Moment bounds and mean squared prediction errors of long-memory time series

Ngai Hang Chan, Shih Feng Huang, Ching Kang Ing

Research output: Contribution to journalArticlepeer-review

7 Scopus citations

Abstract

A moment bound for the normalized conditional-sum-of-squares (CSS) estimate of a general autoregressive fractionally integrated moving average (ARFIMA) model with an arbitrary unknown memory parameter is derived in this paper. To achieve this goal, a uniform moment bound for the inverse of the normalized objective function is established. An important application of these results is to establish asymptotic expressions for the one-step and multi-step mean squared prediction errors (MSPE) of the CSS predictor. These asymptotic expressions not only explicitly demonstrate how the multistep MSPE of the CSS predictor manifests with the model complexity and the dependent structure, but also offer means to compare the performance of the CSS predictor with the least squares (LS) predictor for integrated autoregressive models. It turns out that the CSS predictor can gain substantial advantage over the LS predictor when the integration order is high. Numerical findings are also conducted to illustrate the theoretical results.

Original languageEnglish
Pages (from-to)1268-1298
Number of pages31
JournalAnnals of Statistics
Volume41
Issue number3
DOIs
StatePublished - Jun 2013

Keywords

  • ARFIMA model
  • Integrated AR model
  • Long-memory time series
  • Mean squared prediction error
  • Moment bound
  • Multi-step prediction

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