: 1966
- Type:Algebraic
Algol extensions for partial differential equations
References:
Cea, J., Nivelet, B., Schmidt, L., and Terrine, G. "Techniques Numeriques de L' Approximation Variationnelle Des Problems Elliptiques" Tome 1. Institut Blaise Pascal, Paris, Apr. 1966. view details
Cea, J., Nivelet, B., Schmidt, L., and Terrine, G. "Techniques Numeriques de L' A pproximation Varialionnelle Des Problems Elliptiques" Tome 3,. Institut Blaise Pascal, Paris, Mar. 1967.
view details
Cárdenas, Alfonso F. and Karplus, Walter J. "PDEL A Language for Partial Diferential Equations" view details
Abstract: Conventional computer methods available to solve continuous system problems characterized by partial differential equations are very time-consuming and cumbersome. A convenient, easy to learn and to use, high level problem oriented language to solve and study partial differential equation problems has been designed; a practical translator for the language has also been designed, and a working version of it has been constructed for a significant portion of the language. This Partial Differential Equation Language, PDEL, is outlined, and the highlights of the translator are briefly summarized.
in [ACM] CACM 16(03) March 1973 view details
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