How Often to Sample a Continuous-Time Process in the Presence of Market Microstructure Noise

How Often to Sample a Continuous-Time Process in the Presence of Market Microstructure Noise

In theory, the sum of squares of log returns sampled at high frequency estimates their variance. When market microstructure noise is present but unaccounted for, however, we show that the optimal sampling frequency is finite and derives its closed-form expression. But even with optimal sampling, usi...

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Veröffentlicht in:The Review of financial studies 2005-07, Vol.18 (2), p.351-416
Hauptverfasser: Aït-Sahalia, Yacine, Mykland, Per A., Zhang, Lan
Format: Artikel
Sprache:eng
Schlagworte:
Data analysis
Econometrics
Economic models
Estimators
Expected values
Finance
High frequencies
Information retrieval noise
Market
Market prices
Market structure
Mathematical expressions
Maximum likelihood estimation
Noise
Price efficiency
Samples
Sampling
Securities markets
Signal noise
Statistical analysis
Statistical variance
Statistics
Studies
Time series
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Beschreibung
Zusammenfassung:In theory, the sum of squares of log returns sampled at high frequency estimates their variance. When market microstructure noise is present but unaccounted for, however, we show that the optimal sampling frequency is finite and derives its closed-form expression. But even with optimal sampling, using say 5-min returns when transactions are recorded every second, a vast amount of data is discarded, in contradiction to basic statistical principles. We demonstrate that modeling the noise and using all the data is a better solution, even if one misspecifies the noise distribution. So the answer is: sample as often as possible.
ISSN:0893-9454
1465-7368
DOI:10.1093/rfs/hhi016