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Dynamic currency hedging with non-Gaussianity and ambiguity

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  • Paweł Polak
  • Urban Ulrych

Abstract

This paper introduces a non-Gaussian dynamic currency hedging strategy for globally diversified investors with ambiguity. It provides theoretical and empirical evidence that, under the stylized fact of non-Gaussianity of financial returns and for a given optimal portfolio, the investor-specific ambiguity can be estimated from historical asset returns without the need for additional exogenous information. Acknowledging non-Gaussianity, we compute an optimal ambiguity-adjusted mean-variance (dynamic) currency allocation. Next, we propose an extended filtered historical simulation that combines Monte Carlo simulation based on volatility clustering patterns with the semi-parametric non-normal return distribution from historical data. This simulation allows us to incorporate investor's ambiguity into a dynamic currency hedging strategy algorithm that can numerically optimize an arbitrary risk measure, such as the expected shortfall. The out-of-sample backtest demonstrates that, for globally diversified investors, the derived non-Gaussian dynamic currency hedging strategy is stable, robust, and highly risk reductive. It outperforms the benchmarks of constant hedging as well as static/dynamic hedging approaches with Gaussianity in terms of lower maximum drawdown and higher Sharpe and Sortino ratios, net of transaction costs.

Suggested Citation

  • Paweł Polak & Urban Ulrych, 2024. "Dynamic currency hedging with non-Gaussianity and ambiguity," Quantitative Finance, Taylor & Francis Journals, vol. 24(2), pages 305-327, January.
  • Handle: RePEc:taf:quantf:v:24:y:2024:i:2:p:305-327
    DOI: 10.1080/14697688.2023.2301419
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