Least square estimates of regression parameters may become unreliable when some outliers affect the data. This fact forces to search for different methods of estimation, some of which consist of substituting ranks to observations to avoid influences by extremes values. Cifarelli (1978) proposes one of such methods to estimate the slope parameter of a linear regression model, by using Gini's cograduation index. In this paper Cifarelli's method is generalized to the case of quadratic regression, that is to the estimation of the parameters b and c of the model Yi = a + b xi + c xi^2 + ei (i = 1 ,..., n) where the xi's are supposed to be known constants and the ei's are iid error terms following an unknown distribution. The parameters b and c are estimated in a two-step procedure, each time by searching for the value which sets to zero the Gini's cograduation index between the residuals of the model and the values of the explanatory variable (in analogy with a related property of the least square method involving covariance). A simulation study is provided to test the performance of the proposed method, which proves to be often superior to other known related methodologies.
Borroni, C. (2006). Gini's cograduation index for the estimation of the coefficients of a quadratic regression model. STATISTICA & APPLICAZIONI, 4(2), 27-46.
Gini's cograduation index for the estimation of the coefficients of a quadratic regression model
BORRONI, CLAUDIO GIOVANNI
2006
Abstract
Least square estimates of regression parameters may become unreliable when some outliers affect the data. This fact forces to search for different methods of estimation, some of which consist of substituting ranks to observations to avoid influences by extremes values. Cifarelli (1978) proposes one of such methods to estimate the slope parameter of a linear regression model, by using Gini's cograduation index. In this paper Cifarelli's method is generalized to the case of quadratic regression, that is to the estimation of the parameters b and c of the model Yi = a + b xi + c xi^2 + ei (i = 1 ,..., n) where the xi's are supposed to be known constants and the ei's are iid error terms following an unknown distribution. The parameters b and c are estimated in a two-step procedure, each time by searching for the value which sets to zero the Gini's cograduation index between the residuals of the model and the values of the explanatory variable (in analogy with a related property of the least square method involving covariance). A simulation study is provided to test the performance of the proposed method, which proves to be often superior to other known related methodologies.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.