Mathématiques > Accueil > Avancées en Mathématiques Pures et Appliquées > Numéro 2 (Spécial CSMT 2023) > Article
Slah Eddin Ben Abdeljalil
University Tunis EL Manar
Tunisia
Atef Ben Essid
University Tunis EL Manar
Tunisia
Saloua Mani Aouadi
University Tunis EL Manar
Tunisia
Publié le 7 mars 2024 DOI : 10.21494/ISTE.OP.2024.1099
In this paper, we conduct a mathematical analysis of a tumor growth model with treatments. The model consists of a system that describes the evolution of metastatic tumors and the number of cells present in the primary tumor. The former evolution is described by a transport equation, and the latter by an ordinary differential equation of Gompertzian type. The two dynamics are coupled through a nonlocal boundary condition that takes into account the tumor colonization rate. We prove an existence result where the main difficulty is to handle the coupling and to take into account the time discontinuities generated by treatment terms. The proof is based on a Banach fixed point theorem in a suitable functional space. We also develop a computational code based on the method of characteristics and present numerical tests that highlight the effects of different therapies.
In this paper, we conduct a mathematical analysis of a tumor growth model with treatments. The model consists of a system that describes the evolution of metastatic tumors and the number of cells present in the primary tumor. The former evolution is described by a transport equation, and the latter by an ordinary differential equation of Gompertzian type. The two dynamics are coupled through a nonlocal boundary condition that takes into account the tumor colonization rate. We prove an existence result where the main difficulty is to handle the coupling and to take into account the time discontinuities generated by treatment terms. The proof is based on a Banach fixed point theorem in a suitable functional space. We also develop a computational code based on the method of characteristics and present numerical tests that highlight the effects of different therapies.
Ordinary differential equations Partial differential equations Discontinuous data Tumor growth
Ordinary differential equations Partial differential equations Discontinuous data Tumor growth