Bradley-Terry model

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The names of R.A. Bradley and M.E. Terry are associated with a model that is widely employed in paired comparisons. In paired comparison experiments, observations are made by presenting pairs of objects to one or more judges. This method is used in experimental situations where objects are judged subjectively (cf. also Paired comparison model). The basic model was presented in [a1]. The model is mostly formulated as follows (see, e.g., [a2]).

The paired comparison experiment has $t$ objects $T _ {1} \dots T _ {t}$ with $n _ {ij }$ comparisons of $T _ {i}$ and $T _ {j}$, $n _ {ij } \geq 0$, $n _ {ii } = 0$, $n _ {ji } = n _ {ij }$, $i,j = 1 \dots t$. Some of the $n _ {ij }$ may be zero, but the design should be connected, i.e., there must not be any subset of the treatments such that no treatment in this subset is compared with any treatment of the complementary subset. The model postulates the existence of treatment parameters $\pi _ {i}$ for $T _ {i}$( $\pi _ {i} \geq 0$), $\sum _ {i} \pi _ {i} = 1$, such that the probability of selecting $T _ {i}$, when compared with $T _ {j}$, is equal to ${ {\pi _ {i} } / {( \pi _ {i} + \pi _ {j} ) } }$.

The likelihood method can be used to estimate the parameters $\pi _ {i}$( cf. Likelihood equation). If the comparisons are independent, the likelihood function $L$ is

$$L = { \frac{\prod _ { i } \pi _ {i} ^ {a _ {i} } }{\prod _ {i \leq j } ( \pi _ {i} + \pi _ {j} ) ^ {n _ {ij } } } } ,$$

where $a _ {i} = \sum _ {j} n _ {i.ij }$ and $n _ {i.ij }$ is the number of times $T _ {i}$ has been preferred to $T _ {j}$ when $T _ {i}$ and $T _ {j}$ were compared ( $n _ {i.ij } + n _ {j.ij } = n _ {ij }$). In [a3], large-sample results and the asymptotic distribution of the maximum-likelihood estimators are given. L.R. Ford has described an iterative solution of the likelihood equations (see [a4]). R.J. Beaver has presented, [a5], a weighted least-squares approach to paired comparison models. He has also used a method, described in [a6], which presents a unified approach to the analysis of data resulting from an experiment involving multinomial populations. Thus, general results from weighted least-squares methods can be used. A. Springall (see [a7]) has considered the case where the parameters $\pi _ {i}$( $i = 1 \dots t$) are functions of continuous variables $x _ {1} \dots x _ {s}$. He has formulated a model that is linear in the unknown parameters ${ \mathop{\rm log} } \pi _ {i} = \sum _ {k} x _ {ik } \beta _ {k}$. In this case the parameters $\beta _ {k}$ have to be estimated. He has given results concerning the asymptotic variance-covariance matrix of the estimators.

A linear model like the one above can be used to answer optimal design questions.

See also Paired comparison model.

References

 [a1] R.A. Bradley, M.E. Terry, "The rank analysis of incomplete block designs. I. The method of paired comparisons" Biometrika , 39 (1952) pp. 324–345 [a2] R.A. Bradley, A.T. El-Helbawy, "Treatment contrasts in paired comparisons: basic procedures with application to factorials" Biometrika , 63 (1976) pp. 255–262 [a3] R.A. Bradley, "Rank analysis of incomplete block designs. III. Some large-sample results on estimation and power for a method of paired comparisons" Biometrika , 42 (1955) pp. 450–470 [a4] L.R. Ford, Jr., "Solution of a ranking problem from binary comparisons" Amer. Math. Monthly , 64 (1957) pp. 28–33 [a5] R.J. Beaver, "Weighted least squares analysis of several univariate Bradley–Terry models" J. Amer. Statist. Assoc. , 72 (1977) pp. 629–634 [a6] J.E. Grizzle, C.F. Starmer, G.G. Koch, "Analysis of categorical data by linear models" Biometrics , 25 (1969) pp. 489–504 [a7] A. Springall, "Response surface fitting using a generalization of the Bradley–Terry paired comparison model" Appl. Statist. , 22 (1973) pp. 59–68
How to Cite This Entry:
Bradley-Terry model. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Bradley-Terry_model&oldid=46143
This article was adapted from an original article by E.E.M. van Berkum (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article