Add to ORKGThe Wiener process is the classical example of a mathematical model for Brownian movement. Wiener viewed Brownian movement essentially as a random walk: a Brownian particle\u27s position at time t equals the sum of displacements over successive time intervals that partition [0, t]. This is a guideline to the definition of integrator. We can reverse the point of view and ask the following question: Under which (minimal) conditions is the process retrievable from its increments? ^ We present a construction (a blueprint) that is based on the application of multidimensional measure theory. This construction is extendible to processes indexed by n parameters.
The purpose of this work is to state the Donsker's invariance principle which is about the relation ...
Let us consider a continuous time Markov additive process with cadlag paths and a sequence of ran...
Using the Wiener–Hopf factorization, it is shown that it is possible to bound the path of an arbitra...
The Wiener process is the classical example of a mathematical model for Brownian movement. Wiener vi...
The Wiener process is the classical example of a mathematical model for Brownian movement. Wiener vi...
In this article, we generalize Wiener\u27s existence result for one-dimensional Brownian motion by c...
In this paper we will investigate the connection between a random walk and a continuous time stochas...
In this paper we will investigate the connection between a random walk and a continuous time stochas...
The Brownian motion with multi-dimensional time parameter introduced by Paul Lévy can be viewed as a...
International audienceAbstract The recent study by De Bruyne et al (2021 J. Stat. Mech. 123204), con...
We introduce a domain-theoretic framework for continuous-time, continuous-state stochastic processes...
The paper discusses techniques for analysis of sequential data from variable processes, particularly...
International audienceDiscretization of continuous time autoregressive (AR) processes driven by a Br...
Abstract. A Brownian time process is a Markov process subordinated to the absolute value of an indep...
International audienceDiscretization of continuous time autoregressive (AR) processes driven by a Br...
The purpose of this work is to state the Donsker's invariance principle which is about the relation ...
Let us consider a continuous time Markov additive process with cadlag paths and a sequence of ran...
Using the Wiener–Hopf factorization, it is shown that it is possible to bound the path of an arbitra...
The Wiener process is the classical example of a mathematical model for Brownian movement. Wiener vi...
The Wiener process is the classical example of a mathematical model for Brownian movement. Wiener vi...
In this article, we generalize Wiener\u27s existence result for one-dimensional Brownian motion by c...
In this paper we will investigate the connection between a random walk and a continuous time stochas...
In this paper we will investigate the connection between a random walk and a continuous time stochas...
The Brownian motion with multi-dimensional time parameter introduced by Paul Lévy can be viewed as a...
International audienceAbstract The recent study by De Bruyne et al (2021 J. Stat. Mech. 123204), con...
We introduce a domain-theoretic framework for continuous-time, continuous-state stochastic processes...
The paper discusses techniques for analysis of sequential data from variable processes, particularly...
International audienceDiscretization of continuous time autoregressive (AR) processes driven by a Br...
Abstract. A Brownian time process is a Markov process subordinated to the absolute value of an indep...
International audienceDiscretization of continuous time autoregressive (AR) processes driven by a Br...
The purpose of this work is to state the Donsker's invariance principle which is about the relation ...
Let us consider a continuous time Markov additive process with cadlag paths and a sequence of ran...
Using the Wiener–Hopf factorization, it is shown that it is possible to bound the path of an arbitra...