AbstractIn this paper, we establish functional convergence theorems for second order quadratic variations of Gaussian processes which admit a singularity function. First, we prove a functional almost sure convergence theorem, and a functional central limit theorem, for the process of second order quadratic variations, and we illustrate these results with the example of the fractional Brownian sheet (FBS). Second, we do the same study for the process of localized second order quadratic variations, and we apply the results to the multifractional Brownian motion (MBM)
In this paper, by using a Fourier analytic approach, we investigate sample path properties of the f...
The relationship between quadratic variation for compound renewal processes and M-Wright functions i...
Gaussian process, fractional Brownian motion, multifractional Brownian motion, Hölder regularity, po...
AbstractIn this paper, we establish functional convergence theorems for second order quadratic varia...
In this paper, almost sure convergence and asymptotic normality of generalized quadratic variation a...
In the paper a weighted quadratic variation based on a sequence of partitions for a class of Gaussia...
In this paper almost sure convergence and asymptotic normality of generalized quadratic variation ar...
We are interested in the functional convergence in distribution of the process of quadratic variatio...
We prove functional central and non-central limit theorems for generalized variations of the anisotr...
AbstractWe study the uniform convergence of the quadratic variation of Gaussian processes, taken ove...
We prove a general functional limit theorem for multiparameterfractional Brownian motion. The functi...
In this paper we give a central limit theorem for the weighted quadratic variation process of a two-...
The paper establishes weak convergence in C [ 0 , 1 ] of normalized stochastic processes, generated ...
We prove a functional limit theorem for vector-valued functionals of the fractional Ornstein-Uhlenbe...
AbstractWe study the problem of a.s. convergence of the quadratic variation of Brownian motion. We p...
In this paper, by using a Fourier analytic approach, we investigate sample path properties of the f...
The relationship between quadratic variation for compound renewal processes and M-Wright functions i...
Gaussian process, fractional Brownian motion, multifractional Brownian motion, Hölder regularity, po...
AbstractIn this paper, we establish functional convergence theorems for second order quadratic varia...
In this paper, almost sure convergence and asymptotic normality of generalized quadratic variation a...
In the paper a weighted quadratic variation based on a sequence of partitions for a class of Gaussia...
In this paper almost sure convergence and asymptotic normality of generalized quadratic variation ar...
We are interested in the functional convergence in distribution of the process of quadratic variatio...
We prove functional central and non-central limit theorems for generalized variations of the anisotr...
AbstractWe study the uniform convergence of the quadratic variation of Gaussian processes, taken ove...
We prove a general functional limit theorem for multiparameterfractional Brownian motion. The functi...
In this paper we give a central limit theorem for the weighted quadratic variation process of a two-...
The paper establishes weak convergence in C [ 0 , 1 ] of normalized stochastic processes, generated ...
We prove a functional limit theorem for vector-valued functionals of the fractional Ornstein-Uhlenbe...
AbstractWe study the problem of a.s. convergence of the quadratic variation of Brownian motion. We p...
In this paper, by using a Fourier analytic approach, we investigate sample path properties of the f...
The relationship between quadratic variation for compound renewal processes and M-Wright functions i...
Gaussian process, fractional Brownian motion, multifractional Brownian motion, Hölder regularity, po...