TY - JOUR
T1 - Game theory of tumor–stroma interactions in multiple myeloma
T2 - Effect of nonlinear benefits
AU - Sartakhti, Javad Salimi
AU - Manshaei, Mohammad Hossein
AU - Archetti, Marco
N1 - Funding Information:
Author Contributions: J.S.S., M.H.M. and M.A. conceived and designed the analysis; J.S.S. and M.A. performed the analysis with contributions from M.H.M.; M.A. wrote the paper with contributions from J.S.S. the analysis with contributions from M.H.M.; M.A. wrote the paper with contributions from J.S.S. Acknowledgments: This project has received funding from the Marie Curie International Outgoing Fellowship Acknowledgments: This project has received funding from the Marie Curie International Outgoing Fellowship within the 7th European Community Framework Program under grant agreement No. 627816-dunharrow.
Publisher Copyright:
© 2018 by the authors. Licensee MDPI, Basel, Switzerland.
PY - 2018/6
Y1 - 2018/6
N2 - Cancer cells and stromal cells often exchange growth factors with paracrine effects that promote cell growth: a form of cooperation that can be studied by evolutionary game theory. Previous models have assumed that interactions between cells are pairwise or that the benefit of a growth factor is a linear function of its concentration. Diffusible factors, however, affect multiple cells and generally have nonlinear effects, and these differences are known to have important consequences for evolutionary dynamics. Here, we study tumor–stroma paracrine signaling using a model with multiplayer collective interactions in which growth factors have nonlinear effects. We use multiple myeloma as an example, modelling interactions between malignant plasma cells, osteoblasts, and osteoclasts. Nonlinear benefits can lead to results not observed in linear models, including internal mixed stable equilibria and cyclical dynamics. Models with linear effects, therefore, do not lead to a meaningful characterization of the dynamics of tumor–stroma interactions. To understand the dynamics and the effect of therapies it is necessary to estimate the shape of the benefit functions experimentally and parametrize models based on these functions.
AB - Cancer cells and stromal cells often exchange growth factors with paracrine effects that promote cell growth: a form of cooperation that can be studied by evolutionary game theory. Previous models have assumed that interactions between cells are pairwise or that the benefit of a growth factor is a linear function of its concentration. Diffusible factors, however, affect multiple cells and generally have nonlinear effects, and these differences are known to have important consequences for evolutionary dynamics. Here, we study tumor–stroma paracrine signaling using a model with multiplayer collective interactions in which growth factors have nonlinear effects. We use multiple myeloma as an example, modelling interactions between malignant plasma cells, osteoblasts, and osteoclasts. Nonlinear benefits can lead to results not observed in linear models, including internal mixed stable equilibria and cyclical dynamics. Models with linear effects, therefore, do not lead to a meaningful characterization of the dynamics of tumor–stroma interactions. To understand the dynamics and the effect of therapies it is necessary to estimate the shape of the benefit functions experimentally and parametrize models based on these functions.
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U2 - 10.3390/g9020032
DO - 10.3390/g9020032
M3 - Article
AN - SCOPUS:85049457300
SN - 2073-4336
VL - 9
JO - Games
JF - Games
IS - 2
M1 - 32
ER -