A nonlinear structured population model of tumor growth with quiescence
- 1 September 1990
- journal article
- research article
- Published by Springer Nature in Journal of Mathematical Biology
- Vol. 28 (6) , 671-694
- https://doi.org/10.1007/bf00160231
Abstract
A nonlinear structured cell population model of tumor growth is considered. The model distinguishes between two types of cells within the tumor: proliferating and quiescent. Within each class the behavior of individual cells depends on cell size, whereas the probabilities of becoming quiescent and returning to the proliferative cycle are in addition controlled by total tumor size. The asymptotic behavior of solutions of the full nonlinear model, as well as some linear special cases, is investigated using spectral theory of positive simigroup of operators.Keywords
This publication has 24 references indexed in Scilit:
- A Nonlinear Model of Population Dynamics Containing an Arbitrary Number of Continuous Structure VariablesSIAM Journal on Applied Mathematics, 1988
- Age-size structure in populations with quiescenceMathematical Biosciences, 1987
- Random transitions, size control, and inheritance in cell population dynamicsMathematical Biosciences, 1987
- Asynchronous Exponential Growth in Transition Probability Models of the Cell CycleSIAM Journal on Mathematical Analysis, 1987
- Asymptotic Analysis of a Cell Cycle Model Based on Unequal DivisionSIAM Journal on Applied Mathematics, 1987
- Analysis of a cell cycle model based on unequal division of metabolic constituents to daughter cells during cytokinesisJournal of Theoretical Biology, 1984
- Theory of distributed quiescent state in the cell cycleJournal of Theoretical Biology, 1982
- The kinetics of tumour cell proliferation and radiotherapyThe British Journal of Radiology, 1971
- A Model for Population Reproducing by FissionEcology, 1971
- Cell Growth and DivisionBiophysical Journal, 1967