Add to ORKGWe consider forward rate rate models of Heath-Jarrow-Morton type, as well as more general infinite dimensional SDEs, where the volatility/diffusion term is stochastic in the sense of being driven by a separate hidden Markov process. Within this framework we use the previously developed Hilbert space realization theory in order provide general necessary and sufficent conditions for the existence of a finite dimensional Markovian realizations for the stochastic volatility models. We illustrate the theory by analyzing a number of concrete examples
© 2016 Elsevier B.V. For a wide class of continuous-time Markov processes evolving on an open, conne...
The present thesis deals with the theory of finite dimensional stochastic equations.In the first par...
In this paper we study various properties of finite stochastic systems or hidden Markov chains as th...
This paper studies Heath-Jarrow-Morton-type models with regime-switching stochastic volatility. In t...
In this paper we study a fairly general Wiener driven model for the term structure of forward prices...
Suppose m is a positive integer, and let M: = {1,...,m}. Suppose {Yt} is a sta-tionary stochastic pr...
Abstract. In this paper we derive stochastic representations for the finite dimensional distribution...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
In this paper, we define stochastic volatility operators in Hilbert space which are analogs to the w...
In this paper, we define stochastic volatility operators in Hilbert space which are analogs to the w...
In this paper, we define stochastic volatility operators in Hilbert space which are analogs to the w...
This thesis examines finite dimensional representability of Forward Rate andLIBOR models. A new appr...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
This thesis introduces a new method of constructing analytically tractable (solvable) one-dimensiona...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
© 2016 Elsevier B.V. For a wide class of continuous-time Markov processes evolving on an open, conne...
The present thesis deals with the theory of finite dimensional stochastic equations.In the first par...
In this paper we study various properties of finite stochastic systems or hidden Markov chains as th...
This paper studies Heath-Jarrow-Morton-type models with regime-switching stochastic volatility. In t...
In this paper we study a fairly general Wiener driven model for the term structure of forward prices...
Suppose m is a positive integer, and let M: = {1,...,m}. Suppose {Yt} is a sta-tionary stochastic pr...
Abstract. In this paper we derive stochastic representations for the finite dimensional distribution...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
In this paper, we define stochastic volatility operators in Hilbert space which are analogs to the w...
In this paper, we define stochastic volatility operators in Hilbert space which are analogs to the w...
In this paper, we define stochastic volatility operators in Hilbert space which are analogs to the w...
This thesis examines finite dimensional representability of Forward Rate andLIBOR models. A new appr...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
This thesis introduces a new method of constructing analytically tractable (solvable) one-dimensiona...
In this paper we derive stochastic representations for the finite dimensional distributions of a mul...
© 2016 Elsevier B.V. For a wide class of continuous-time Markov processes evolving on an open, conne...
The present thesis deals with the theory of finite dimensional stochastic equations.In the first par...
In this paper we study various properties of finite stochastic systems or hidden Markov chains as th...