Long-memory processes are an important and even fundamental advance in time-series modeling. More precisely, the so-called autoregressive fractionally integrated moving average (ARFIMA) model has been introduced by Granger and Joyeux (1980) and Hosking (1981). It is a generalization of the ARIMA model, which is a short memory process, by allowing the differencing parameter d to take any real value. The goal of this specification is to capture parsimoniously long-run multipliers that decay very slowly, which amounts to modeling long memories in a time series. ARFIMA processes, however, are associated with hyperbolically decaying autocorrelations, impulse response weights, and spectral density function exploding at zero frequency. As noted by Brockwell et al. (1998), while a long memory process can always be approximated by an ARMA(p, q) process, the orders p and q required to achieve a good approximation may be so large as to make parameter estimation extremely difficult. In any case, this approximation is not possible with small samples.