CEA et al(ID:6928/)

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