论文信息 - An Imprecise Probabilistic Estimator for the Transition Rate Matrix of a Continuous-Time Markov Chain

An Imprecise Probabilistic Estimator for the Transition Rate Matrix of a Continuous-Time Markov Chain

We consider the problem of estimating the transition rate matrix of a continuous-time Markov chain from a finite-duration realisation of this process. We approach this problem in an imprecise probabilistic framework, using a set of prior distributions on the unknown transition rate matrix. The resulting estimator is a set of transition rate matrices that, for reasons of conjugacy, is easy to find. To determine the hyperparameters for our set of priors, we reconsider the problem in discrete time, where we can use the well-known Imprecise Dirichlet Model. In particular, we show how the limit of the resulting discrete-time estimators is a continuous-time estimator. It corresponds to a specific choice of hyperparameters and has an exceptionally simple closed-form expression.

Jasper De Bock | Alexander Erreygers | Thomas E. Krak

[1] Yasunari Inamura. Estimating Continuous Time Transition Matrices From Discretely Observed Data , 2006 .

[2] Jasper De Bock. The Limit Behaviour of Imprecise Continuous-Time Markov Chains , 2016, J. Nonlinear Sci..

[3] Damjan Škulj,et al. Efficient computation of the bounds of continuous time imprecise Markov chains , 2015, Appl. Math. Comput..

[4] M. Bladt,et al. Statistical inference for discretely observed Markov jump processes , 2005 .

[5] Jasper De Bock,et al. Imprecise Continuous-Time Markov Chains: Efficient Computational Methods with Guaranteed Error Bounds , 2017, ISIPTA.

[6] Ward Whitt,et al. An Introduction to Stochastic-Process Limits and their Application to Queues , 2002 .

[7] P. Walley. Statistical Reasoning with Imprecise Probabilities , 1990 .

[8] Gert de Cooman,et al. Imprecise probability models for inference in exponential families , 2005, ISIPTA.

[9] Erik Quaeghebeur,et al. Learning from samples using coherent lower previsions , 2009 .

[10] Arno Siebes,et al. Imprecise continuous-time Markov chains , 2016, Int. J. Approx. Reason..

[11] J. Berger. Statistical Decision Theory and Bayesian Analysis , 1988 .

[12] Gert de Cooman,et al. Coherent Predictive Inference under Exchangeability with Imprecise Probabilities , 2015, J. Artif. Intell. Res..

[13] P. Walley. Inferences from Multinomial Data: Learning About a Bag of Marbles , 1996 .