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Optimal Turnover, Liquidity, and Autocorrelation

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  • Bastien Baldacci
  • Jerome Benveniste
  • Gordon Ritter

Abstract

The steady-state turnover of a trading strategy is of clear interest to practitioners and portfolio managers, as is the steady-state Sharpe ratio. In this article, we show that in a convenient Gaussian process model, the steady-state turnover can be computed explicitly, and obeys a clear relation to the liquidity of the asset and to the autocorrelation of the alpha forecast signals. Indeed, we find that steady-state optimal turnover is given by $\gamma \sqrt{n+1}$ where $\gamma$ is a liquidity-adjusted notion of risk-aversion, and $n$ is the ratio of mean-reversion speed to $\gamma$.

Suggested Citation

  • Bastien Baldacci & Jerome Benveniste & Gordon Ritter, 2021. "Optimal Turnover, Liquidity, and Autocorrelation," Papers 2110.03810, arXiv.org, revised Jan 2022.
  • Handle: RePEc:arx:papers:2110.03810
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    File URL: http://arxiv.org/pdf/2110.03810
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    1. Bastien Baldacci & Jerome Benveniste, 2020. "A note on Almgren-Chriss optimal execution problem with geometric Brownian motion," Papers 2006.11426, arXiv.org, revised Jun 2020.
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