Numerical Recipes in FORTRAN - The Art of Scientific Computing, 2nd Edition

  title={Numerical Recipes in FORTRAN - The Art of Scientific Computing, 2nd Edition},
  author={William H. Press and Saul A. Teukolsky and William T. Vetterling and Brian P. Flannery},
Keywords: informatique ; numerical recipes Note: contient un CDRom Reference Record created on 2004-09-07, modified on 2016-08-08 
An evaluation of high performance Fortran
High Performance Fortran (HPF) is evaluated by rewriting sequential model programs for Householder reduction, simulated annealing, and grid relaxation. The author concludes that HPF has severe
Differentiable Optimization and Equation Solving: A Treatise on Algorithmic Science and the Karmarkar Revolution
An overview of the dramatic reorganization in reaction to N. Karmakars seminal 1984 paper on algorithmic linear programming in the area of algorithmic differentiable optimization and
2 New Approach In a recent paper
The classification of periodic alternating lattices was analyzed in great details by R. Fernow [1]. In this note I suggest a faster and economical numerical procedure to calculate the matched beta
On the application of multicomplex algebras in numerical integration
In this paper, we propose a methodology to numerically integ rat functions using multicomplex algebras and their corresponding matrix representations. The methodology em ploys multicomplex Taylor
CSSS 2000-2001 Math Review Lectures: Probability, Statistics and Stochastic Processes
2 i These notes are available electronically from Reports of typos, and more serious bugs, are eagerly requested.
The effective method to calculate eigenvalues of Chandrasekhar-Page angular equations
An effective, reliable and time saving numerical method with using of the Pruefer transformation is proposed to calculate eigenvalues of Chandrasekhar-Page angular equations.
Study of special algorithms for solving Sturm-Liouville and Schrodinger equations
In dit proefschrift beschrijven we een specifieke klasse van numerieke methoden voor het oplossen van Sturm-Liouville en Schrodinger vergelijkingen. Ook de Matlab-implementatie van de methoden wordt
FiEstAS sampling - a Monte Carlo algorithm for multidimensional numerical integration


Numerical methods that work
Part I. Fundamental Methods: The calculation of functions, Roots of transcendental equations, and the care and treatment of singularities.