AbstractA stochastic process on a finite-dimensional real vector space is operator-self-similar if a linear time change produces a new process whose distributions scale back to those of the original process, where we allow scaling by a family of affine linear operators. We prove a spectral decomposition theorem for these processes, and for processes with these scaling limits. This decomposition reduces the study of these processes to the case where the growth behavior over time is essentially uniform in all radial directions
Self-similar processes are useful models for natural systems that exhibit scaling. Operator scaling ...
Let $\mathbf{X}=(\mathbf{X}_t)_{t \geq 0}$ be a stochastic process issued from $x \in \mathbb R$ tha...
This dissertation consists of four parts. The aim of the first part is to present original transform...
AbstractA stochastic process on a finite-dimensional real vector space is operator-self-similar if a...
AbstractIn this work, a general representation for an operator self-similar Gaussian vector field is...
Operator self-similar (OSS) stochastic processes on arbitrary Banach spaces are considered. If the f...
Operator self-similar (OSS) stochastic processes on arbitrary Banach spaces are consid-ered. If the ...
AbstractMultivariate random fields whose distributions are invariant under operator-scalings in both...
AbstractJeanblanc et al. (Stochastic Process. Appl. 100 (2002) 223) give a representation of self-si...
AbstractThe characteristic feature of operator selfsimilar stochastic processes is that a linear res...
AbstractOperator self similar stochastic processes taking values in a finite dimensional Euclidean s...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
AbstractUsing bivariate Lévy processes, stationary and self-similar processes, with prescribed one-d...
We start by providing an explicit characterization and analytical properties, including the persiste...
Operator fractional Brownian motions (OFBMs) are (i) Gaussian, (ii) operator self-similar and (iii) ...
Self-similar processes are useful models for natural systems that exhibit scaling. Operator scaling ...
Let $\mathbf{X}=(\mathbf{X}_t)_{t \geq 0}$ be a stochastic process issued from $x \in \mathbb R$ tha...
This dissertation consists of four parts. The aim of the first part is to present original transform...
AbstractA stochastic process on a finite-dimensional real vector space is operator-self-similar if a...
AbstractIn this work, a general representation for an operator self-similar Gaussian vector field is...
Operator self-similar (OSS) stochastic processes on arbitrary Banach spaces are considered. If the f...
Operator self-similar (OSS) stochastic processes on arbitrary Banach spaces are consid-ered. If the ...
AbstractMultivariate random fields whose distributions are invariant under operator-scalings in both...
AbstractJeanblanc et al. (Stochastic Process. Appl. 100 (2002) 223) give a representation of self-si...
AbstractThe characteristic feature of operator selfsimilar stochastic processes is that a linear res...
AbstractOperator self similar stochastic processes taking values in a finite dimensional Euclidean s...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
AbstractUsing bivariate Lévy processes, stationary and self-similar processes, with prescribed one-d...
We start by providing an explicit characterization and analytical properties, including the persiste...
Operator fractional Brownian motions (OFBMs) are (i) Gaussian, (ii) operator self-similar and (iii) ...
Self-similar processes are useful models for natural systems that exhibit scaling. Operator scaling ...
Let $\mathbf{X}=(\mathbf{X}_t)_{t \geq 0}$ be a stochastic process issued from $x \in \mathbb R$ tha...
This dissertation consists of four parts. The aim of the first part is to present original transform...