The TIMESERIES Procedure

Time Series Transformation

There are four transformations available for strictly positive series only. Let ${y_{t} > 0}$ be the original time series, and let ${w_{t}}$ be the transformed series. The transformations are defined as follows:

Log

is the logarithmic transformation.

\[  w_{t} = \mr {ln}(y_{t})  \]
Logistic

is the logistic transformation.

\[  w_{t} = \mr {ln}(c y_{t} / (1-c y_{t}))  \]

where the scaling factor ${c}$ is

\[  c = (1-10^{-6}) 10 ^{- \mr {ceil}( \mr {log}_{10}({max}( y_{t}) ))}  \]

and ${\mr {ceil}(x)}$ is the smallest integer greater than or equal to x.

Square root

is the square root transformation.

\[  w_{t} = \sqrt {y_{t}}  \]
Box Cox

is the Box-Cox transformation.

\[  w_{t} = \begin{cases}  \frac{y_{t}^{{\lambda }} - 1}{\lambda }, &  {\lambda } {\ne } 0 \\ \mr {ln}(y_{t}), &  {\lambda } = 0 \end{cases}  \]

More complex time series transformations can be performed by using the EXPAND procedure of SAS/ETS.