A model for the erosion onset of a granular bed sheared by a viscous fluid

Abstract

We study theoretically the erosion threshold of a granular bed forced by a viscous fluid. We first introduce a novel model of interacting particles driven on a rough substrate. It predicts a continuous transition at some threshold forcing θc, beyond which the particle current grows linearly J θ-θc, in agreement with experiments. The stationary state is reached after a transient time t conv which diverges near the transition as t conv |θ-θc|-z with z≈ 2.5. The model also makes quantitative testable predictions for the drainage pattern: the distribution P(σ) of local current is found to be extremely broad with P(σ) J/σ, spatial correlations for the current are negligible in the direction transverse to forcing, but long-range parallel to it. We explain some of these features using a scaling argument and a mean-field approximation that builds an analogy with q-models. We discuss the relationship between our erosion model and models for the depinning transition of vortex lattices in dirty superconductors, where our results may also apply.