Litcius/Paper detail

Modelling Radiation Cancer Treatment with a Death-Rate Term in Ordinary and Fractional Differential Equations

Nicole Wilson, Corina Drapaca, Heiko Enderling, Jimmy J. Caudell, Kathleen P. Wilkie

2023Bulletin of Mathematical Biology16 citationsDOIOpen Access PDF

Abstract

Fractional calculus has recently been applied to the mathematical modelling of tumour growth, but its use introduces complexities that may not be warranted. Mathematical modelling with differential equations is a standard approach to study and predict treatment outcomes for population-level and patient-specific responses. Here, we use patient data of radiation-treated tumours to discuss the benefits and limitations of introducing fractional derivatives into three standard models of tumour growth. The fractional derivative introduces a history-dependence into the growth function, which requires a continuous death-rate term for radiation treatment. This newly proposed radiation-induced death-rate term improves computational efficiency in both ordinary and fractional derivative models. This computational speed-up will benefit common simulation tasks such as model parameterization and the construction and running of virtual clinical trials.

Topics & Concepts

Fractional calculusTerm (time)Ordinary differential equationApplied mathematicsPopulationDifferential equationMathematicsFunction (biology)Computer scienceCalculus (dental)Mathematical optimizationMedicineMathematical analysisPhysicsBiologyEnvironmental healthEvolutionary biologyDentistryQuantum mechanicsMathematical Biology Tumor GrowthFractional Differential Equations SolutionsMathematical and Theoretical Epidemiology and Ecology Models