In this paper, a macroscopic model describing endothelial cellmigration on bioactive micropatterned polymers is presented.It isbased on a system of partial differential equations ofPatlak-Keller-Segel type that describes theevolution of the cell densities.The model is knesko coupon code studiedmathematically and numerically.We prove existence sww x and uniquenessresults of the solution to the differential system.
We also show thatfundamental physical properties such as mass conservation, positivityand boundedness of the solution are satisfied.The numerical study allows us to show that the modeling results are in good agreement with the experiments.