A mathematical analysis of a model of structured population. II (Q1928834)

This paper deals with an age-cycle length structured model of cell proliferation that includes a general biological rule defined by a boundary condition that involves a bounded linear operator \(K\) on a suitable space. The work continues and completes Part I by the same author [\textit{M. Boulanouar}, Differ. Integral Equ. 25, No.~ 9--10, 821--852 (2012; Zbl 1261.47062)] in which it was shown that the solutions to the model define a strongly continuous semigroup of operators. Under suitable assumptions of positivity and irreducibility on the boundary operator \(K\), the asymptotic behaviour of the solutions is analyzed, establishing the asynchronous exponential growth (A.E.G.)\ property for the semigroup.