Facet Formation in the Negative Quenched Kardar-Parisi-Zhang Equation

Abstract

The quenched Kardar-Parisi-Zhang (QKPZ) equation with negative non-linear term shows a first order pinning-depinning (PD) transition as the driving force F is varied. We study the substrate-tilt dependence of the dynamic transition properties in 1+1 dimensions. At the PD transition, the pinned surfaces form a facet with a characteristic slope sc as long as the substrate-tilt m is less than sc. When m<sc, the transition is discontinuous and the critical value of the driving force Fc(m) is independent of m, while the transition is continuous and Fc(m) increases with m when m>sc. We explain these features from a pinning mechanism involving a localized pinning center and the self-organized facet formation.

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