Value at risk and expected shortfall based on Gram-Charlier-like expansions

Zoia, Maria Grazia; Biffi, P.; Nicolussi, Federica

doi:10.1016/j.jbankfin.2018.06.001

Cited by 28 publications

(10 citation statements)

References 27 publications

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“…(ii) Both linear transformations and linear combinations are also Gram-Charlier distributed [34]. As a consequence, for any positive definite matrix that admits the (spectral) decomposition =…”

Section: Multivariate Gram-charlier Modelmentioning

confidence: 99%

Portfolio Risk Assessment under Dynamic (Equi)Correlation and Semi-Nonparametric Estimation: an Application to Cryptocurrencies

Jiménez¹,

Mora–Valencia²,

Ñíguez³

et al. 2020

Preprint

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The semi-nonparametric (SNP) modeling of the return distribution has been proved to be a flexible and accurate methodology for portfolio risk management that allows two-step estimation of the dynamic conditional correlation (DCC) matrix. For this SNP-DCC model, we propose a stepwise procedure to compute pairwise conditional correlations under bivariate marginal SNP distributions, overcoming the curse of dimensionality. The procedure is compared to the assumption of Dynamic Equicorrelation (DECO), which is a parsimonious model when correlations among the assets are not significantly different but requires joint estimation of the multivariate SNP model. The risk assessment of both methodologies is tested for a portfolio on cryptocurrencies by implementing backtesting techniques and for different risk measures: Value-at-Risk, Expected Shortfall and Median Shortfall. The results support our proposal showing that the SNP-DCC model has better performance for a smaller confidence level than the SNP-DECO model, although both models perform similarly for higher confidence levels.

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Section: Multivariate Gram-charlier Modelmentioning

confidence: 99%

Portfolio Risk Assessment under Dynamic (Equi)Correlation and Semi-Nonparametric Estimation: an Application to Cryptocurrencies

Jiménez¹,

Mora–Valencia²,

Ñíguez³

et al. 2020

Preprint

View full text Add to dashboard Cite

show abstract

“…Both approaches are based on the calculation of the Value at Risk (VaR), which is a commonly used measure for risk management. The VaR measures the maximum loss within a certain period of time and a given confidence level therefore the VaR does not give any information about the loss below this threshold (Chen, Wang, & Zhang, 2019;Zoia, Biffi, & Nicolussi, 2018). The Basel regulations require banks to calculate their RWAs using the VaR at a confidence level of 99.9% (Basel Committee on Banking Supervision, 2004).…”

Section: The Irb-approach Under Basel IImentioning

confidence: 99%

The Problem of Heterogeneity withinRisk Weights: Does Basel IV containthe Solution?

Binder

Lehner

2019

JOFRP

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The article uses a bank’s credit data to study the impact of the Basel IV regulations on risk weight density (RWD). The analysis of the simulated data shows mixed results, as the improvement of risk weight heterogeneity is restricted to optimistically valued portfolios. Conservatively valued portfolios are likely to be confronted with an RWD decrease. However, within these portfolios, risk weight heterogeneity usually does not play an important role. Out of all the analysed Basel IV rules, the output floor clearly has the biggest influence on risk weight density, while the effect of the input floors is very limited within optimistically valued portfolios and is even eliminated by the removal of the scaling factor within conservatively valued portfolios. The change in RWD will also lead to a concurrent change in risk-weighted assets and therefore also in the level of eligible capital. The findings within the retail portfolio confirm those of the EBA study, which already suggested that Basel IV and especially the output floor will lead to a significant increase of risk capital (European Banking Authority, 2018).

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“…The Gram-Charlier (GC) distribution studied, among others, in Corrado and Su (1996), Jondeau and Rockinger (2001, henceforth JR), Del Brio and Perote (2012), Schlögl (2013), León and Moreno (2017) and Zoia, Biffi, and Nicolussi (2018) has become popular in financial economics as a generalization of the normal distribution. The GC density is the expansion of the standard normal density based on orthogonal polynomials.…”

Section: Introductionmentioning

confidence: 99%

Polynomial adjusted Student-t densities for modeling asset returns

León

Ñíguez

2021

The European Journal of Finance

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We present a polynomial expansion of the standardized Student-t distribution. Our density, obtained through the polynomial adjusted method in Bagnato, Potí, and Zoia (2015. "The Role of Orthogonal Polynomials in Adjusting Hyperbolic Secant and Logistic Distributions to Analyse Financial Asset Returns." Statistical Papers 56 (4): 1205-12340), is an extension of the Gram-Charlier density in Jondeau and Rockinger (2001. "Gram-Charlier Densities." Journal of Economic Dynamics and Control 25 ( 10): 1457-1483). We derive the closed-form expressions of the moments, the distribution function and the skewness-kurtosis frontier for a well-defined density. An empirical application is also implemented for modeling heavy-tailed and skewed distributions for daily asset returns. Both in-sample and backtesting analysis show that this new density can be a good candidate for risk management.

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Value at risk and expected shortfall based on Gram-Charlier-like expansions

Cited by 28 publications

References 27 publications

Portfolio Risk Assessment under Dynamic (Equi)Correlation and Semi-Nonparametric Estimation: an Application to Cryptocurrencies

Portfolio Risk Assessment under Dynamic (Equi)Correlation and Semi-Nonparametric Estimation: an Application to Cryptocurrencies

The Problem of Heterogeneity withinRisk Weights: Does Basel IV containthe Solution?

Polynomial adjusted Student-t densities for modeling asset returns

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