Abstract
This paper develops an approach based on Gram–Charlier-like expansions for modeling financial series to take in due account features such as leptokurtosis. A Gram–Charlier-like expansion adjusts the moments of interest of a given distribution via its own orthogonal polynomials. This approach, formerly adopted for univariate series, is here extended to a multivariate context by means of spherical densities. Previous works proposed the Gram–Charlier of the multivariate Gaussian, obtained by using Hermite polynomials. This work shows how polynomial expansions of an entire class of spherical laws can be worked out with the aim of obtaining a wide set of leptokurtic multivariate distributions. A Gram–Charlier-like expansion is a distribution characterized by an additional parameter with respect to the parent spherical law. This parameter, which measures the increase in kurtosis due to the polynomial expansion, can be estimated so as to make the resulting distribution capable of describing the empirical kurtosis found in the data. An application of the Gram–Charlier-like expansions to a set of financial assets proves their effectiveness in modeling multivariate financial series and assessing risk measures, such as the value at risk and the expected shortfall.
Highlights
There are plenty of examples in the literature on the non-normality of asset returns and its implications for pricing and measuring financial risk
We have evaluated the capability of the Gram–Charlier-Like Expansion (GCLE) to fit financial series
We extend the Gram–Charlier-Like Expansion (GCLE) based approach to modify the kurtosis of multivariate distributions
Summary
There are plenty of examples in the literature on the non-normality of asset returns and its implications for pricing and measuring financial risk. In this paper, we propose the polynomial expansion of spherical variables with the Mardia kurtosis index (Mardia 1970) higher than that of the multivariate Gaussian law This approach allows us to obtain a class of multivariate leptokurtic distributions with a resulting kurtosis range that is capable of covering the kurtosis empirically found in multivariate financial data. The contribution of this paper is twofold It shows how spherical variables can be built for the the power-raised hyperbolic-secant density family, which, besides the Gaussian, includes leptokurtic distributions like the logistic and the hyperbolic-secant law (see Engel et al 2010; Faliva and Zoia 2017; Vaughan 2002).
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