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Main Authors: Zarhali, Othmane, Aubrun, Cecilia, Bacry, Emmanuel, Bouchaud, Jean-Philippe, Muzy, Jean-François
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.02678
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author Zarhali, Othmane
Aubrun, Cecilia
Bacry, Emmanuel
Bouchaud, Jean-Philippe
Muzy, Jean-François
author_facet Zarhali, Othmane
Aubrun, Cecilia
Bacry, Emmanuel
Bouchaud, Jean-Philippe
Muzy, Jean-François
contents The Nested factor model was introduced by Chicheportiche et al. to represent non-linear correlations between stocks. Stock returns are explained by a standard factor model, but the (log)-volatilities of factors and residuals are themselves decomposed into factor modes, with a common dominant volatility mode affecting both market and sector factors but also residuals. Here, we consider the case of a single factor where the only dominant log-volatility mode is rough, with a Hurst exponent $H \simeq 0.11$ and the log-volatility residuals are ''super-rough'' or ''multifractal'', with $H \simeq 0$. We demonstrate that such a construction naturally accounts for the somewhat surprising stylized fact reported by Wu et al. , where it has been observed that the Hurst exponents of stock indexes are large compared to those of individual stocks. We propose a statistical procedure to estimate the Hurst factor exponent from the stock returns dynamics together with theoretical guarantees of its consistency. We demonstrate the effectiveness of our approach through numerical experiments and apply it to daily stock data from the S&P500 index. The estimated roughness exponents for both the factor and idiosyncratic components validate the assumptions underlying our model.
format Preprint
id arxiv_https___arxiv_org_abs_2505_02678
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Why is the volatility of single stocks so much rougher than that of the S&P500?
Zarhali, Othmane
Aubrun, Cecilia
Bacry, Emmanuel
Bouchaud, Jean-Philippe
Muzy, Jean-François
Statistical Finance
The Nested factor model was introduced by Chicheportiche et al. to represent non-linear correlations between stocks. Stock returns are explained by a standard factor model, but the (log)-volatilities of factors and residuals are themselves decomposed into factor modes, with a common dominant volatility mode affecting both market and sector factors but also residuals. Here, we consider the case of a single factor where the only dominant log-volatility mode is rough, with a Hurst exponent $H \simeq 0.11$ and the log-volatility residuals are ''super-rough'' or ''multifractal'', with $H \simeq 0$. We demonstrate that such a construction naturally accounts for the somewhat surprising stylized fact reported by Wu et al. , where it has been observed that the Hurst exponents of stock indexes are large compared to those of individual stocks. We propose a statistical procedure to estimate the Hurst factor exponent from the stock returns dynamics together with theoretical guarantees of its consistency. We demonstrate the effectiveness of our approach through numerical experiments and apply it to daily stock data from the S&P500 index. The estimated roughness exponents for both the factor and idiosyncratic components validate the assumptions underlying our model.
title Why is the volatility of single stocks so much rougher than that of the S&P500?
topic Statistical Finance
url https://arxiv.org/abs/2505.02678