differencestationarity

Differencestationarity, or difference stationarity, is a property of a time series in econometrics and statistics describing that the series becomes stationary after differencing a finite number of times. In the common case, a process is difference-stationary if it is integrated of order one, I(1): its first difference ΔX_t = X_t − X_{t−1} is stationary. This suggests that the nonstationarity is driven by a stochastic trend, such as a random walk with drift, rather than by a deterministic pattern.

A formal representation often used is that an I(1) series can be written as X_t = X_{t−1} +

Tests and modeling implications are central in practice. Unit root tests, such as the Dickey–Fuller and Augmented

Examples include macroeconomic levels like GDP, often I(1), whose first differences (growth rates) are typically stationary.