We study asymptotic normality of the randomized periodogram estimator of quadratic variation in the mixed Brownian--fractional Brownian model. In the semimartingale case, that is, where the Hurst parameter H of the fractional part satisfies H∈(3/4,1), the central limit theorem holds. In the nonsemimartingale case, that is, where H∈(1/2,3/4], the convergence toward the normal distribution with a nonzero mean still holds if H=3/4, whereas for the other values, that is, H∈(1/2,3/4), the central convergence does not take place. We also provide Berry--Esseen estimates for the estimator
In this paper we give a central limit theorem for the weighted quadratic variation process of a two-...
Let Zt q,H t∈[0,1]d denote a d-parameter Hermite random field of order q ≥ 1 and self-simila...
We prove central and non-central limit theorems for the Hermite variations of the anisotropic fracti...
We study asymptotic normality of the randomized periodogram estimator of quadratic variation in the ...
In my talk I will discuss so-called “mixed ” models involving fractional Brownian motion and Wiener ...
Dzhaparidze and Spreij (Stoch Process Appl, 54:165–174, 1994) showed that the quadratic variation of...
International audienceIn this paper we study asymptotic behaviour of power variations of a linear co...
AbstractWe observe (Yt) at times i/n, i=0,…,n, in the parametric stochastic volatility modeldYt=Φ(θ,...
In this thesis we apply the Malliavin calculus to statistical estimation of parameters of stochastic...
The present article is devoted to a fine study of the convergence of renor-malized weighted quadrati...
The first part of this thesis studies tail probabilities forelliptical distributions and probabiliti...
In this paper almost sure convergence and asymptotic normality of generalized quadratic variation ar...
In this paper, almost sure convergence and asymptotic normality of generalized quadratic variation a...
International audienceThis paper gives a central limit theorem for the generalized quadratic variati...
We derive the asymptotic behavior of weighted quadratic variations of fractional Brownian motion B w...
In this paper we give a central limit theorem for the weighted quadratic variation process of a two-...
Let Zt q,H t∈[0,1]d denote a d-parameter Hermite random field of order q ≥ 1 and self-simila...
We prove central and non-central limit theorems for the Hermite variations of the anisotropic fracti...
We study asymptotic normality of the randomized periodogram estimator of quadratic variation in the ...
In my talk I will discuss so-called “mixed ” models involving fractional Brownian motion and Wiener ...
Dzhaparidze and Spreij (Stoch Process Appl, 54:165–174, 1994) showed that the quadratic variation of...
International audienceIn this paper we study asymptotic behaviour of power variations of a linear co...
AbstractWe observe (Yt) at times i/n, i=0,…,n, in the parametric stochastic volatility modeldYt=Φ(θ,...
In this thesis we apply the Malliavin calculus to statistical estimation of parameters of stochastic...
The present article is devoted to a fine study of the convergence of renor-malized weighted quadrati...
The first part of this thesis studies tail probabilities forelliptical distributions and probabiliti...
In this paper almost sure convergence and asymptotic normality of generalized quadratic variation ar...
In this paper, almost sure convergence and asymptotic normality of generalized quadratic variation a...
International audienceThis paper gives a central limit theorem for the generalized quadratic variati...
We derive the asymptotic behavior of weighted quadratic variations of fractional Brownian motion B w...
In this paper we give a central limit theorem for the weighted quadratic variation process of a two-...
Let Zt q,H t∈[0,1]d denote a d-parameter Hermite random field of order q ≥ 1 and self-simila...
We prove central and non-central limit theorems for the Hermite variations of the anisotropic fracti...