TY - GEN
T1 - Return intervals approach to financial fluctuations
AU - Wang, Fengzhong
AU - Yamasaki, Kazuko
AU - Havlin, Shlomo
AU - Stanley, H. Eugene
PY - 2009
Y1 - 2009
N2 - Financial fluctuations play a key role for financial markets studies. A new approach focusing on properties of return intervals can help to get better understanding of the fluctuations. A return interval is defined as the time between two successive volatilities above a given threshold. We review recent studies and analyze the 1000 most traded stocks in the US stock markets. We find that the distribution of the return intervals has a well approximated scaling over a wide range of thresholds. The scaling is also valid for various time windows from one minute up to one trading day. Moreover, these results are universal for stocks of different countries, commodities, interest rates as well as currencies. Further analysis shows some systematic deviations from a scaling law, which are due to the nonlinear correlations in the volatility sequence. We also examine the memory in return intervals for different time scales, which are related to the long-term correlations in the volatility. Furthermore, we test two popular models, FIGARCH and fractional Brownian motion (fBm). Both models can catch the memory effect but only fBm shows a good scaling in the return interval distribution.
AB - Financial fluctuations play a key role for financial markets studies. A new approach focusing on properties of return intervals can help to get better understanding of the fluctuations. A return interval is defined as the time between two successive volatilities above a given threshold. We review recent studies and analyze the 1000 most traded stocks in the US stock markets. We find that the distribution of the return intervals has a well approximated scaling over a wide range of thresholds. The scaling is also valid for various time windows from one minute up to one trading day. Moreover, these results are universal for stocks of different countries, commodities, interest rates as well as currencies. Further analysis shows some systematic deviations from a scaling law, which are due to the nonlinear correlations in the volatility sequence. We also examine the memory in return intervals for different time scales, which are related to the long-term correlations in the volatility. Furthermore, we test two popular models, FIGARCH and fractional Brownian motion (fBm). Both models can catch the memory effect but only fBm shows a good scaling in the return interval distribution.
KW - Econophysics
KW - Financial marekts
KW - Long-term correlation
KW - Return interval
KW - Scaling
KW - Volatility
UR - http://www.scopus.com/inward/record.url?scp=84885889804&partnerID=8YFLogxK
U2 - 10.1007/978-3-642-02466-5_1
DO - 10.1007/978-3-642-02466-5_1
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AN - SCOPUS:84885889804
SN - 3642024653
SN - 9783642024658
T3 - Lecture Notes of the Institute for Computer Sciences, Social-Informatics and Telecommunications Engineering
SP - 3
EP - 27
BT - Complex Sciences - First International Conference, Complex 2009, Revised Papers
T2 - 1st International Conference on Complex Sciences: Theory and Applications, Complex 2009
Y2 - 23 February 2009 through 25 February 2009
ER -