Tail dependence of random variables from ARCH and heavy-tailed bilinear models 被引量：5

Tail dependence of random variables from ARCH and heavy-tailed bilinear models

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摘要 Discussed in this paper is the dependent structure in the tails of distributions of random variables from some heavy-tailed stationary nonlinear time series. One class of models discussed is the first-order autoregressive conditional heteroscedastic (ARCH) process introduced by Engle (1982). The other class is the simple first-order bilinear models driven by heavy-tailed innovations. We give some explicit formulas for the asymptotic values of conditional probabilities used for measuring the tail dependence between two random variables from these models. Our results have significant meanings in finance. Discussed in this paper is the dependent structure in the tails of distributions of random variables from some heavy-tailed stationary nonlinear time series. One class of models discussed is the first-order autoregressive conditional heteroscedastic (ARCH) process introduced by Engle (1982). The other class is the simple first-order bilinear models driven by heavy-tailed innovations. We give some explicit formulas for the asymptotic values of conditional probabilities used for measuring the tail dependence between two random variables from these models. Our results have significant meanings in finance.

作者潘家柱

出处《Science China Mathematics》 SCIE 2002年第6期749-760,共12页 中国科学：数学（英文版）

基金 This work was supported by the National Natural Science Foundation of China (Grant No. 10071003) partially supported by a cooperative project from Yunnan Province.

关键词 ARCH BILINEAR model dependence TAIL probability. ARCH bilinear model dependence tail probability

分类号 O211 [理学—概率论与数理统计]

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参考文献9

1Harry Kesten.Random difference equations and Renewal theory for products of random matrices[J].Acta Mathematica.1973(1)
2Hill,B.A simple approach to inference about the tail of a distribution, Ann[].Statistica.1975
3Breiman,L.On some limit theorems similar to the arc-sin law, Theory Probab[].Appliance.1965
4Pan Jiazhu.How does innovation’s tail determine marginal tail of a stationary time series? Research Report No[]..2001
5Engle,R.Autoregressive conditional heteroscedastic models with estimates of the variance of United Kingdom inflation[].Econometrica.1982
6Resnick,S.Heavy tail modeling and teletraffic data, Ann[].Statistica.1997
7Hsing,T.On tail estimation using dependent data, Ann[].Statistica.1991
8Goldie,C. M.Implicit renewal theory and tails of solutions of random equations, Ann.Appl[].Probab.1991
9Vervaat,W.On a stochastic difference equation and a representation of nonnegative infinitely divisible random variables, Adv.Appl[].Probab.1979

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1曲永刚.我国股市价格波动和稳定性分析[J].辽宁石油化工大学学报,2005,25(1):89-92. 被引量：6
2徐剑刚,唐国兴.我国股票市场报酬与波动的GARCH-M模型[J].数量经济技术经济研究,1995,12(12):28-32. 被引量：32
3王军,李英慧.动态盈亏平衡分析[J].辽宁石油化工大学学报,2005,25(4):94-97. 被引量：11
4Jiazhu Pan.Tail dependence of random variables from ARCH and heavy-tailed bilinear models[J].Science in China Series A: Mathematics.2002(6)
5Harry Kesten.Random difference equations and Renewal theory for products of random matrices[J].Acta Mathematica.1973(1)
6Goldie,C. M.Implicit renewal theory and tails of solutions of random equations, Ann[].Appl Probab.1991
7Vervaat,W.On a stochastic difference equation and a representation of nonnegative infinitely divisible random variables, Adv.Appl[].Probab.1979
8Resnick,S.Extreme Values, Regular Variation, and Point Processes[]..1987
9Kallenberg,O. Random measures . 1983
10Resnick S,Willekens E.Moving averages with random coefficient autoregressive models[].Stochastic Models.1990

引证文献5

1YU Bosco W. T.,PANG W. K..How does innovation's tail risk determine marginal tail risk of a stationary financial time series?[J].Science China Mathematics,2004,47(3):321-338. 被引量：7
2潘家柱,李国栋,谢衷洁.Stationary solution and parametric estimation for Bilinear model driven by ARCH noises[J].Science China Mathematics,2002,45(12):1523-1537.
3耿贵珍,佟毅.GARCH模型的相依性[J].辽宁石油化工大学学报,2007,27(3):93-95. 被引量：4
4张志强,冯井艳.变系数ARCH模型绝对值序列的强大数定律[J].应用概率统计,2009,25(3):275-280.
5ZHANG Zhi-qiang ZHANG Ri-quan FENG Jing-yan.Complete Convergence for Partial Sums of the Squares of ARCH Sequence[J].Chinese Quarterly Journal of Mathematics,2010,25(4):601-606.

