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A mathematical model for tumor growth and treatment using virotherapy

Zachary Abernathy, Kristen Abernathy, Jessica Lee Stevens

2020AIMS Mathematics27 citationsDOIOpen Access PDF

Abstract

We present a system of four nonlinear differential equations to model the use of virotherapy as a treatment for cancer. This model describes interactions among infected tumor cells, uninfected tumor cells, effector T-cells, and virions. We establish a necessary and sufficient treatment condition to ensure a globally stable cure state, and we additionally show the existence of a cancer persistence state when this condition is violated. We provide numerical evidence of a Hopf bifurcation under estimated parameter values from the literature, and we conclude with a discussion on the biological implications of our results.

Topics & Concepts

VirotherapyHopf bifurcationTumor cellsEffectorNonlinear systemPersistence (discontinuity)BifurcationMathematicsApplied mathematicsBiologyPhysicsOncolytic virusCancer researchImmunologyEngineeringGeotechnical engineeringQuantum mechanicsEvolution and Genetic DynamicsAnimal Virus Infections StudiesMathematical and Theoretical Epidemiology and Ecology Models