I have a question regarding the text's treatment of formula (4.1.1). It defines Y_t as depending on the previous t unobserved white noise terms. Therefore, Y_t is not an infinite series even though the author treats it as an infinite series.
In particular, formulas on page 56 take advantage of the geometric series formula 1/(1-x) = sum_{k=0}^{infinity} x^k. These sums cannot be infinite since the sum is counting down the e_k used from e_t to e_0. Shouldn't the author be using the partial sum formula
(1-r^{t+1})/(1-r) = sum_{k=0}^t r^k?
[NEAS: Module 9 discusses this topic more fully. For non-stationary time series, one needs a starting point; the textbook uses "-m". For stationary time series, we think of the series as infinite. If the time series is not very short, this is a good approximation, and it clarifies the equilibrium in the stationary time series.]