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1JIN Yang & AN Hongzhi School of Statistics, Renmin University of China, Beijing 100872, China,Academy of Mathematics and Systems Science, Chinese Academy of Sciences, Beijing 100080, China.Nonlinear autoregressive models with heavy-tailed innovation[J].Science China Mathematics,2005,48(3):333-340. 被引量：2
2PAN Jiazhu WU Guangxu.On tail behavior of nonlinear autoregressive functional conditional heteroscedastic model with heavy-tailed innovations[J].Science China Mathematics,2005,48(9):1169-1181. 被引量：1
3金阳,安鸿志.带有重尾扰动项的非线性自回归模型[J].中国科学（A辑）,2005,35(1):39-45. 被引量：5
4潘家柱,吴光旭.带厚尾新息的非线性自回归函数型条件异方差模型的尾概率[J].中国科学（A辑）,2005,35(5):481-492. 被引量：2
5柳会珍.统计极值理论及其应用研究进展[J].统计与决策,2006,22(16):150-153. 被引量：9
6柳会珍,顾岚.股票收益率波动和极值关系研究[J].统计研究,2006,23(10):68-71. 被引量：7
7柳会珍,顾岚.股票收益率和新息的尾部估计(英文)[J].数学进展,2008,37(1):25-30.
8谢丽红,宋岱才.一类流行病模型的后向分支——带接种疫苗的两病毒模型[J].石油化工高等学校学报,2008,21(1):96-99. 被引量：3
9李金秋.二项分布高阶原点矩的一种简便算法[J].辽宁石油化工大学学报,2008,28(1):89-91. 被引量：9
10么彩莲,王涛.ARCH类模型及其在上证指数收益波动中的应用[J].辽宁石油化工大学学报,2009,29(3):89-92. 被引量：2

1张和平.COMPARISON OF LINEAR MODELS[J].Chinese Science Bulletin,1987,32(19):1365-1366.
2Deng-Yuan Huang,Ren-Fen Lee.Ranking Independent Variables in Linear Models[J].Journal of Mathematics and System Science,2013,3(2):89-95.
3HUANG Dan-jun,WANG Wei-fan.Class Ⅰ graphs of nonnegative characteristic without special cycles[J].Applied Mathematics(A Journal of Chinese Universities),2012,27(3):320-328.
4Zhiyan Yang, Tao Jiang (School of Information, Beijing Wuzi University, Beijing 101149).SAME DISTRIBUTION OF LIMIT CYCLES TO PERTURBED CUBIC HAMILTONIAN SYSTEMS WITH DIFFERENT PERTURBATIONS[J].Annals of Differential Equations,2011,27(2):241-247.
5朱复康,王德辉.Median Unbiased Estimation of Bivariate Predictive Regression Models with Heavy-tailed or Heteroscedastic Errors[J].Northeastern Mathematical Journal,2007,23(3):263-271.
6王松桂.COMPARISON OF LINEAR MODELS ON AN ESTIMABLE SUBSPACE[J].Chinese Science Bulletin,1984,29(12):1570-1574.
7HU MingLiang1 & TIAN DongPing2 1 School of Science,Xi’an Jiaotong University,Xi’an 710049,China,2 Xi’an Institute of Posts and Telecommunications,Xi’an 710061,China.Effects of impurity on the entanglement of the three-qubit Heisenberg XXX spin chain[J].Science China(Physics,Mechanics & Astronomy),2007,50(2):208-214. 被引量：5
8Guo Wenjun, Liu Jianye, Xing Yongzhong, Zyi Wei and Li Xiguo.Isospin Influence of Colliding System on Nucleon Emissions in Intermediate Energy Heavy Ion Collisions[J].IMP & HIRFL Annual Report,2001(1):8-8.
9刘艳,胡亦钧.Large deviations for heavy-tailed random sums of independent random variables with dominatedly varying tails[J].Science China Mathematics,2003,46(3):383-395. 被引量：11
10王兴华.Convergence of the iteration of Halley's family and Smale operator class in Banach space[J].Science China Mathematics,1998,41(7):700-709. 被引量：3

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Tail dependence of random variables from ARCH and heavy-tailed bilinear models 被引量：5

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