In physics, a front[1][2] can be understood as an interface between two different possible states (either stable or unstable) in a physical system. For example, a weather front is the interface between two different density masses of air, in combustion where the flame is the interface between burned and unburned material or in population dynamics where the front is the interface between populated and unpopulated places. Fronts can be static or mobile depending on the conditions of the system, and the causes of the motion can be the variation of a free energy, where the most energetically favorable state invades the less favorable one, according to Pomeau[3] or shape induced motion due to non-variation dynamics in the system, according to Alvarez-Socorro, Clerc, González-Cortés and Wilson.[4]
From a mathematical point of view, fronts are solutions of spatially extended systems connecting two steady states, and from dynamical systems point of view, a front corresponds to a heteroclinic orbit of the system in the co-mobile frame (or proper frame).
The motion of magnetization domains front. Black state (a magnetization direction in the material) invades the white state (opposite magnetization direction). The fronts are the interfaces between black and white areas.
The most simple example of front solution connecting a homogeneous stable state with a homogeneous unstable state can be shown in the one-dimensional Fisher–Kolmogorov equation:
that describes a simple model for the density of population. This equation has two steady states, , and . This solution corresponds to extinction and saturation of population. Observe that this model is spatially-extended, because it includes a diffusion term given by the second derivative. The state is stable as a simple linear analysis can show and the state is unstable. There exist a family of front solutions connecting with , and such solution are propagative. Particularly, there exist one solution of the form , with is a velocity that only depends on and [5]
Front solution connecting two steady states in a generic spatially extended system.Propagative front profile
Referencesedit
^Pismen, L. M. (2006). Patterns and interfaces in dissipative dynamics. Berlin: Springer. ISBN978-3-540-30430-2.
^Horsthemke, Vicenç Mendéz, Sergei Fedotov, Werner (2010). Reaction-transport systems : mesoscopic foundations, fronts, and spatial instabilities. Heidelberg: Springer. ISBN978-3642114427.{{cite book}}: CS1 maint: multiple names: authors list (link)
^Pomeau, Y. (1986). "Front motion, metastability and subcritical bifurcations in hydrodynamics". Physica D: Nonlinear Phenomena. 23 (1–3): 3–11. Bibcode:1986PhyD...23....3P. doi:10.1016/0167-2789(86)90104-1.
^Alvarez-Socorro, A. J.; Clerc, M.G.; González-Cortés, G; Wilson, M. (2017). "Nonvariational mechanism of front propagation: Theory and experiments". Physical Review E. 95 (1): 010202. Bibcode:2017PhRvE..95a0202A. doi:10.1103/PhysRevE.95.010202. hdl:10533/232239. PMID 28208393.
^Uchiyama, Kohei (1977). "The behavior of solutions of the equation of Kolmogorov–Petrovsky–Piskunov". Proceedings of the Japan Academy, Series A, Mathematical Sciences. 53 (7): 225–228. doi:10.3792/pjaa.53.225.
April 13, 2024
front, physics, physics, front, understood, interface, between, different, possible, states, either, stable, unstable, physical, system, example, weather, front, interface, between, different, density, masses, combustion, where, flame, interface, between, burn. In physics a front 1 2 can be understood as an interface between two different possible states either stable or unstable in a physical system For example a weather front is the interface between two different density masses of air in combustion where the flame is the interface between burned and unburned material or in population dynamics where the front is the interface between populated and unpopulated places Fronts can be static or mobile depending on the conditions of the system and the causes of the motion can be the variation of a free energy where the most energetically favorable state invades the less favorable one according to Pomeau 3 or shape induced motion due to non variation dynamics in the system according to Alvarez Socorro Clerc Gonzalez Cortes and Wilson 4 From a mathematical point of view fronts are solutions of spatially extended systems connecting two steady states and from dynamical systems point of view a front corresponds to a heteroclinic orbit of the system in the co mobile frame or proper frame The motion of magnetization domains front Black state a magnetization direction in the material invades the white state opposite magnetization direction The fronts are the interfaces between black and white areas Fronts connecting stable unstable homogeneous states editThe most simple example of front solution connecting a homogeneous stable state with a homogeneous unstable state can be shown in the one dimensional Fisher Kolmogorov equation Nt DNxx rN N0 N displaystyle N t DN xx rN N 0 N nbsp dd that describes a simple model for the density N x t displaystyle N x t nbsp of population This equation has two steady states N 0 displaystyle N 0 nbsp and N N0 displaystyle N N 0 nbsp This solution corresponds to extinction and saturation of population Observe that this model is spatially extended because it includes a diffusion term given by the second derivative The state N N0 displaystyle N equiv N 0 nbsp is stable as a simple linear analysis can show and the state N 0 displaystyle N 0 nbsp is unstable There exist a family of front solutions connecting N N0 displaystyle N N 0 nbsp with N 0 displaystyle N 0 nbsp and such solution are propagative Particularly there exist one solution of the form N t x N x vt displaystyle N t x N x vt nbsp with v displaystyle v nbsp is a velocity that only depends on D displaystyle D nbsp and r displaystyle r nbsp 5 nbsp Front solution connecting two steady states in a generic spatially extended system nbsp Propagative front profileReferences edit Pismen L M 2006 Patterns and interfaces in dissipative dynamics Berlin Springer ISBN 978 3 540 30430 2 Horsthemke Vicenc Mendez Sergei Fedotov Werner 2010 Reaction transport systems mesoscopic foundations fronts and spatial instabilities Heidelberg Springer ISBN 978 3642114427 a href Template Cite book html title Template Cite book cite book a CS1 maint multiple names authors list link Pomeau Y 1986 Front motion metastability and subcritical bifurcations in hydrodynamics Physica D Nonlinear Phenomena 23 1 3 3 11 Bibcode 1986PhyD 23 3P doi 10 1016 0167 2789 86 90104 1 Alvarez Socorro A J Clerc M G Gonzalez Cortes G Wilson M 2017 Nonvariational mechanism of front propagation Theory and experiments Physical Review E 95 1 010202 Bibcode 2017PhRvE 95a0202A doi 10 1103 PhysRevE 95 010202 hdl 10533 232239 PMID 28208393 Uchiyama Kohei 1977 The behavior of solutions of the equation of Kolmogorov Petrovsky Piskunov Proceedings of the Japan Academy Series A Mathematical Sciences 53 7 225 228 doi 10 3792 pjaa 53 225 Retrieved from https en wikipedia org w index php title Front physics amp oldid 1031532281, wikipedia, wiki, book, books, library,
