Front stability of infinitely steep travelling waves in population biology
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Publication:6582873
DOI10.1088/1751-8121/AD6223zbMATH Open1546.92117MaRDI QIDQ6582873
Matthew J. Simpson, Nizhum Rahman, Alexander K. Y. Tam
Publication date: 5 August 2024
Published in: Journal of Physics A: Mathematical and Theoretical (Search for Journal in Brave)
linear stabilitymoving boundaryreaction-diffusionlevel-set methodnonlinear diffusiontravelling waveFisher-Kolmogorov
Reaction-diffusion equations (35K57) Population dynamics (general) (92D25) Traveling wave solutions (35C07)
Cites Work
- Title not available (Why is that?)
- Title not available (Why is that?)
- Reproducibility of scratch assays is affected by the initial degree of confluence: experiments, modelling and model selection
- Runge-Kutta pairs of order \(5(4)\) satisfying only the first column simplifying assumption
- Improving the accuracy of heat balance integral methods applied to thermal problems with time dependent boundary conditions
- A partial differential equation approach to multidimensional extrapolation.
- Mathematical biology. Vol. 1: An introduction.
- Level set methods and dynamic implicit surfaces
- Merging traveling waves for the porous-Fisher's equation
- Multiscale modelling of fibres dynamics and cell adhesion within moving boundary cancer invasion
- Pattern formation and front stability for a moving-boundary model of biological invasion and recession
- The effect of geometry on survival and extinction in a moving-boundary problem motivated by the Fisher-KPP equation
- Travelling-wave and asymptotic analysis of a multiphase moving boundary model for engineered tissue growth
- Hole-closing model reveals exponents for nonlinear degenerate diffusivity functions in cell biology
- Assessment of a non-traditional operator split algorithm for simulation of reactive transport
- The wave of advance of advantageous genes.
- Invading and receding sharp-fronted travelling waves
- Mathematical model of tumour spheroid experiments with real-time cell cycle imaging
- Spreading-Vanishing Dichotomy in the Diffusive Logistic Model with a Free Boundary
- Fisher equation with density-dependent diffusion: special solutions
- The Stabilizing Effect of Surface Tension on the Development of the Free Boundary in a Planar, One-dimensional, Cauchy-Stefan Problem
- High-Resolution Nonoscillatory Central Schemes with Nonstaggered Grids for Hyperbolic Conservation Laws
- Exact solution and precise asymptotics of a Fisher–KPP type front
- Modelling corneal epithelial wound closure in the presence of physiological electric fields via a moving boundary formalism
- New travelling wave solutions of the Porous–Fisher model with a moving boundary
- Revisiting the Fisher–Kolmogorov–Petrovsky–Piskunov equation to interpret the spreading–extinction dichotomy
- A Mathematical Framework for Developing Freezing Protocols in the Cryopreservation of Cells
- Extended Stefan Problem for Solidification of Binary Alloys in a Finite Planar Domain
- On a Nonlinear Diffusion Equation Describing Population Growth
- RANDOM DISPERSAL IN THEORETICAL POPULATIONS
- Traveling waves, blow‐up, and extinction in the Fisher–Stefan model
- Exact sharp-fronted solutions for nonlinear diffusion on evolving domains
- Survival, extinction, and interface stability in a two-phase moving boundary model of biological invasion
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