A Model of Proliferating Cell Populations with Infinite Cell Cycle Length: Semigroup Existence

A mathematical model of cell population growth introduced by J.L. Lebowitz and S.I. Rubinow is analyzed. Individual cells are distinguished by age and cell cycle length. The cell cycle length is viewed as an inherited property determined at birth. The density of the population satisfies a first orde

This paper deals with the Leibowitz-Rubinow models of population dynamics with general birth laws and zero minimum cycle length. We give generation results in L p -spaces and investigate the spectrum and the asymptotic behavior of the corresponding c 0 -semigroup.

Analyses of cell populations that have been labeled in vivo with analogs ofthymidine that are incorporated by cells synthesizing DNA and then monitored over time by bivariate flow cytometry sometimes detect populations of cells that have S phase DNA content but that have not acquired label. Two alte