Modeling vehicle accidents and highway geometric design relationships.

The statistical properties of four regression models--two conventional linear regression models and two Poisson regression models--are investigated in terms of their ability to model vehicle accidents and highway geometric design relationships. Potential limitations of these models pertaining to their underlying distributional assumptions, estimation procedures, functional form of accident rate, and sensitivity to short road sections, are identified. Important issues, such as the treatment of vehicle exposure and traffic conditions, and data uncertainties due to sampling and nonsampling errors, are also discussed. Roadway and truck accident data from the Highway Safety Information System (HSIS), a highway safety data base administered by the Federal Highway Administration (FHWA), have been employed to illustrate the use and the limitations of these models. It is demonstrated that the conventional linear regression models lack the distributional property to describe adequately random, discrete, nonnegative, and typically sporadic vehicle accident events on the road. As a result, these models are not appropriate to make probabilistic statements about vehicle accidents, and the test statistics derived from these models are questionable. The Poisson regression models, on the other hand, possess most of the desirable statistical properties in developing the relationships. However, if the vehicle accident data are found to be significantly overdispersed relative to its mean, then using the Poisson regression models may overstate or understate the likelihood of vehicle accidents on the road. More general probability distributions may have to be considered.

[1]  A. Agresti Categorical data analysis , 1993 .

[2]  William W. Hunter,et al.  Cost-effective geometric improvements for safety upgrading of horizontal curves , 1991 .

[3]  L Fridstrøm,et al.  An aggregate accident model based on pooled, regional time-series data. , 1991, Accident; analysis and prevention.

[4]  B. Efron Double Exponential Families and Their Use in Generalized Linear Regression , 1986 .

[5]  David R. Cox,et al.  Some remarks on overdispersion , 1983 .

[6]  J F Paniati HIGHWAY SAFETY INFORMATION SYSTEM , 1990 .

[7]  H Okamoto,et al.  A method to cope with the random errors of observed accident rates in regression analysis. , 1989, Accident; analysis and prevention.

[8]  Antoine G. Hobeika,et al.  TRUCK ACCIDENT MODELS FOR INTERSTATES AND TWO-LANE RURAL ROADS , 1993 .

[9]  N. Draper,et al.  Applied Regression Analysis , 1966 .

[10]  R. W. Wedderburn Quasi-likelihood functions, generalized linear models, and the Gauss-Newton method , 1974 .

[11]  D. Ruppert,et al.  Transformation and Weighting in Regression , 1988 .

[12]  G Maycock,et al.  ACCIDENTS AT 4-ARM ROUNDABOUTS , 1984 .

[13]  J. Lawless,et al.  Tests for Detecting Overdispersion in Poisson Regression Models , 1989 .

[14]  E L Frome,et al.  Poisson regression analysis of the mortality among a cohort of World War II nuclear industry workers. , 1990, Radiation research.

[15]  A. Cameron,et al.  Econometric models based on count data. Comparisons and applications of some estimators and tests , 1986 .

[16]  Hsin-Li Chang,et al.  MODELING THE RELATIONSHIP OF ACCIDENTS TO MILES TRAVELED , 1986 .

[17]  Alan E. Gelfand,et al.  A Note on Overdispersed Exponential Families , 1990 .

[18]  Sarath C. Joshua,et al.  Estimating truck accident rate and involvements using linear and poisson regression models , 1990 .

[19]  Don M. Miller,et al.  Reducing Transformation Bias in Curve Fitting , 1984 .

[20]  J. Cramer Econometric Applications of Maximum Likelihood Methods , 1986 .

[21]  H. Bozdogan Model selection and Akaike's Information Criterion (AIC): The general theory and its analytical extensions , 1987 .

[22]  J. Lawless Negative binomial and mixed Poisson regression , 1987 .

[23]  D. Cox,et al.  The statistical analysis of series of events , 1966 .

[24]  A. Cameron,et al.  Regression-based tests for overdispersion in the Poisson model☆ , 1990 .

[25]  E Hauer,et al.  EXTENT AND SOME IMPLICATIONS OF INCOMPLETE ACCIDENT REPORTING , 1988 .

[26]  P. McCullagh,et al.  Generalized Linear Models , 1984 .

[27]  T. Hassard,et al.  Applied Linear Regression , 2005 .