Geometry of Developing Flame Fronts: Analysis with Pole Decomposition
- 1 January 1996
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 76 (1) , 146-149
- https://doi.org/10.1103/physrevlett.76.146
Abstract
The roughening of expanding flame fronts by the accretion of cusplike singularities is a fascinating example of the interplay between instability, noise, and nonlinear dynamics that is reminiscent of self-fractalization in Laplacian growth patterns. The nonlinear integro-differential equation that describes the dynamics of expanding flame fronts is amenable to analytic investigations using pole decomposition. This powerful technique allows the development of a satisfactory understanding of the qualitative and some quantitative aspects of the complex geometry that develops in expanding flame fronts.Keywords
All Related Versions
This publication has 13 references indexed in Scilit:
- Fractal Concepts in Surface GrowthPublished by Cambridge University Press (CUP) ,1995
- Kinetic roughening phenomena, stochastic growth, directed polymers and all that. Aspects of multidisciplinary statistical mechanicsPhysics Reports, 1995
- Nonlinear hydrodynamic instability of expanding flames: Intrinsic dynamicsPhysical Review E, 1994
- The growth of rough surfaces and interfacesPhysics Reports, 1993
- Comparison of the scale invariant solutions of the Kuramoto-Sivashinsky and Kardar-Parisi-Zhang equations inddimensionsPhysical Review Letters, 1992
- Singularities in nonlocal interface dynamicsPhysical Review A, 1984
- Nonlinear Dynamical Models of Plasma TurbulencePhysica Scripta, 1982
- Diffusion-Limited Aggregation, a Kinetic Critical PhenomenonPhysical Review Letters, 1981
- Diffusion-Induced Chaos in Reaction SystemsProgress of Theoretical Physics Supplement, 1978
- Nonlinear analysis of hydrodynamic instability in laminar flames—I. Derivation of basic equationsActa Astronautica, 1977