论文信息 - Investigations of a nonrandom numerical method for multidimensional integration

Investigations of a nonrandom numerical method for multidimensional integration

A numerical integration technique based upon the use of nonrandom number sequences is examined with test integrations of a simple, analytical function. A comparison of the nonrandom technique with the familiar Monte Carlo method shows that the error of the new method decreases faster as more points are used in the calculation. Moreover, the new method needs fewer points to calculate an integral to an accuracy of 10% than does the Monte Carlo method.

Max Wolfsberg | M. Wolfsberg | Vera B. Cheng | Henry H. Suzukawa | H. Suzukawa

[1] S. Zaremba. The Mathematical Basis of Monte Carlo and Quasi-Monte Carlo Methods , 1968 .

[2] C. Haselgrove,et al. A method for numerical integration , 1961 .

[3] S. K. Zaremba,et al. Good lattice points, discrepancy, and numerical integration , 1966 .

[4] E. Hlawka. Funktionen von beschränkter Variatiou in der Theorie der Gleichverteilung , 1961 .

[5] A. Stroud. Approximate calculation of multiple integrals , 1973 .

[6] T. Warnock,et al. Transformation relationships from center-of- mass cross section and excitation functions to observable angular and velocity distributions of scattered flux. , 1968 .

[7] Harold Conroy,et al. Molecular Schrödinger Equation. VIII. A New Method for the Evaluation of Multidimensional Integrals , 1967 .

[8] P. R. Bevington,et al. Data Reduction and Error Analysis for the Physical Sciences , 1969 .