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Line 1: In [[finance]], '''~~Volatility~~volatility ~~Clustering~~clustering''' ~~Volatility~~refers ~~clustering:~~to asthe observation, first noted by [[Benoît Mandelbrot\|Mandelbrot]] (1963), ~~“large~~that "large changes tend to be followed by large changes, of either sign, and small changes tend to be followed by small changes.”"<ref>Mandelbrot, B. B., [https://www.jstor.org/stable/2351623 The Variation of Certain Speculative Prices], The Journal of Business 36, No. 4, (1963), 394-419</ref> A quantitative manifestation of this fact is that, while returns themselves are uncorrelated, absolute returns <math>\|rtr_{t}\|</math> or their squares display a positive, significant and slowly decaying autocorrelation function: corr(\|rtr{{sub\|t}}\|, \|rtr{{sub\|t+τ}} \|) > 0 for τ ranging from a few minutes to a several weeks. This empirical property has been documented in the 90's by [[Clive Granger\|Granger]] and Ding (1993)<ref>Granger, C.W. J., Ding, Z. [https://www.jstor.org/stable/20076016 Some Properties of Absolute Return: An Alternative Measure of Risk ], Annales d'Économie et de Statistique, No. 40 (Oct. - Dec., 1995), pp. 67-91</ref> and Ding and [[Clive Granger\|Granger]] (1996)<ref>Ding, Z., Granger, C.W.J. [https://doi.org/10.1016/0304-4076(95)01737-2 Modeling volatility persistence of speculative returns: A new approach], Journal of Econometrics), 1996, vol. 73, issue 1, 185-215</ref> among others; see also.<ref>{{cite conference\|last1=Cont\|first1=Rama\|date=2007\|editor1-last=Teyssière\|editor1-first=Gilles\|editor2-last=Kirman\|editor2-first=Alan\|title=Volatility Clustering in Financial Markets: Empirical Facts and Agent-Based Models\|publisher=Springer\|pages=289–309\|doi=10.1007/978-3-540-34625-8_10\|book-title=Long Memory in Economics}}</ref> Some studies point further to long-range dependence in volatility time series, see Ding, Granger and [[Robert F. Engle\|Engle]] (1993)<ref>Zhuanxin Ding, Clive W.J. Granger, Robert F. Engle (1993) [https://doi.org/10.1016/0927-5398(93)90006-D A long memory property of stock market returns and a new model], Journal of Empirical Finance, Volume 1, Issue 1, 1993, Pages 83-106</ref> and Barndorff-Nielsen and Shephard.<ref>{{cite encyclopedia \|author= Ole E. Barndorff-Nielsen, Neil Shephard\|chapter= Volatility\|encyclopedia= Encyclopedia of Quantitative Finance\|date= October 2010 \|publisher= Wiley\|editor-last= Cont\|editor-first=Rama \|doi=10.1002/9780470061602.eqf19019 \|isbn= 9780470057568}} </ref> Observations of this type in financial time series go against simple random walk models and have led to the use of [[GARCH]] models and mean-reverting [[stochastic volatility]] models in financial forecasting and [[Derivative (finance)\|derivatives]] pricing. The [[ARCH]] ([[Robert F. Engle\|Engle]], 1982) and GARCH ([[Tim Bollerslev\|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 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 (finance)\|volatility]] tends to revert to some mean rather than remaining constant or moving in [[monotonic]] fashion over time. ==See also== [[GARCH]] [[Stochastic volatility]] ==References== [[Category:Derivatives]]▼ {{Reflist}} ~~[[Category:Stock market]]~~ {{Volatility}} {{DEFAULTSORT:Volatility Clustering}} ▲[[Category:Derivatives (finance)]] [[Category:Technical analysis]] {{~~econ~~Econ-stub}}