This paper proposes saddlepoint expansions as a means to generate closed-form approximations to the transition densities and cumulative distribution functions of Markov processes. This method is applicable to a large class of models considered in finance, for which a Laplace or characteristic functions, but not the transition density, can be found in closed form. But even when such a computation is not possible explicitly, we go one step further by showing how useful approximations can be obtained by replacing the Laplace or characteristic functions by an expansion in small time. (c) 2005 Elsevier B.V. All rights reserved
AbstractLabelled Markov processes are probabilistic versions of labelled transition systems. In gene...
We extend known saddlepoint tail probability approximations to multivariate cases, including multiva...
Let X=(Xt)t>=0 be a Lévy process with absolutely continuous Lévy measure [nu]. Small-time expansions...
We present update formulas that allow us to express the stationary distribution of a continuous-time...
Ich schreibe nicht, euch zu gefallen, Ihr sollt was lernen! – Goethe Markov processes in physics, c...
In this paper, we propose an approach for approximating the value function and an ϵ-optimal policy o...
We consider a simple and widely used method for evaluating quasi-stationary distributions of continu...
It is well-known that the saddlepoint approximation can give a quite accurate approximation for the ...
Abstract Computing the stationary distributions of a continuous-time Markov chain (CTMC) involves s...
We consider a simple and widely used method for evaluating quasistationary distributions of continuo...
This thesis introduces a new method of constructing analytically tractable (solvable) one-dimensiona...
Abstract. We consider the convergence of a continuous-time Markov chain approximation Xh, h> 0, t...
Asymptotic residue expansions are proposed for inverting probability generating functions (PGFs) and...
International audienceWe propose new bounds and approximations for the transition probabilities of a...
We introduce, and analyze in terms of convergence rates of transition kernels, a continuous-time Mar...
AbstractLabelled Markov processes are probabilistic versions of labelled transition systems. In gene...
We extend known saddlepoint tail probability approximations to multivariate cases, including multiva...
Let X=(Xt)t>=0 be a Lévy process with absolutely continuous Lévy measure [nu]. Small-time expansions...
We present update formulas that allow us to express the stationary distribution of a continuous-time...
Ich schreibe nicht, euch zu gefallen, Ihr sollt was lernen! – Goethe Markov processes in physics, c...
In this paper, we propose an approach for approximating the value function and an ϵ-optimal policy o...
We consider a simple and widely used method for evaluating quasi-stationary distributions of continu...
It is well-known that the saddlepoint approximation can give a quite accurate approximation for the ...
Abstract Computing the stationary distributions of a continuous-time Markov chain (CTMC) involves s...
We consider a simple and widely used method for evaluating quasistationary distributions of continuo...
This thesis introduces a new method of constructing analytically tractable (solvable) one-dimensiona...
Abstract. We consider the convergence of a continuous-time Markov chain approximation Xh, h> 0, t...
Asymptotic residue expansions are proposed for inverting probability generating functions (PGFs) and...
International audienceWe propose new bounds and approximations for the transition probabilities of a...
We introduce, and analyze in terms of convergence rates of transition kernels, a continuous-time Mar...
AbstractLabelled Markov processes are probabilistic versions of labelled transition systems. In gene...
We extend known saddlepoint tail probability approximations to multivariate cases, including multiva...
Let X=(Xt)t>=0 be a Lévy process with absolutely continuous Lévy measure [nu]. Small-time expansions...