Add to ORKGRough volatility models have gained considerable interest in the quantitative finance community in recent years. In this paradigm, the volatility of the asset price is driven by a fractional Brownian motion with a small value for the Hurst parameter H. In this work, we provide a rigorous statistical analysis of these models. To do so, we establish minimax lower bounds for parameter estimation and design procedures based on wavelets attaining them. We notably obtain an optimal speed of convergence of n −1/(4H+2) for estimating H based on n sampled data, extending results known only for the easier case H > 1/2 so far. We therefore establish that the parameters of rough volatility models can be inferred with optimal accuracy in all regimes
It has been recently shown that spot volatilities can be closely modeled by rough stochastic volatil...
International audienceThe use of diffusion models driven by fractional noise has become popular for ...
We estimate the Hurst parameter H of a fractional Brownian motion from discrete noisy data observed ...
In quantitative finance, modeling the volatility structure of underlying assets is vital to pricing ...
The aim of this thesis is to provide a characterization of the statistical properties of estimator o...
We investigate the statistical evidence for the use of `rough' fractional processes with Hurst expon...
In recent years, there has been substantive empirical evidence that stochastic volatility is rough. ...
We study nonparametric estimation of the volatility function of a diffusion process from discrete da...
In this paper minimax lower bounds are derived for the estimation of the instan-taneous volatility i...
Some real-world phenomena in geo-science, micro-economy, and turbulence, to name a few, can be effec...
International audienceSome real-world phenomena in geo-science, micro-economy, and turbulence, to na...
International audienceWe estimate the Hurst parameter H of a fractional Brownian motion from discret...
We consider rough stochastic volatility models where the driving noise of volatility has fractional ...
It has been recently shown that spot volatilities can be closely modeled by rough stochastic volatil...
International audienceThe use of diffusion models driven by fractional noise has become popular for ...
We estimate the Hurst parameter H of a fractional Brownian motion from discrete noisy data observed ...
In quantitative finance, modeling the volatility structure of underlying assets is vital to pricing ...
The aim of this thesis is to provide a characterization of the statistical properties of estimator o...
We investigate the statistical evidence for the use of `rough' fractional processes with Hurst expon...
In recent years, there has been substantive empirical evidence that stochastic volatility is rough. ...
We study nonparametric estimation of the volatility function of a diffusion process from discrete da...
In this paper minimax lower bounds are derived for the estimation of the instan-taneous volatility i...
Some real-world phenomena in geo-science, micro-economy, and turbulence, to name a few, can be effec...
International audienceSome real-world phenomena in geo-science, micro-economy, and turbulence, to na...
International audienceWe estimate the Hurst parameter H of a fractional Brownian motion from discret...
We consider rough stochastic volatility models where the driving noise of volatility has fractional ...
It has been recently shown that spot volatilities can be closely modeled by rough stochastic volatil...
International audienceThe use of diffusion models driven by fractional noise has become popular for ...
We estimate the Hurst parameter H of a fractional Brownian motion from discrete noisy data observed ...