STATISTICAL INFERENCE FOR ROUGH VOLATILITY: MINIMAX THEORY
成果类型:
Article
署名作者:
Chong, Carsten H.; Hoffmann, Marc; Liu, Yanghui; Rosenbaum, Mathieu; Szymansky, Gregoire
署名单位:
Hong Kong University of Science & Technology; Universite PSL; Universite Paris-Dauphine; City University of New York (CUNY) System; Baruch College (CUNY); Institut Polytechnique de Paris; Ecole Polytechnique
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/23-AOS2343
发表日期:
2024
页码:
1277-1306
关键词:
stochastic volatility
schemes
noise
摘要:
In recent years, rough volatility models have gained considerable attention in quantitative finance. In this paradigm, the stochastic volatility of the price of an asset has quantitative properties similar to that of a fractional Brownian motion with small Hurst index H < 1/2. In this work, we provide the first rigorous statistical analysis of the problem of estimating H from historical observations of the underlying asset. We establish minimax lower bounds and design optimal procedures based on adaptive estimation of quadratic functionals based on wavelets. We prove in particular that the optimal rate of convergence for estimating H based on price observations at n time points is of order n(-1/(4H + 2)) as n grows to infinity, extending results that were known only for H > 1/2. Our study positively answers the question whether H can be inferred, although it is the regularity of a latent process (the volatility); in rough models, when H is close to 0, we even obtain an accuracy comparable to usual root n-consistent regular statistical models.