处理因变量极端值的替代变换方法

Alternative Transformations to Handle Extreme Values of the Dependent Variable

Journal of the American Statistical Association · 1988
被引 201
ABS 4

中文导读

本文研究了两种减少因变量极端值影响的变换方法(扩展Box-Cox和反双曲正弦),并用加拿大家庭净资产数据检验,发现反双曲正弦更优,对处理含非正值因变量的实证研究者有参考价值。

Abstract

Abstract Transformations that could be used to reduce the influence of extreme observations of dependent variables, which can assume either sign, on regression coefficient estimates are studied in this article. Two that seem reasonable on a priori grounds—the extended Box—Cox (BC) and the inverse hyperbolic sine (IHS)—are evaluated in detail. One feature is that the log-likelihood function for IHS is defined for zero values of the dependent variable, which is not true of BC. The double-length regression technique (Davidson and MacKinnon 1984) is used to perform hypothesis tests of one transformation against the other using Canadian data on household net worth. These tests support the use of IHS instead of BC for this data set. Empirical investigators in economics often work with a logged dependent variable (taking the natural logarithm of a data series is, of course, a special case of BC) to reduce the weight their particular estimation procedure might otherwise attach to extreme values of the dependent variable. Logging dependent and independent variables has the added attraction that slope coefficients may be interpreted as elasticities. In the event that the dependent variable assumes nonpositive values, some researchers (e.g., Diamond and Hausman 1984; King and Dicks-Mireaux 1982) have dropped the nonpositive values and others have added a constant so that each observation is positive. An alternative transformation, which is defined for any real number, is the IHS transformation, sinh-1(x) = log(x + (x 2 + l)1/2). This was proposed in Johnson (1949) and is just as easy to employ as the BC transformation.

计量经济学统计学经济学数学计算机科学