Pattern analysis in a benthic bacteria-nutrient system
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Publication:907289
DOI10.3934/MBE.2015004zbMath1329.65308arXiv1403.7146OpenAlexW2963724805WikidataQ39829458 ScholiaQ39829458MaRDI QIDQ907289
Publication date: 25 January 2016
Published in: Mathematical Biosciences and Engineering (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1403.7146
localized patterns2D and 3D Turing patternsbacteria-nutrient modelhexagonal spotsLandau reductionmarine sedimentstationary frontsstripes
PDEs in connection with biology, chemistry and other natural sciences (35Q92) Numerical bifurcation problems (65P30) Cell movement (chemotaxis, etc.) (92C17)
Related Items (2)
Hopf Bifurcation and Time Periodic Orbits with pde2path – Algorithms and Applications ⋮ Snaking branches of planar BCC fronts in the 3D Brusselator
Uses Software
Cites Work
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- Snakes and ladders: localized states in the Swift-Hohenberg equation
- Exponential asymptotics of localised patterns and snaking bifurcation diagrams
- Symmetries and pattern selection in Rayleigh-Bénard convection
- Vegetation patterns along a rainfall gradient
- Turing instabilities and pattern formation in a benthic nutrient-microorganism system
- Heteroclinic tangles and homoclinic snaking in the unfolding of a degenerate reversible Hamiltonian-Hopf bifurcation
- Pattern formation in three-dimensional reaction-diffusion systems
- On localised hotspots of an urban crime model
- Patterns and interfaces in dissipative dynamics. With a foreword by Y. Pomeau
- Numerical Results for Snaking of Patterns over Patterns in Some 2D Selkov--Schnakenberg Reaction-Diffusion Systems
- pde2path - A Matlab Package for Continuation and Bifurcation in 2D Elliptic Systems
- Tomography of Reaction-Diffusion Microemulsions Reveals Three-Dimensional Turing Patterns
- Exponential asymptotics of homoclinic snaking
- Pattern Formation
- Snakes, Ladders, and Isolas of Localized Patterns
- To Snake or Not to Snake in the Planar Swift–Hohenberg Equation
- Localized Pattern Formation with a Large-Scale Mode: Slanted Snaking
- Localized Hexagon Patterns of the Planar Swift–Hohenberg Equation
- Homoclinic snaking: Structure and stability
- Symmetry-breaking bifurcations on cubic lattices
- Propagation of hexagonal patterns near onset
- The chemical basis of morphogenesis
- Modulated and Localized States in a Finite Domain
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