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Markov Cohort State-Transition Model: A Multinomial Distribution Representation

Author

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  • Rowan Iskandar

    (Center of Excellence in Decision-Analytic Modeling and Health Economics Research, sitem-insel, Bern, Switzerland
    Brown University, Providence, RI, USA
    Institute of Social and Preventive Medicine, University of Bern, Switzerland)

  • Cassandra Berns

    (Center of Excellence in Decision-Analytic Modeling and Health Economics Research, sitem-insel, Bern, Switzerland
    Brown University, Providence, RI, USA)

Abstract

Markov cohort state-transition models have been the standard approach for simulating the prognosis of patients or, more generally, the life trajectories of individuals over a time period. Current approaches for estimating the variance of a Markov model using a Monte Carlo sampling or a master equation representation are computationally expensive and analytically difficult to express and solve. We introduce an alternative representation of a Markov model in the form of a multinomial distribution. We derive this representation from principles and then verify its veracity in a simulation exercise. This representation provides an exact and fast approach to computing the variance and a way of estimating transition probabilities in a Bayesian setting. Highlights A Markov model simulates the average experience of a cohort of patients. Monte Carlo simulation, the standard approach for estimating the variance, is computationally expensive. A multinomial distribution provides an exact representation of a Markov model. Using the known formulas of a multinomial distribution, the mean and variance of a Markov model can be readily calculated.

Suggested Citation

  • Rowan Iskandar & Cassandra Berns, 2023. "Markov Cohort State-Transition Model: A Multinomial Distribution Representation," Medical Decision Making, , vol. 43(1), pages 139-142, January.
  • Handle: RePEc:sae:medema:v:43:y:2023:i:1:p:139-142
    DOI: 10.1177/0272989X221112420
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