Field equation for interface propagation in an unsteady homogeneous flow field
- 1 April 1988
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review A
- Vol. 37 (7), 2728-2731
- https://doi.org/10.1103/physreva.37.2728
Abstract
The nonlinear scalar field equation governing the propagation of an unsteadily convected interface is used to derive a convenient expression for the average volume flux through such an interface in a homogeneous flow field. For a particular choice of the initial scalar field, the average volume flux through any such interface is expressed as a volume-averaged functional of the evolving scalar field, facilitating analysis based on renormalized perturbation theory and numerical simulation. It is noted that this process belongs to a different universality class from the propagation model of M. Kardar, G. Parisi, and Y.-C. Zhang [Phys. Rev. Lett. 56, 889 (1986)].Keywords
This publication has 9 references indexed in Scilit:
- Alignment of vorticity and scalar gradient with strain rate in simulated Navier–Stokes turbulencePhysics of Fluids, 1987
- Analytical theories of turbulence and the ε expansionPhysics of Fluids, 1987
- Numerical study of vortex reconnectionPhysical Review Letters, 1987
- Dynamic Scaling of Growing InterfacesPhysical Review Letters, 1986
- Renormalization group analysis of turbulence. I. Basic theoryJournal of Scientific Computing, 1986
- Curvature and the evolution of frontsCommunications in Mathematical Physics, 1985
- Approximation schemes for viscosity solutions of Hamilton-Jacobi equationsJournal of Differential Equations, 1985
- Some properties of viscosity solutions of Hamilton-Jacobi equationsTransactions of the American Mathematical Society, 1984
- Viscosity solutions of Hamilton-Jacobi equationsTransactions of the American Mathematical Society, 1983