Carcinogenesis, as every biological process, is not purely deterministic as all systems are subject to random perturbations from the environment. In tumor growth models, the values of the parameters are subjected to many uncertainties that can arise from experimental variations or due to patient-specific data. The present work is devoted to the development and analysis of numerical methods for the solution of a system of stochastic partial differential equations governing a six-species tumor growth model. The model system simulates the stochastic behavior of cellular and macrocellular events affecting the evolution of avascular cancerous tissue. It is a continuous phase-field model that incorporates several key features in tumor dynamics. A sensitivity analysis is performed to identify the more influential parameters. A mixed finite element method and a stochastic collocation scheme are introduced to approximate random-variables components of the solution. The results of numerous numerical experiments are also presented and discussed.

• 出版日期2015-3