Coarsening in surface growth models without slope selection
Abstract
We study conserved models of crystal growth in one dimension [∂t z(x,t) =-∂x j(x,t)] which are linearly unstable and develop a mound structure whose typical size L increases in time (L = tn). If the local slope (m =∂x z) increases indefinitely, n depends on the exponent γ characterizing the large m behaviour of the surface current j (j = 1/|m|γ): n=1/4 for 1< γ <3 and n=(1+γ)/(1+5γ) for γ>3.
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