Finding the probability that a stochastic system stays in a certain region of its state space over a specified time-a long-standing problem both in computational physics and in applied and theoretical mathematics-is approached through the extended and multivariate Rice formula. In principle, it applies to any smooth process multivariate both in argument and in value given that efficient numerical implementations of the high-dimensional integration are available. The computational method offers an exact integral representation yielding remarkably accurate results and provides an alternative method of computing persistency probability and exponent for a physical system. It can be viewed as an implementation of path integration for a smooth Ga...
The finite state Markov-Chain approximation method developed by Tauchen (1986) and Tauchen and Husse...
Gaussian processes and random fields have a long history, covering multiple approaches to representi...
International audienceWe study the persistence probability for processes with stationary increments....
Finding the probability that a stochastic system stays in a certain region of its state space over a...
This work is to popularize the method of computing the distribution of the excursion times for a Gau...
International audienceIn this paper we consider the persistence properties of random processes in Br...
We describe and compare how methods based on the classical Rice’s formula for the expected number, a...
We study the persistence probability for some discrete-time, time-reversible processes. In particula...
In this thesis, the persistence problem in the context of Markov chains is studied. We are mainly co...
We propose a systematic method to derive the asymptotic behaviour of the persistence distribution, f...
We study the distribution of residence time or equivalently that of "mean magnetization" for a famil...
A Gaussian stationary sequence is a random function f: Z --\u3e R, for which any vector (f(x_1), ......
A form of time series path integral expansion is provided that enables both analytic and numerical t...
AbstractIn this article, the problem of the number of spikes (level crossings) of the stationary nar...
A stochastic process or sometimes called random process is the counterpart to a deterministic proces...
The finite state Markov-Chain approximation method developed by Tauchen (1986) and Tauchen and Husse...
Gaussian processes and random fields have a long history, covering multiple approaches to representi...
International audienceWe study the persistence probability for processes with stationary increments....
Finding the probability that a stochastic system stays in a certain region of its state space over a...
This work is to popularize the method of computing the distribution of the excursion times for a Gau...
International audienceIn this paper we consider the persistence properties of random processes in Br...
We describe and compare how methods based on the classical Rice’s formula for the expected number, a...
We study the persistence probability for some discrete-time, time-reversible processes. In particula...
In this thesis, the persistence problem in the context of Markov chains is studied. We are mainly co...
We propose a systematic method to derive the asymptotic behaviour of the persistence distribution, f...
We study the distribution of residence time or equivalently that of "mean magnetization" for a famil...
A Gaussian stationary sequence is a random function f: Z --\u3e R, for which any vector (f(x_1), ......
A form of time series path integral expansion is provided that enables both analytic and numerical t...
AbstractIn this article, the problem of the number of spikes (level crossings) of the stationary nar...
A stochastic process or sometimes called random process is the counterpart to a deterministic proces...
The finite state Markov-Chain approximation method developed by Tauchen (1986) and Tauchen and Husse...
Gaussian processes and random fields have a long history, covering multiple approaches to representi...
International audienceWe study the persistence probability for processes with stationary increments....