In this paper we carry over the concept of reverse probabilistic representations developed in Milstein, Schoenmakers, Spokoiny (2004) for diffusion processes, to discrete time Markov chains. We outline the construction of reverse chains in several situations and apply this to processes which are connected with jump-diffusion models and finite state Markov chains. By combining forward and reverse representations we then construct transition density estimators for chains which have root-N accuracy in any dimension and consider some applications
In many stochastic models a Markov chain is present either directly or indirectly through some form ...
AbstractThe paper considers a diffusion evolving in Rn. The stochastic differential equations giving...
We present a sequential Monte Carlo algorithm for Markov chain trajectories with proposals construct...
In this paper we carry over the concept of reverse probabilistic representations developed in Milste...
In this paper we carry over the concept of reverse probabilistic representations developed in Milste...
AbstractIn this paper we carry over the concept of reverse probabilistic representations developed i...
The general reverse diffusion equations are derived. They are applied to the problem of transition d...
The general reverse diffusion equations are derived and applied to the problem of transition density...
We develop an EM algorithm for estimating parameters that determine the dynamics of a discrete time ...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
Abstract. In this paper we derive stochastic representations for the finite dimensional distribution...
The estimation of probability densities of variables described by systems of stochastic dierential e...
We develop a forward-reverse expectation-maximization (FREM) algorithm for estimating parameters of ...
AbstractReverse-time stochastic diffusion equation models are defined and it is shown how most proce...
In many stochastic models a Markov chain is present either directly or indirectly through some form ...
AbstractThe paper considers a diffusion evolving in Rn. The stochastic differential equations giving...
We present a sequential Monte Carlo algorithm for Markov chain trajectories with proposals construct...
In this paper we carry over the concept of reverse probabilistic representations developed in Milste...
In this paper we carry over the concept of reverse probabilistic representations developed in Milste...
AbstractIn this paper we carry over the concept of reverse probabilistic representations developed i...
The general reverse diffusion equations are derived. They are applied to the problem of transition d...
The general reverse diffusion equations are derived and applied to the problem of transition density...
We develop an EM algorithm for estimating parameters that determine the dynamics of a discrete time ...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
Abstract. In this paper we derive stochastic representations for the finite dimensional distribution...
The estimation of probability densities of variables described by systems of stochastic dierential e...
We develop a forward-reverse expectation-maximization (FREM) algorithm for estimating parameters of ...
AbstractReverse-time stochastic diffusion equation models are defined and it is shown how most proce...
In many stochastic models a Markov chain is present either directly or indirectly through some form ...
AbstractThe paper considers a diffusion evolving in Rn. The stochastic differential equations giving...
We present a sequential Monte Carlo algorithm for Markov chain trajectories with proposals construct...