On automobile insurance ratemaking

Abstract

Suppose that an automobile insurance plan is characterized by a double classification. The risks are thus divided into classes, i = 1, 2, …, p (e.g. defined by use of car and age of operator), and groups j = 1, 2, …, q (e.g. defined by licence and by accidents during the last three years). The experience of the company is described by the observed “relative loss ratios” r_ij and some measure of exposure n_ij. A general model, often used, is that the r_ij: s are observations of random variables with the expected values g_ij = g(α_i, β_j), where the relativities α_i are parameters representing the classes i and the relativities β^j represent the influence of the groups j. One of the ratemaker's problems is to find a realistic function g(α, β) and to obtain estimates a_i of α_i and b_j of β_j.In their paper “Two Studies in Automobile Insurance Rate-making” (ASTIN Bulletin Vol. I, Part IV, page 192-217) Robert Bailey and LeRoy Simon have thoroughly analyzed this problem for private passenger automobiles in Canada. They have principally studied three different types of the function g(α β), namely g(α β) = αβ (Method 2), g(α β) = α + β (Method 3) and g(α β) = 3αβ— 2 (Method 4). The authors show in an appendix, that the variance of r_ij is approximately g(α_i β_j)/Kn_ij where K ≅ 0.005 for the Canadian data. They estimate the relativities α_i and β_j; by making χ² = K. Σn_ij(r_ij — g_ij)²/g_ij a minimum. For the Canadian material, the “method 4” agrees best with the observations. This method gives an observed χ² value of about 8 for 11 degrees of freedom.