On an Unbounded Linear Operator Arising in the Theory of Growing Cell Population

This paper deals with Rotenberg's models of cell populations with general boundary conditions. It is shown, ÿrst, that the associated Cauchy problem is governed by a C 0 -semigroup. Second, we have proved that if the boundary operator is positive, the transport semigroup is irreducible. And ÿnally,

## Abstract In this paper we establish some results regarding the existence of solution on __L__~1~ spaces to a nonlinear boundary value problem originally proposed by Lebowitz and Rubinow (__J. Math. Biol.__ 1974; **1**:17–36) to model an age‐structured proliferating cell population. Our approach,

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.

## Abstract A simple theory is developed for the extension of a uniformly charged linear polyion attached at one end in an electric field. For a polyion consisting of a very large number (__N__) of Kuhn lengths (__b__), the mean extension in the direction of the electric field (__E__) is given accu