Fronts with a Growth Cutoff but Speed Higher than v*

Abstract

Fronts, propagating into an unstable state φ=0, whose asymptotic speed vas is equal to the linear spreading speed v* of infinitesimal perturbations about that state (so-called pulled fronts) are very sensitive to changes in the growth rate f(φ) for φ 1. It was recently found that with a small cutoff, f(φ)=0 for φ < ε, vas converges to v* very slowly from below, as -2 ε. Here we show that with such a cutoff and a small enhancement of the growth rate for small φ behind it, one can have vas > v*, even in the limit ε 0. The effect is confirmed in a stochastic lattice model simulation where the growth rules for a few particles per site are accordingly modified.

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