TY - JOUR
T1 - Fisher's information on the correlation coefficient in bivariate logistic models
AU - Smith, M.D.
AU - Moffatt, P.G.
PY - 1999/9/1
Y1 - 1999/9/1
N2 - From a theoretical perspective, the paper considers the properties of the maximum likelihood estimator of the correlation coefficient, principally regarding precision, in various types of bivariate model which are popular in the applied literature. The models are: 'Full-Full', in which both variables are fully observed; 'Censored-Censored', in which both of the variables are censored at zero; and finally, 'Binary-Binary', in which both variables are observed only in sign. For analytical convenience, the underlying bivariate distribution which is assumed in each of these cases is the bivariate logistic. A central issue is the extent to which censoring reduces the level of Fisher's information pertaining to the correlation coefficient, and therefore reduces the precision with which this important parameter can be estimated.
AB - From a theoretical perspective, the paper considers the properties of the maximum likelihood estimator of the correlation coefficient, principally regarding precision, in various types of bivariate model which are popular in the applied literature. The models are: 'Full-Full', in which both variables are fully observed; 'Censored-Censored', in which both of the variables are censored at zero; and finally, 'Binary-Binary', in which both variables are observed only in sign. For analytical convenience, the underlying bivariate distribution which is assumed in each of these cases is the bivariate logistic. A central issue is the extent to which censoring reduces the level of Fisher's information pertaining to the correlation coefficient, and therefore reduces the precision with which this important parameter can be estimated.
UR - http://www.scopus.com/inward/record.url?scp=0033460410&partnerID=8YFLogxK
M3 - Article
AN - SCOPUS:0033460410
VL - 41
SP - 315
EP - 330
JO - Australian and New Zealand Journal of Statistics
JF - Australian and New Zealand Journal of Statistics
SN - 1369-1473
IS - 3
ER -