微观结构噪声下波动率的非参数估计:小波自适应

M. Hoffmann, A. Munk, J. Schmidt-Hieber
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引用次数: 11

摘要

研究了当数据被附加噪声模糊时,扩散过程的波动函数的非参数估计。这种噪声可以是白色的,也可以是相关的,当数据是在日内给出时,它可以作为金融建模中微观结构效应的模型。通过开发与小波阈值相结合的预平均技术,我们构建了自适应估计器,该估计器在Besov型平滑约束的大范围内实现了近乎最优的速率。由于潜在的信号(波动率)是真正随机的,我们提出了一个新的标准来评估估计的质量;当这种方法被限制在确定性波动时,我们恢复了通常的极小极大理论。
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Nonparametric Estimation of the Volatility Under Microstructure Noise: Wavelet Adaptation
We study nonparametric estimation of the volatility function of a diffusion process from discrete data, when the data are blurred by additional noise. This noise can be white or correlated, and serves as a model for microstructure effects in financial modeling, when the data are given on an intra-day scale. By developing pre-averaging techniques combined with wavelet thresholding, we construct adaptive estimators that achieve a nearly optimal rate within a large scale of smoothness constraints of Besov type. Since the underlying signal (the volatility) is genuinely random, we propose a new criterion to assess the quality of estimation; we retrieve the usual minimax theory when this approach is restricted to deterministic volatility.
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