Comment on "Dynamic properties in a family of competitive growing models"

Abstract

The article [Phys. Rev. E 73, 031111 (2006)] by Horowitz and Albano reports on simulations of competitive surface-growth models RD+X that combine random deposition (RD) with another deposition X that occurs with probability p. The claim is made that at saturation the surface width w(p) obeys a power-law scaling w(p) 1/pδ, where δ is only either δ =1/2 or δ=1, which is illustrated by the models where X is ballistic deposition and where X is RD with surface relaxation. Another claim is that in the limit p 0+, for any lattice size L, the time evolution of w(t) generally obeys the scaling w(p,t) (Lα/pδ) F(p2δt/Lz), where F is Family-Vicsek universal scaling function. We show that these claims are incorrect.