Estimating the false negatives due to blocking in record linkage
Section 4. Finite mixture model
The linkage of the two sources is of interest when it is a viable option even is very large. To capture the essence of such situations, the following two regularity conditions are assumed.
- Two matched records are neighbours with a probability that is bounded away from 0 regardless of
- Two unmatched records are accidental neighbours with a probability of
These assumptions imply that each record has a bounded expected number of neighbours and that pairs (instead of pairs and even pairs if ) are selected by the blocking criteria. They also imply that there is enough linkage information to identify matched records with a success probability, which is bounded away from zero, regardless of the population size. The above assumptions further imply a particular limiting distribution for the number of neighbours Indeed, let where is the number of matched neighbours and is the number of unmatched neighbours. Note that these latter variables are not directly observed expect when or (see Table 3.1). They are also conditionally independent given and such that if an unmatched record is a neighbour with the probability independently of the other unmatched records. When the functions and do not depend on and is large, we have (Billingsley, 1995), where means approximately distributed as. Hence, where is the convolution operator. Note that, in general, the functions and are unknown high-dimensional parameters. To simplify, further assume that is (well approximated by) a piecewise constant function with levels, such that we have the finite mixture model holds approximately. When is fixed, the unknown model parameters are given by the vector that may be estimated with the Expectation-Maximization (EM) procedure in the next section.
The connection between the error rates and model parameters is made by first noting that the FNR and FPR definitions imply
When almost surely, the above equations imply that
where and with the finite mixture model. When is random and such that
as the error rates and the model parameters are related as follows
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