Theoretical continuous equation derived from the microscopic dynamics for growing interfaces in quenched media

L. A. Braunstein; R. C. Buceta; C. D. Archubi; G. Costanza

doi:10.1103/PhysRevE.62.3920

Theoretical continuous equation derived from the microscopic dynamics for growing interfaces in quenched media

L. A. Braunstein, R. C. Buceta, C. D. Archubi, and G. Costanza

Phys. Rev. E 62, 3920 – Published 1 September 2000

Abstract

We present an analytical continuous equation for the Tang and Leschhorn model [Phys. Rev. A 45, R8309 (1992)] derived from their microscopic rules using a regularization procedure. As well in this approach, the nonlinear term $(\nabla {h)}^{2}$ arises naturally from the microscopic dynamics even if the continuous equation is not the Kardar-Parisi-Zhang equation [Phys. Rev. Lett. 56, 889 (1986)] with quenched noise (QKPZ). Our equation is similar to a QKPZ equation but with multiplicative quenched and thermal noise. The numerical integration of our equation reproduces all the scaling exponents of the directed percolation depinning model.

Received 27 July 1999

DOI:https://doi.org/10.1103/PhysRevE.62.3920

Authors & Affiliations

L. A. Braunstein^*, R. C. Buceta, and C. D. Archubi

Departamento de Física, Facultad de Ciencias Exactas y Naturales, Universidad Nacional de Mar del Plata, Funes 3350, 7600 Mar del Plata, Argentina

G. Costanza

Departamento de Física, Universidad Nacional de San Luis, Chacabuco 917, 5700 San Luis, Argentina

^*Temporary address: Center for Polymer Studies, Dept. of Physics, Boston University, 590 Commonwealth Ave., Boston, MA 02215. Email address: lbrauns@mdp.edu.ar

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Vol. 62, Iss. 3 — September 2000

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