Mean signed deviation

In statistics, the mean signed difference, deviation, or error (MSD) is a sample statistic that summarises how well a set of estimates ${\hat {\theta }}_{i}$ match the quantities $\theta _{i}$ that they are supposed to estimate. It is one of a number of statistics that can be used to assess an estimation procedure, and it would often be used in conjunction with a sample version of the mean square error.

For example, suppose a linear regression model has been estimated over a sample of data, and is then used to extrapolate predictions of the dependent variable out of sample after the out-of-sample data points have become available. Then $\theta _{i}$ would be the i-th out-of-sample value of the dependent variable, and ${\hat {\theta }}_{i}$ would be its predicted value. The mean signed deviation is the average value of ${\hat {\theta }}_{i}-\theta _{i}.$

Definition

The mean signed difference is derived from a set of n pairs, $({\hat {\theta }}_{i},\theta _{i})$ , where ${\hat {\theta }}_{i}$ is an estimate of the parameter $\theta$ in a case where it is known that $\theta =\theta _{i}$ . In many applications, all the quantities $\theta _{i}$ will share a common value. When applied to forecasting in a time series analysis context, a forecasting procedure might be evaluated using the mean signed difference, with ${\hat {\theta }}_{i}$ being the predicted value of a series at a given lead time and $\theta _{i}$ being the value of the series eventually observed for that time-point. The mean signed difference is defined to be

\operatorname {MSD}({\hat {\theta }})=\sum _{{i=1}}^{{n}}{\frac {{\hat {\theta _{{i}}}}-\theta _{{i}}}{n}}.

Mean signed deviation

Definition

See also