Suppose I have two time series {x} and {y} and want to examine how the current realization of {y} is dependent on current and past realizations of {x} and past realizations of {y}. For this purpose, I could run a VAR(p)-model including *p* lags of {x} and {y}. However, I want to assume that {x} is exogenous, so I guess it would be better to run an ARIMAX-model, i.e. an ARIMA-model with one or several exogenous variables.

In order to estimate an ARIMAX-model in R, I can either use the function *arimax()* (https://www.rdocumentation.org/packages/TSA/versions/1.01/topics/arimax) from the package **TSA** or *auto.arima()* (https://www.rdocumentation.org/packages/forecast/versions/8.1/topics/auto.arima) from **forecast** that both allow to include exogenous variables (it's specified with the argument xreg)

I’m however wondering why it is not possible to define lags of the exogenous variables? Or are there any (theoretical) reasons why we shouldn’t estimate an ARIMAX model including lags of exogenous variables? I know that it is possible with an **A**utoregressive **D**istributed **L**ag model, so basically an AR-model with exogenous variables.