Mathematical modelling of cell migration: stiffness dependent jump rates result in durotaxis
Artikel i vetenskaplig tidskrift, 2019

Durotaxis, the phenomena where cells migrate up a gradient in substrate stiffness, remains poorly understood. It has been proposed that durotaxis results from the reinforcement of focal adhesions on stiff substrates. In this paper we formulate a mathematical model of single cell migration on elastic substrates with spatially varying stiffness. We develop a stochastic model where the cell moves by updating the position of its adhesion sites at random times, and the rate of updates is determined by the local stiffness of the substrate. We investigate two physiologically motivated mechanisms of stiffness sensing. From the stochastic model of single cell migration we derive a population level description in the form of a partial differential equation for the time evolution of the density of cells. The equation is an advection-diffusion equation, where the advective velocity is proportional to the stiffness gradient. The model shows quantitative agreement with experimental results in which cells tend to cluster when seeded on a matrix with periodically varying stiffness.

Advection-diffusion equation

Jump process

Stochastic model

Durotaxis

Cell migration

Författare

Adam Malik

Chalmers, Matematiska vetenskaper, Tillämpad matematik och statistik

Göteborgs universitet

Philip Gerlee

Chalmers, Matematiska vetenskaper, Tillämpad matematik och statistik

Göteborgs universitet

Journal of Mathematical Biology

0303-6812 (ISSN) 1432-1416 (eISSN)

Vol. 78 7 2289-2315

Ämneskategorier

Cell- och molekylärbiologi

DOI

10.1007/s00285-019-01344-5

PubMed

30972438

Mer information

Senast uppdaterat

2019-08-09