Estimating parameters of the three-parameter Weibull distribution using a neural network

Weibull distributions play an important role in reliability studies and have many applications in engineering. It normally appears in the statistical scripts as having two parameters, making it easy to estimate its parameters. However, once you go beyond the two parameter distribution, things become complicated. For example, estimating the parameters of a three-parameter Weibull distribution has historically been a complicated and sometimes contentious line of research since classical estimation procedures such as Maximum Likelihood Estimation (MLE) have become almost too complicated to implement. In this paper, we will discuss an approach that takes advantage of Artificial Neural Networks (ANN), which allow us to propose a simple neural network that simultaneously estimates the three parameters. The ANN neural network exploits the concept of the moment method to estimate Weibull parameters using mean, standard deviation, median, skewness and kurtosis. To demonstrate the power of the proposed ANN-based method we conduct an extensive simulation study and compare the results of the proposed method with an MLE and two moment-based methods. [Submitted 23 September 2007; Revised 11 December 2007; Second revision 22 December 2007; Accepted 10 January 2008]

[1]  Thong Ngee Goh,et al.  Statistical Analysis of a Weibull Extension Model , 2003 .

[2]  Richard J. Gerth,et al.  Using real-coded genetic algorithms for Weibull parameter estimation , 1995 .

[3]  Jamal Arkat,et al.  Estimating the parameters of Weibull distribution using simulated annealing algorithm , 2006, Appl. Math. Comput..

[4]  S. Dubey Asymptotic Properties of Several Estimators of Weibull Parameters , 1965 .

[5]  R. Ross,et al.  Graphical methods for plotting and evaluating Weibull distributed data , 1994, Proceedings of 1994 4th International Conference on Properties and Applications of Dielectric Materials (ICPADM).

[6]  James L. McClelland,et al.  Parallel distributed processing: explorations in the microstructure of cognition, vol. 1: foundations , 1986 .

[7]  M. Newby,et al.  The Properties of Moment Estimators for the Weibull Distribution Based on the Sample Coeffkient of Variation , 1980 .

[8]  Min Xie,et al.  Failure Data Analysis with Extended Weibull Distribution , 2007, Commun. Stat. Simul. Comput..

[9]  Christopher M. Bishop,et al.  Neural networks for pattern recognition , 1995 .

[10]  S V Krupa,et al.  Application of a stochastic, Weibull probability generator for replacing missing data on ambient concentrations of gaseous pollutants. , 2000, Environmental pollution.

[11]  N. L. Johnson,et al.  Continuous Univariate Distributions. , 1995 .

[12]  Charles E. Antle,et al.  Estimation of Parameters in the Weibull Distribution , 1967 .

[13]  Eugene H. Lehman,et al.  Shapes, Moments and Estimators of the Weibull Distribution , 1963 .

[14]  John S. White The Moments of Log-Weibull Order Statistics , 1969 .

[15]  Simon Haykin,et al.  Neural Networks: A Comprehensive Foundation , 1998 .