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Bibliographic Details
Main Authors: Angstmann, Christopher N., McGann, Anna V., Xu, Zhuang
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2406.17242
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author Angstmann, Christopher N.
McGann, Anna V.
Xu, Zhuang
author_facet Angstmann, Christopher N.
McGann, Anna V.
Xu, Zhuang
contents Compartment models with delay terms are widely used across a range of disciplines. The motivation to include delay terms varies across different contexts. In epidemiological and pharmacokinetic models, the delays are often used to represent an incubation period. In this work, we derive a compartment model with delay terms from an underlying non-Markov stochastic process. Delay terms arise when waiting times are drawn from a delay exponential distribution. This stochastic process approach allows us to preserve the physicality of the model, gaining understanding into the conditions under which delay terms can arise. By providing the conditions under which the delay exponential function is a probability distribution, we establish a critical value for the delay terms. An exact stochastic simulation method is introduced for the generalized model, enabling us to utilize the simulation in scenarios where intrinsic stochasticity is significant, such as when the population size is small. We illustrate the applications of the model and validate our simulation algorithm on examples drawn from epidemiology and pharmacokinetics.
format Preprint
id arxiv_https___arxiv_org_abs_2406_17242
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Delay compartment models from a stochastic process
Angstmann, Christopher N.
McGann, Anna V.
Xu, Zhuang
Dynamical Systems
33E30, 34K99, 60K15, 92C45, 92D30
Compartment models with delay terms are widely used across a range of disciplines. The motivation to include delay terms varies across different contexts. In epidemiological and pharmacokinetic models, the delays are often used to represent an incubation period. In this work, we derive a compartment model with delay terms from an underlying non-Markov stochastic process. Delay terms arise when waiting times are drawn from a delay exponential distribution. This stochastic process approach allows us to preserve the physicality of the model, gaining understanding into the conditions under which delay terms can arise. By providing the conditions under which the delay exponential function is a probability distribution, we establish a critical value for the delay terms. An exact stochastic simulation method is introduced for the generalized model, enabling us to utilize the simulation in scenarios where intrinsic stochasticity is significant, such as when the population size is small. We illustrate the applications of the model and validate our simulation algorithm on examples drawn from epidemiology and pharmacokinetics.
title Delay compartment models from a stochastic process
topic Dynamical Systems
33E30, 34K99, 60K15, 92C45, 92D30
url https://arxiv.org/abs/2406.17242