CROBEX的重尾建模

D. Grahovac, N. Šuvak
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引用次数: 1

摘要

经典的对数收益连续时间模型通常假定其独立性和分布正态性。然而,目前人们普遍认为,对数收益的经验性质往往表现出特定的相关结构和偏离正态性,在大多数情况下表明它们的分布是重尾的。因此,我们提出了一个替代的连续时间loggreturns模型,这是一个具有student ' s边际分布和指数衰减自相关结构的扩散过程。该模型依赖于几个需要估计的未知参数。采用基于经验标度函数的方法估计尾指数,采用矩量法估计描述均值、方差和相关结构的参数。该模型应用于CROBEX股票市场指数,即参数的估计是基于CROBEX对数收益。模型的质量是通过模拟来评估的,通过比较CROBEX对数回报和模拟轨迹的学生的扩散取决于估计的参数值。
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Heavy-tailed modeling of CROBEX
Classical continuous-time models for log-returns usually assume their independence and normality of distribution. However, nowadays it is widely accepted that the empirical properties of log-returns often show a specific correlation structure and deviation from normality, in most cases suggesting that their distribution is heavy-tailed. Therefore we suggest an alternative continuous-time model for logreturns, a diffusion process with Student’s marginal distributions and exponentially decaying autocorrelation structure. This model depends on several unknown parameters that need to be estimated. The tail index is estimated by the method based on the empirical scaling function, while the parameters describing mean, variance and correlation structure are estimated by the method of moments. The model is applied to the CROBEX stock market index, meaning that the estimation of parameters is based on the CROBEX log-returns. The quality of the model is assessed by means of simulations, by comparing CROBEX log-returns with the simulated trajectories of Student’s diffusion depending on estimated parameter values.
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