论文信息 - A Logistic Approximation to The Cumulative Normal Distribution

A Logistic Approximation to The Cumulative Normal Distribution

This paper develops a logistic approximation to the cumulative normal distribution. Although the literature contains a vast collection of approximate functions for the normal distribution, they are very complicated, not very accurate, or valid for only a limited range. This paper proposes an enhanced approximate function. When comparing the proposed function to other approximations studied in the literature, it can be observed that the proposed logistic approximation has a simpler functional form and that it gives higher accuracy, with the maximum error of less than 0.00014 for the entire range. This is, to the best of the authors’ knowledge, the lowest level of error reported in the literature. The proposed logistic approximate function may be appealing to researchers, practitioners and educators given its functional simplicity and mathematical accuracy.

S. Bowling | M. Khasawneh | S. Kaewkuekool | B. Cho

[1] George Pólya,et al. Remarks on Computing the Probability Integral in One and Two Dimensions , 1949 .

[2] J. H. Cadwell. The bivariate normal integral , 1951 .

[3] R. G. Hart. A close approximation related to the error function , 1966 .

[4] Irene A. Stegun,et al. Handbook of Mathematical Functions. , 1966 .

[5] Frederick S. Hillier,et al. Introduction of Operations Research , 1967 .

[6] A new approximation related to the error function , 1968 .

[7] The Teacher's Corner: A Simple Approximation to the Standard Normal Probability Density Function , 1968 .

[8] R. Faure,et al. Introduction to operations research , 1968 .

[9] A Simple Approximation to the Standard Normal Probability Density Function , 1968 .

[10] W. R. Buckland,et al. Distributions in Statistics: Continuous Multivariate Distributions , 1973 .

[11] W. R. Buckland,et al. Distributions in Statistics: Continuous Multivariate Distributions , 1974 .

[12] H. C. Hamaker,et al. Approximating the Cumulative Normal Distribution and its Inverse , 1978 .

[13] Jinn-Tyan Lin,et al. Approximating the normal tail probability and its inverse for use on a pocket calculator , 1989 .

[14] Jinn-Tyan Lin,et al. A Simpler Logistic Approximation to the Normal Tail Probability and its Inverse , 1990 .

[15] S. Bowling,et al. A Logistic Approximation to The Cumulative Normal Distribution , 2009 .