The existence and linear stability of periodic solution for a free boundary problem modeling tumor growth with a periodic supply of external nutrients

Abstract

We study a free boundary problem modeling tumor growth with a T-periodic supply (t) of external nutrients. The model contains two parameters μ and σ. We first show that (i) zero radially symmetric solution is globally stable if and only if σ 1T ∫0T (t) d t; (ii) If σ<1T ∫0T (t) d t, then there exists a unique radially symmetric positive solution (σ*(r, t), p*(r, t), R*(t)) with period T and it is a global attractor of all positive radially symmetric solutions for all μ>0. These results are a perfect answer to open problems in Bai and Xu [Pac. J. Appl. Math. 2013(5), 217-223]. Then, considering non-radially symmetric perturbations, we prove that there exists a constant μ>0 such that (σ*(r, t), p*(r, t), R*(t)) is linearly stable for μ<μ and linearly unstable for μ>μ.