Volatility clustering

In finance, volatility clustering refers to the observation, as noted as Mandelbrot (1963), that "large changes tend to be followed by large changes, of either sign, and small changes tend to be followed by small changes."^[1] A quantitative manifestation of this fact is that, while returns themselves are uncorrelated, absolute returns $|r_{t}|$ or their squares display a positive, significant and slowly decaying autocorrelation function: corr(|r_t|, |r_t+τ |) > 0 for τ ranging from a few minutes to several weeks.

Observations of this type in financial time series have led to the use of GARCH models in financial forecasting and derivatives pricing. The ARCH (Engle, 1982) and GARCH (Bollerslev, 1986) models aim to more accurately describe the phenomenon of volatility clustering and related effects such as kurtosis. The main idea behind these two widely used models is that volatility is dependent upon past realizations of the asset process and related volatility process. This is a more precise formulation of the intuition that asset volatility tends to revert to some mean rather than remaining constant or moving in monotonic fashion over time.

References

↑ Mandelbrot, B. B., The Variation of Certain Speculative Prices, The Journal of Business 36, No. 4, (1963), 394-419

Volatility

Modelling volatility	Implied volatility Volatility smile Volatility clustering Local volatility Stochastic volatility Jump-diffusion models ARCH and GARCH

Trading volatility	Volatility arbitrage Straddle Volatility swap IVX VIX

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Volatility clustering

See also

References