Instabilities and Geometry of Growing Tissues
Doron Grossman
École Polytechnique, Palaiseau
Lundi 27/05/2024, 14:00-15:00
Salle Claude Itzykson, Bât. 774, Orme des Merisiers
Epithelial tissue is one of the most common tissue types in animals. Here we present a covariant continuum formulation of a generalized two-dimensional vertexlike model for epithelial tissues. This formulation can describe tissues with different underlying geometries, and allows for an analytical macroscopic description. We calculate both mechanical and dynamical instabilities of a tissue, and their dependencies on various variables, including activity, and cell-shape heterogeneity (disorder). We show how both plastic cellular rearrangements and the tissue elastic response depend on the existence of mechanical residual stresses at the cellular level. Even freely growing tissues may exhibit a growth instability depending on the intrinsic proliferation rate. Our main result is an explicit calculation of the cell pressure in a homeostatic state of a confined growing tissue. We show that the homeostatic pressure can be negative and depends on the existence of mechanical residual stresses. This geometric model allows us to sort out elastic and plastic effects in a growing, flowing, tissue. We calculate the rheological response of such a living tissue, and show that it can exhibit shear thining, shear thickening and thixotropic behaviour, depending on the conditions