Optimal control prevents itself from eradicating stochastic disease epidemics.
The resources available for managing disease epidemics - whether in animals, plants or humans - are limited by a range of practical and financial constraints. Optimal control has been widely explored for optimising allocation of these resources to maximise their impact. The most common approach assu...
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Public Library of Science (PLoS)
2025-02-01
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| Series: | PLoS Computational Biology |
| Online Access: | https://doi.org/10.1371/journal.pcbi.1012781 |
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| author | Rachel Russell Nik J Cunniffe |
| author_facet | Rachel Russell Nik J Cunniffe |
| author_sort | Rachel Russell |
| collection | DOAJ |
| description | The resources available for managing disease epidemics - whether in animals, plants or humans - are limited by a range of practical and financial constraints. Optimal control has been widely explored for optimising allocation of these resources to maximise their impact. The most common approach assumes a deterministic, continuous model to approximate the epidemic dynamics. However, real systems are stochastic and so a range of outcomes are possible for any given epidemic situation. The deterministic models are also known to be poor approximations in cases where the number of infected hosts is low - either globally or within a subset of the population - and these cases are highly relevant in the context of control. Hence, this work explores the effectiveness of disease management strategies derived using optimal control theory when applied to a more realistic, stochastic form of disease model. We demonstrate that the deterministic optimal control solutions are not optimal in cases where the disease is eradicated or close to eradication. The range of potential outcomes in the stochastic models means that optimising the deterministic case will not reliably eradicate disease - the required rate of control is higher than the deterministic optimal control would predict. Using Model Predictive Control, in which the optimisation is performed repeatedly as the system evolves to correct for deviations from the optimal control predictions, improves performance but the level of control calculated at each repeated optimisation is still insufficient. To demonstrate this, we present several simple heuristics to allocate control resources across different locations which can outperform the strategies calculated by MPC when the control budget is sufficient for eradication. Our illustration uses examples based on simulation of the spatial spread of plant disease but similar issues would be expected in any deterministic model where infection is driven close to zero. |
| format | Article |
| id | doaj-art-0450faaf66794d04b51cac8d7d0200ef |
| institution | DOAJ |
| issn | 1553-734X 1553-7358 |
| language | English |
| publishDate | 2025-02-01 |
| publisher | Public Library of Science (PLoS) |
| record_format | Article |
| series | PLoS Computational Biology |
| spelling | doaj-art-0450faaf66794d04b51cac8d7d0200ef2025-08-20T02:56:20ZengPublic Library of Science (PLoS)PLoS Computational Biology1553-734X1553-73582025-02-01212e101278110.1371/journal.pcbi.1012781Optimal control prevents itself from eradicating stochastic disease epidemics.Rachel RussellNik J CunniffeThe resources available for managing disease epidemics - whether in animals, plants or humans - are limited by a range of practical and financial constraints. Optimal control has been widely explored for optimising allocation of these resources to maximise their impact. The most common approach assumes a deterministic, continuous model to approximate the epidemic dynamics. However, real systems are stochastic and so a range of outcomes are possible for any given epidemic situation. The deterministic models are also known to be poor approximations in cases where the number of infected hosts is low - either globally or within a subset of the population - and these cases are highly relevant in the context of control. Hence, this work explores the effectiveness of disease management strategies derived using optimal control theory when applied to a more realistic, stochastic form of disease model. We demonstrate that the deterministic optimal control solutions are not optimal in cases where the disease is eradicated or close to eradication. The range of potential outcomes in the stochastic models means that optimising the deterministic case will not reliably eradicate disease - the required rate of control is higher than the deterministic optimal control would predict. Using Model Predictive Control, in which the optimisation is performed repeatedly as the system evolves to correct for deviations from the optimal control predictions, improves performance but the level of control calculated at each repeated optimisation is still insufficient. To demonstrate this, we present several simple heuristics to allocate control resources across different locations which can outperform the strategies calculated by MPC when the control budget is sufficient for eradication. Our illustration uses examples based on simulation of the spatial spread of plant disease but similar issues would be expected in any deterministic model where infection is driven close to zero.https://doi.org/10.1371/journal.pcbi.1012781 |
| spellingShingle | Rachel Russell Nik J Cunniffe Optimal control prevents itself from eradicating stochastic disease epidemics. PLoS Computational Biology |
| title | Optimal control prevents itself from eradicating stochastic disease epidemics. |
| title_full | Optimal control prevents itself from eradicating stochastic disease epidemics. |
| title_fullStr | Optimal control prevents itself from eradicating stochastic disease epidemics. |
| title_full_unstemmed | Optimal control prevents itself from eradicating stochastic disease epidemics. |
| title_short | Optimal control prevents itself from eradicating stochastic disease epidemics. |
| title_sort | optimal control prevents itself from eradicating stochastic disease epidemics |
| url | https://doi.org/10.1371/journal.pcbi.1012781 |
| work_keys_str_mv | AT rachelrussell optimalcontrolpreventsitselffromeradicatingstochasticdiseaseepidemics AT nikjcunniffe optimalcontrolpreventsitselffromeradicatingstochasticdiseaseepidemics |