Scott W McCue
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Explore the profile of Scott W McCue including associated specialties, affiliations and a list of published articles.
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43
Citations
252
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Recent Articles
1.
Kedda S, Dallaston M, McCue S
Phys Rev E
. 2024 Oct;
110(3-2):035104.
PMID: 39425386
The study of viscous thin film flow has led to the development of highly nonlinear partial differential equations that model how the evolution of the film height is affected by...
2.
Simpson M, Murphy K, McCue S, Buenzli P
R Soc Open Sci
. 2024 Jul;
11(5):240126.
PMID: 39076824
Mathematical models describing the spatial spreading and invasion of populations of biological cells are often developed in a continuum modelling framework using reaction-diffusion equations. While continuum models based on linear...
3.
Simpson M, Walker S, Studerus E, McCue S, Murphy R, Maclaren O
Math Biosci
. 2022 Dec;
355:108950.
PMID: 36463960
Calibrating mathematical models to describe ecological data provides important insight via parameter estimation that is not possible from analysing data alone. When we undertake a mathematical modelling study of ecological...
4.
El-Hachem M, McCue S, Simpson M
Math Med Biol
. 2022 Jul;
39(3):226-250.
PMID: 35818827
The Fisher-Kolmogorov-Petrovsky-Piskunov (KPP) model, and generalizations thereof, involves simple reaction-diffusion equations for biological invasion that assume individuals in the population undergo linear diffusion with diffusivity $D$, and logistic proliferation with...
5.
El-Hachem M, McCue S, Simpson M
Bull Math Biol
. 2022 Mar;
84(4):49.
PMID: 35237899
We consider a continuum mathematical model of biological tissue formation inspired by recent experiments describing thin tissue growth in 3D-printed bioscaffolds. The continuum model, which we call the substrate model,...
6.
Vittadello S, McCue S, Gunasingh G, Haass N, Simpson M
J Math Biol
. 2021 Mar;
82(5):34.
PMID: 33712945
We present a novel mathematical model of heterogeneous cell proliferation where the total population consists of a subpopulation of slow-proliferating cells and a subpopulation of fast-proliferating cells. The model incorporates...
7.
Tredenick E, Forster W, Pethiyagoda R, van Leeuwen R, McCue S
J Colloid Interface Sci
. 2021 Mar;
592:329-341.
PMID: 33676194
Hypothesis: Evaporation of surfactant droplets on leaves is complicated due to the complex physical and chemical properties of the leaf surfaces. However, for certain leaf surfaces for which the evaporation...
8.
El-Hachem M, McCue S, Simpson M
Bull Math Biol
. 2021 Feb;
83(4):35.
PMID: 33611673
Biological invasion, whereby populations of motile and proliferative individuals lead to moving fronts that invade vacant regions, is routinely studied using partial differential equation models based upon the classical Fisher-KPP...
9.
Kempthorne D, Turner I, Belward J, McCue S, Barry M, Young J, et al.
Funct Plant Biol
. 2020 Jun;
42(5):444-451.
PMID: 32480690
Realistic virtual models of leaf surfaces are important for several applications in the plant sciences, such as modelling agrichemical spray droplet movement and spreading on the surface. In this context,...
10.
Vittadello S, McCue S, Gunasingh G, Haass N, Simpson M
Biophys J
. 2020 Feb;
118(6):1243-1247.
PMID: 32087771
The go-or-grow hypothesis states that adherent cells undergo reversible phenotype switching between migratory and proliferative states, with cells in the migratory state being more motile than cells in the proliferative...