52 pages, 3 figures, minor typos fixedEigenproblems frequently arise in theory and applications of stochastic processes, but only a few have explicit solutions. Those which do, are usually solved by reduction to the generalized Sturm--Liouville theory for differential operators. This includes the Brownian motion and a whole class of processes, which derive from it by means of linear transformations. The more general eigenproblem for the {\em fractional} Brownian motion (f.B.m.) is not solvable in closed form, but the exact asymptotics of its eigenvalues and eigenfunctions can be obtained, using a method based on analytic properties of the Laplace transform. In this paper we consider two processes closely related to the f.B.m.: the fractiona...
In the present paper, the Karhunen-Loève eigenvalues for a subfractional Brownian motion are conside...
In this paper we develop the spectral theory of the fractional Brownian motion (fBm) using the ideas...
Fractional Brownian motion is a nontrivial generalization of standard Brownian motion (Wie- ner proc...
Eigenproblems frequently arise in theory and applications of stochastic processes, but only a few ha...
We introduce a class of stochastic differential equations driven by fractional Brownian motion which...
The Lamperti transformation of a self-similar process is a stationary process. In particular, the fr...
In this monograph, we are mainly studying Gaussian processes, in particularly three different types ...
Abstract The classical stationary Ornstein-Uhlenbeck process can be obtained in two different ways. ...
In the present paper, the Karhunen–Loève eigenvalues for a sub-fractional Brownian motion are consid...
We investigate the general problem of estimating the translation of a stochastic process governed by...
This article focuses on simulating fractional Brownian motion (fBm). Despite the availability of sev...
The Lamperti transformation of a self-similar process is a strictly stationary process. In particula...
The Lamperti transformation of a self-similar process is a stationary process. In particular, the fr...
We study stationary processes given as solutions to stochastic differential equations driven by frac...
to appear in Theory of Probability and its ApplicationsThis paper addresses the problem of estimatin...
In the present paper, the Karhunen-Loève eigenvalues for a subfractional Brownian motion are conside...
In this paper we develop the spectral theory of the fractional Brownian motion (fBm) using the ideas...
Fractional Brownian motion is a nontrivial generalization of standard Brownian motion (Wie- ner proc...
Eigenproblems frequently arise in theory and applications of stochastic processes, but only a few ha...
We introduce a class of stochastic differential equations driven by fractional Brownian motion which...
The Lamperti transformation of a self-similar process is a stationary process. In particular, the fr...
In this monograph, we are mainly studying Gaussian processes, in particularly three different types ...
Abstract The classical stationary Ornstein-Uhlenbeck process can be obtained in two different ways. ...
In the present paper, the Karhunen–Loève eigenvalues for a sub-fractional Brownian motion are consid...
We investigate the general problem of estimating the translation of a stochastic process governed by...
This article focuses on simulating fractional Brownian motion (fBm). Despite the availability of sev...
The Lamperti transformation of a self-similar process is a strictly stationary process. In particula...
The Lamperti transformation of a self-similar process is a stationary process. In particular, the fr...
We study stationary processes given as solutions to stochastic differential equations driven by frac...
to appear in Theory of Probability and its ApplicationsThis paper addresses the problem of estimatin...
In the present paper, the Karhunen-Loève eigenvalues for a subfractional Brownian motion are conside...
In this paper we develop the spectral theory of the fractional Brownian motion (fBm) using the ideas...
Fractional Brownian motion is a nontrivial generalization of standard Brownian motion (Wie- ner proc...