Front propagation and phase field theory

Front propagation and phase field theory

The connection between the weak theories for a class of geometric equations and the asymptotics of appropriately rescaled reaction-diffusion equations is rigorously established. Two different scalings are studied. In the first, the limiting geometric equation is a first-order equation; in the second...

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Veröffentlicht in:SIAM journal on control and optimization 1993-03, Vol.31 (2), p.439-469
Hauptverfasser: BARLES, G, SONER, H. M, SOUGANIDIS, P. E
Format: Artikel
Sprache:eng
Schlagworte:
Applied mathematics
Continuum mechanics
Differential equations
Diffusion
Exact sciences and technology
Flame research
Function theory, analysis
Geometry
Mathematical methods in physics
Mathematical models
Partial differential equations
Phase transitions
Physics
Propagation
Reaction kinetics
Set theory
Viscosity
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Beschreibung
Zusammenfassung:The connection between the weak theories for a class of geometric equations and the asymptotics of appropriately rescaled reaction-diffusion equations is rigorously established. Two different scalings are studied. In the first, the limiting geometric equation is a first-order equation; in the second, it is a generalization of the mean curvature equation. Intrinsic definitions for the geometric equations are obtained, and uniqueness under a geometric condition on the initial surface is proved. In particular, in the case of the mean curvature equation, this condition is satisfied by surfaces that are strictly starshaped, that have positive mean curvature, or that satisfy a condition that interpolates between the positive mean curvature and the starshape conditions.
ISSN:0363-0129
1095-7138
DOI:10.1137/0331021