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A stein type lemma for the multivariate generalized hyperbolic distribution

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  • Vanduffel, Steven
  • Yao, Jing

Abstract

When two variables are bivariate normally distributed, Stein’s (1973, 1981) seminal lemma provides a convenient expression for the covariance of the first variable with a function of the second. The lemma has proven to be useful in various disciplines, including statistics, probability, decision theory and finance. In finance, however, asset returns do not always display symmetry but may exhibit skewness. This observation led Adcock (2007, 2010, 2014) to develop Stein’s type lemmas for certain multivariate distributions that are consistent with Simaan’s (1987, 1993) setting for asset returns. In this paper, we depart from Simaan’s setting and develop a new Stein’s type lemma in the setting of a mean–variance mixture model for returns. As a particular application, we show that expected utility maximizers select portfolios that are mean–variance–skewness efficient.

Suggested Citation

  • Vanduffel, Steven & Yao, Jing, 2017. "A stein type lemma for the multivariate generalized hyperbolic distribution," European Journal of Operational Research, Elsevier, vol. 261(2), pages 606-612.
    • Handle: RePEc:eee:ejores:v:261:y:2017:i:2:p:606-612
    DOI: 10.1016/j.ejor.2017.03.008
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    3. Wang, Chou-Wen & Liu, Kai & Li, Bin & Tan, Ken Seng, 2022. "Portfolio optimization under multivariate affine generalized hyperbolic distributions," International Review of Economics & Finance, Elsevier, vol. 80(C), pages 49-66.

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