Cytopede: A Three-Dimensional Tool for Modeling Cell Motility on a Flat Surface. When cultured on flat surfaces, fibroblasts and many other cells spread to form thin lamellar sheets. Motion then occurs by extension of the sheet at the leading edge and retraction at the trailing edge. Comprehensive quantitative models of these phenomena have so far been lacking and to address this need, we have designed a three-dimensional code called Cytopede specialized for the simulation of the mechanical and signaling behavior of plated cells. Under assumptions by which the cytosol and the cytoskeleton are treated from a continuum mechanical perspective, Cytopede uses the finite element method to solve mass and momentum equations for each phase, and thus determine the time evolution of cellular models. We present the physical concepts that underlie Cytopede together with the algorithms used for their implementation. We then validate the approach by a computation of the spread of a viscous sessile droplet. Finally, to exemplify how Cytopede enables the testing of ideas about cell mechanics, we simulate a simple fibroblast model. We show how Cytopede allows computation, not only of basic characteristics of shape and velocity, but also of maps of cell thickness, cytoskeletal density, cytoskeletal flow, and substratum tractions that are readily compared with experimental data.
Keywords for this software
References in zbMATH (referenced in 4 articles )
Showing results 1 to 4 of 4.
- Croft, Wayne; Elliott, Charles M.; Ladds, Graham; Stinner, Björn; Venkataraman, Chandrasekhar; Weston, Cathryn: Parameter identification problems in the modelling of cell motility (2015)
- Heck, T. A. M.; Vaeyens, M. M.; van Oosterwyck, H.: Computational models of sprouting angiogenesis and cell migration: towards multiscale mechanochemical models of angiogenesis (2015)
- Nikmaneshi, M. R.; Firoozabadi, B.; Saidi, M. S.: Two-phase acto-cytosolic fluid flow in a moving keratocyte: a 2D continuum model (2015)
- Novak, Igor L.; Slepchenko, Boris M.: A conservative algorithm for parabolic problems in domains with moving boundaries (2014)