@article{Elie2020, abstract = {We consider the control of the COVID-19 pandemic through a standard SIR compartmental model. This control is induced by the aggregation of individuals’ decisions to limit their social interactions: when the epidemic is ongoing, an individual can diminish his/her contact rate in order to avoid getting infected, but this effort comes at a social cost. If each individual lowers his/her contact rate, the epidemic vanishes faster, but the effort cost may be high. A Mean Field Nash equilibrium at the population level is formed, resulting in a lower effective transmission rate of the virus. We prove theoretically that equilibrium exists and compute it numerically. However, this equilibrium selects a sub-optimal solution in comparison to the societal optimum (a centralized decision respected fully by all individuals), meaning that the cost of anarchy is strictly positive. We provide numerical examples and a sensitivity analysis, as well as an extension to a SEIR compartmental model to account for the relatively long latent phase of the COVID-19 disease. In all the scenario considered, the divergence between the individual and societal strategies happens both before the peak of the epidemic, due to individuals’ fears, and after, when a significant propagation is still underway.}, author = {Elie, Romuald and Hubert, Emma and Turinici, Gabriel}, doi = {10.1051/mmnp/2020022}, journal = {Mathematical Modelling of Natural Phenomena}, month = {jan}, pages = {35}, title = {Contact rate epidemic control of COVID-19: an equilibrium view}, url = {https://oadoi.org/10.1051/mmnp/2020022}, volume = {15}, year = {2020} }