Superkurtosis

Degiannakis, Stavros and Filis, George and Siourounis, Grigorios and Trapani, Lorenzo (2019): Superkurtosis.

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Abstract

Risk metrics users assume that the moments of asset returns exist, irrespectively of the trading frequency, hence the observed values of these moments are used to capture the potential losses from asset trading (e.g. with Value-at-Risk (VaR) or Expected Shortfall (ES) calculations). Despite the fact that the behavior of traditional risk metrics is well-examined for high frequency data (e.g. at daily intervals), very little is known on how these metrics behave under Ultra-High Frequency Trading (UHFT). We fill this void by firstly examining the existence of the daily and intraday returns moments, and subsequently by assessing the impact of their (non)existence in a risk management framework. We find that the third and fourth moments of the distribution of asset returns do not exist. We next use both real and simulated data to show that, when daily trading is implemented, VaR or ES deliver estimates in line with what the theory predicts. We show, however, that when UHFT is considered, assuming finite higher order moments, potential losses are much bigger than what the theory predicts, and they increase exponentially as the trading frequency increases. We argue that two possible explanations affect potential loses; first, the exponential increase in the sample data points at UHFT; second, the fact that the data, which are sampled from a heavy-tailed distribution, tend to have higher sample moments than the theory suggests - we call this phenomenon superkurtosis. Our findings entail that traditional risk metrics are unable to properly judge capital adequacy. Hence, the use of risk management techniques such as VaR or ES, by market participants who engage with UHFT, impose serious threats to the stability of financial markets, given that capital ratios may be severely underestimated.

Item Type:	MPRA Paper
Original Title:	Superkurtosis
Language:	English
Keywords:	Ultra high frequency trading, risk management, finite moments, superkurtosis.
Subjects:	C - Mathematical and Quantitative Methods > C1 - Econometric and Statistical Methods and Methodology: General > C12 - Hypothesis Testing: General C - Mathematical and Quantitative Methods > C5 - Econometric Modeling > C54 - Quantitative Policy Modeling F - International Economics > F3 - International Finance > F30 - General F - International Economics > F3 - International Finance > F31 - Foreign Exchange G - Financial Economics > G1 - General Financial Markets > G10 - General G - Financial Economics > G1 - General Financial Markets > G15 - International Financial Markets G - Financial Economics > G1 - General Financial Markets > G17 - Financial Forecasting and Simulation
Item ID:	101876
Depositing User:	George Filis
Date Deposited:	22 Jul 2020 07:18
Last Modified:	22 Jul 2020 07:18
References:	Beddington, J., Furse, C., Bond, P., Cliff, D., Goodhart, C., Houstoun, K., & Zigrand, J. P. (2012). Foresight: the future of computer trading in financial markets: final project report. Bradley, B. O., & Taqqu, M. S. (2003). Financial risk and heavy tails. In Handbook of heavy tailed distributions in finance (pp. 35-103). North-Holland. Horváth, L., & Trapani, L. (2016). Statistical inference in a random coefficient panel model. Journal of econometrics, 193(1), 54-75. Kirilenko, A., Kyle, A. S., Samadi, M., & Tuzun, T. (2017). The flash crash: High‐frequency trading in an electronic market. The Journal of Finance, 72(3), 967-998. Kirilenko, A. A., & Lo, A. W. (2013). Moore's law versus murphy's law: Algorithmic trading and its discontents. Journal of Economic Perspectives, 27(2), 51-72. Trapani, L. (2016). Testing for (in) finite moments. Journal of Econometrics, 191(1), 57-68. Yadav, Y. (2015). How algorithmic trading undermines efficiency in capital markets. Vanderbilt Law Review, 68, 1607.
URI:	https://mpra.ub.uni-muenchen.de/id/eprint/101876

Available Versions of this Item

• Superkurtosis. (deposited 24 Oct 2019 09:14)
  • Superkurtosis. (deposited 22 Jul 2020 07:18) [Currently Displayed]
    • Superkurtosis. (deposited 09 Nov 2021 11:54)
      • Superkurtosis. (deposited 09 Nov 2021 14:09)