Abstract. It is well known, mainly because of the work of Kurtz, that density dependent Markov chains can be approximated by sets of ordinary differential equations (ODEs) when their indexing parameter grows very large. This approx-imation cannot capture the stochastic nature of the process and, consequently, it can provide an erroneous view of the behavior of the Markov chain if the indexing parameter is not sufficiently high. Important phenomena that cannot be revealed include non-negligible variance and bi-modal population distributions. A less-known approximation proposed by Kurtz applies stochastic differential equations (SDEs) and provides information about the stochastic nature of the process. In this paper we apply and extend this d...
In this thesis, a class of Stochastic Petri Nets, called Local Balance Stochastic Petri Nets, and a ...
Amongst various mathematical frameworks, multidimensional continuous-time Markov jump processes (Zt ...
We present a methodology to connect an ordinary differential equation (ODE) model of interacting ent...
International audienceDensity dependent Markov chains (DDMCs) describe the interaction of groups of ...
A Fluid Stochastic Petri Net (FSPN) formalism, where there are two kind of places, one which carries...
In this work, we address the problem of transient and steady-state analysis of a stochastic Petri ne...
Stochastic Petri nets are an important formalism used for the performance evaluation of computer and...
Networks of queues with product-form equilibrium distributions are well established and have applica...
Abstract—Quantitative evaluation of models with generally distributed transitions requires the analy...
An extension of regular nets, a class of colored nets, to a stochastic model is proposed. We show th...
This paper concerns the quantitative evaluation of Stochastic Symmetric Nets (SSN) by means of a flu...
This paper concerns the quantitative evaluation of Stochastic Symmetric Nets (SSN) by means of a flu...
AbstractIn this paper we introduce a new form of approximation to diffusions represented as solution...
The rigorous linking of exact stochastic models to mean-field approximations is studied. Starting fr...
We investigate and extend two types of mathematical models, production and interacting particle mode...
In this thesis, a class of Stochastic Petri Nets, called Local Balance Stochastic Petri Nets, and a ...
Amongst various mathematical frameworks, multidimensional continuous-time Markov jump processes (Zt ...
We present a methodology to connect an ordinary differential equation (ODE) model of interacting ent...
International audienceDensity dependent Markov chains (DDMCs) describe the interaction of groups of ...
A Fluid Stochastic Petri Net (FSPN) formalism, where there are two kind of places, one which carries...
In this work, we address the problem of transient and steady-state analysis of a stochastic Petri ne...
Stochastic Petri nets are an important formalism used for the performance evaluation of computer and...
Networks of queues with product-form equilibrium distributions are well established and have applica...
Abstract—Quantitative evaluation of models with generally distributed transitions requires the analy...
An extension of regular nets, a class of colored nets, to a stochastic model is proposed. We show th...
This paper concerns the quantitative evaluation of Stochastic Symmetric Nets (SSN) by means of a flu...
This paper concerns the quantitative evaluation of Stochastic Symmetric Nets (SSN) by means of a flu...
AbstractIn this paper we introduce a new form of approximation to diffusions represented as solution...
The rigorous linking of exact stochastic models to mean-field approximations is studied. Starting fr...
We investigate and extend two types of mathematical models, production and interacting particle mode...
In this thesis, a class of Stochastic Petri Nets, called Local Balance Stochastic Petri Nets, and a ...
Amongst various mathematical frameworks, multidimensional continuous-time Markov jump processes (Zt ...
We present a methodology to connect an ordinary differential equation (ODE) model of interacting ent...