AbstractA new class of stochastic processes, called processes of positive bivariate type, is defined. Such a process is typically one whose bivariate density functions are positive definite, at least for pairs of time points which are sufficiently mutually close. The class includes stationary Gaussian processes and stationary reversible Markov processes, and is closed under the operations of composition and convolution. The purpose of this work is to show that the local times of such processes can be investigated in a natural way. One of the main contributions is an orthogonal expansion of the local time which is new even in the well-studied stationary Gaussian case. The basic tool in its construction is the Lancaster-Sarmanov expansion of ...
A local Holder condition is obtained for the local time of a stationary Gaussian process with spectr...
AbstractWe consider some special classes of Lévy processes with no gaussian component whose Lévy mea...
This article presents a bifurcation theory of smooth stochastic dynamical systems that are governed ...
AbstractA new class of stochastic processes, called processes of positive bivariate type, is defined...
The article contains an overview over locally stationary processes. At the beginning time varying au...
The aim of this work is to define and perform a study of local times of all Gaussian processes that ...
AbstractLet X and Y be random vectors of the same dimension such that Y has a normal distribution wi...
A readable 2006 synthesis of three main areas in the modern theory of stochastic processes
The joint distribution of X and N, where N has a geometric distribution and X is the sum of N IID ex...
The joint distribution of X and N, where N has a geometric distribution and X is the sum of N IID ex...
For a positive self-similar Markov process, X, we construct a local time for the random set, Θ, of t...
Bivariate occupation measure dimension is a new dimension for multidimensional random processes. Thi...
We present a bifurcation theory of smooth stochastic dynamical systems that are governed by everywhe...
AbstractPermanental processes can be viewed as a generalization of squared centered Gaussian process...
We investigate how the correlation properties of a stationary Markovian stochastic process affect its...
A local Holder condition is obtained for the local time of a stationary Gaussian process with spectr...
AbstractWe consider some special classes of Lévy processes with no gaussian component whose Lévy mea...
This article presents a bifurcation theory of smooth stochastic dynamical systems that are governed ...
AbstractA new class of stochastic processes, called processes of positive bivariate type, is defined...
The article contains an overview over locally stationary processes. At the beginning time varying au...
The aim of this work is to define and perform a study of local times of all Gaussian processes that ...
AbstractLet X and Y be random vectors of the same dimension such that Y has a normal distribution wi...
A readable 2006 synthesis of three main areas in the modern theory of stochastic processes
The joint distribution of X and N, where N has a geometric distribution and X is the sum of N IID ex...
The joint distribution of X and N, where N has a geometric distribution and X is the sum of N IID ex...
For a positive self-similar Markov process, X, we construct a local time for the random set, Θ, of t...
Bivariate occupation measure dimension is a new dimension for multidimensional random processes. Thi...
We present a bifurcation theory of smooth stochastic dynamical systems that are governed by everywhe...
AbstractPermanental processes can be viewed as a generalization of squared centered Gaussian process...
We investigate how the correlation properties of a stationary Markovian stochastic process affect its...
A local Holder condition is obtained for the local time of a stationary Gaussian process with spectr...
AbstractWe consider some special classes of Lévy processes with no gaussian component whose Lévy mea...
This article presents a bifurcation theory of smooth stochastic dynamical systems that are governed ...