Limitations on intermittent forecasting

Gusztáv Morvai; Benjamin Weiss

doi:10.1016/j.spl.2004.12.016

Limitations on intermittent forecasting

Gusztáv Morvai^*, Benjamin Weiss

^*Corresponding author for this work

Einstein Institute of Mathematics

Research output: Contribution to journal › Article › peer-review

13 Scopus citations

Abstract

Bailey showed that the general pointwise forecasting for stationary and ergodic time series has a negative solution. However, it is known that for Markov chains the problem can be solved. Morvai showed that there is a stopping time sequence {λ_n} such that P(X_λn+1 = 1 X₀,..., X_λn) can be estimated from samples (X₀,..., X_λn) such that the difference between the conditional probability and the estimate vanishes along these stoppping times for all stationary and ergodic binary time series. We will show it is not possible to estimate the above conditional probability along a stopping time sequence for all stationary and ergodic binary time series in a pointwise sense such that if the time series turns out to be a Markov chain, the predictor will predict eventually for all n.

Original language	English
Pages (from-to)	285-290
Number of pages	6
Journal	Statistics and Probability Letters
Volume	72
Issue number	4
DOIs	https://doi.org/10.1016/j.spl.2004.12.016
State	Published - 15 May 2005

Keywords

Finite-order Markov chains
Nonparametric estimation
Prediction theory
Stationary and ergodic processes

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AB - Bailey showed that the general pointwise forecasting for stationary and ergodic time series has a negative solution. However, it is known that for Markov chains the problem can be solved. Morvai showed that there is a stopping time sequence {λn} such that P(Xλn+1 = 1 X0,..., Xλn) can be estimated from samples (X0,..., Xλn) such that the difference between the conditional probability and the estimate vanishes along these stoppping times for all stationary and ergodic binary time series. We will show it is not possible to estimate the above conditional probability along a stopping time sequence for all stationary and ergodic binary time series in a pointwise sense such that if the time series turns out to be a Markov chain, the predictor will predict eventually for all n.

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KW - Nonparametric estimation

KW - Prediction theory

KW - Stationary and ergodic processes

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Limitations on intermittent forecasting

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