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Autori principali: Buenzli, Pascal R., Kuba, Shahak, Murphy, Ryan J., Simpson, Matthew J.
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2406.19197
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author Buenzli, Pascal R.
Kuba, Shahak
Murphy, Ryan J.
Simpson, Matthew J.
author_facet Buenzli, Pascal R.
Kuba, Shahak
Murphy, Ryan J.
Simpson, Matthew J.
contents We propose a simple mathematical model to describe the mechanical relaxation of cells within a curved epithelial tissue layer represented by an arbitrary curve in two-dimensional space. This model generalises previous one-dimensional models of flat epithelia to investigate the influence of curvature for mechanical relaxation. We represent the mechanics of a cell body either by straight springs, or by curved springs that follow the curve's shape. To understand the collective dynamics of the cells, we devise an appropriate continuum limit in which the number of cells and the length of the substrate are constant but the number of springs tends to infinity. In this limit, cell density is governed by a diffusion equation in arc length coordinates, where diffusion may be linear or nonlinear depending on the choice of the spring restoring force law. Our results have important implications about modelling cells on curved geometries: (i) curved and straight springs can lead to different dynamics when there is a finite number of springs, but they both converge quadratically to the dynamics governed by the diffusion equation; (ii) in the continuum limit, the curvature of the tissue does not affect the mechanical relaxation of cells within the layer nor their tangential stress; (iii) a cell's normal stress depends on curvature due to surface tension induced by the tangential forces. Normal stress enables cells to sense substrate curvature at length scales much larger than their cell body, and could induce curvature dependences in experiments.
format Preprint
id arxiv_https___arxiv_org_abs_2406_19197
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Mechanical cell interactions on curved interfaces
Buenzli, Pascal R.
Kuba, Shahak
Murphy, Ryan J.
Simpson, Matthew J.
Cellular Automata and Lattice Gases
Cell Behavior
Tissues and Organs
We propose a simple mathematical model to describe the mechanical relaxation of cells within a curved epithelial tissue layer represented by an arbitrary curve in two-dimensional space. This model generalises previous one-dimensional models of flat epithelia to investigate the influence of curvature for mechanical relaxation. We represent the mechanics of a cell body either by straight springs, or by curved springs that follow the curve's shape. To understand the collective dynamics of the cells, we devise an appropriate continuum limit in which the number of cells and the length of the substrate are constant but the number of springs tends to infinity. In this limit, cell density is governed by a diffusion equation in arc length coordinates, where diffusion may be linear or nonlinear depending on the choice of the spring restoring force law. Our results have important implications about modelling cells on curved geometries: (i) curved and straight springs can lead to different dynamics when there is a finite number of springs, but they both converge quadratically to the dynamics governed by the diffusion equation; (ii) in the continuum limit, the curvature of the tissue does not affect the mechanical relaxation of cells within the layer nor their tangential stress; (iii) a cell's normal stress depends on curvature due to surface tension induced by the tangential forces. Normal stress enables cells to sense substrate curvature at length scales much larger than their cell body, and could induce curvature dependences in experiments.
title Mechanical cell interactions on curved interfaces
topic Cellular Automata and Lattice Gases
Cell Behavior
Tissues and Organs
url https://arxiv.org/abs/2406.19197