Symmetry-breaking bifurcation of periodic solutions for a free-boundary tumor model

Abstract

In this paper, we consider a free boundary multi-layer tumor model that incorporates a T-periodic provision of external nutrients (t). The simplified model contains three parameters: the mean of periodic external nutrients (t), the threshold concentration σ for proliferation and the cell to cell adhesiveness coefficient γ. We first study the flat solution and give a complete classification about 1T ∫0T (t) d t and σ according to global stability of zero equilibrium solution or global stability of the positive periodic solution. Precisely, (i) a zero flat solution is globally stable under the flat perturbations if and only if σ ≥slant 1T ∫0T (t) d t; (ii) If σ<1T ∫0T (t) d t, then there exists a unique positive flat solution (σ*(y, t), p*(y, t), *(t)) with period T and it is a global attractor of all positive flat solutions for all γ>0. We further investigate periodic solutions bifurcating from the flat periodic solution (σ*(y, t), p*(y, t), *(t)). By periodicity and symmetry, we not only give symmetry-breaking periodic solutions for all positive parameter γj, but also show the existence of a plethora of periodic bifurcations. For the free boundary tumor problem, this is the first result of the existence of periodic bifurcations.