Stochastic and deterministic modelling of cell migration

TL;DR

This paper reviews how stochastic agent-based models and deterministic continuum models of cell migration can be unified, highlighting recent advances and unresolved questions in linking micro-scale behaviors to macro-scale dynamics.

Contribution

It introduces a framework for connecting stochastic and deterministic models of cell migration, emphasizing recent developments and future research directions.

Findings

Unified discrete-continuum modeling framework presented

Recent advances in linking micro- and macro-scale models discussed

Open questions in model integration identified

Abstract

Mathematical models are vital interpretive and predictive tools used to assist in the understanding of cell migration. There are typically two approaches to modelling cell migration: either micro-scale, discrete or macro-scale, continuum. The discrete approach, using agent-based models (ABMs), is typically stochastic and accounts for properties at the cell-scale. Conversely, the continuum approach, in which cell density is often modelled as a system of deterministic partial differential equations (PDEs), provides a global description of the migration at the population level. Deterministic models have the advantage that they are generally more amenable to mathematical analysis. They can lead to significant insights for situations in which the system comprises a large number of cells, at which point simulating a stochastic ABM becomes computationally expensive. However, finding an appropriate continuum model to describe the collective behaviour of a system of individual cells can be a difficult task. Deterministic models are often specified on a phenomenological basis, which reduces their predictive power. Stochastic ABMs have advantages over their deterministic continuum counterparts. In particular, ABMs can represent individual-level behaviours (such as cell proliferation and cell-cell interaction) appropriately and are amenable to direct parameterisation using experimental data. It is essential, therefore, to establish direct connections between stochastic micro-scale behaviours and deterministic macro-scale dynamics. In this Chapter we describe how, in some situations, these two distinct modelling approaches can be unified into a discrete-continuum equivalence framework. We provide an overview of some of the more recent advances in this field and we point out some of the relevant questions that remain unanswered.