We study the simple, linear, Edwards-Wilkinson equation that describes surface growth governed by height diffusion in the presence of spatiotemporally power-law decaying correlated noise. We analytically show that the surface becomes super-rough when the noise correlations spatio/temporal range is long enough. We calculate analytically the associated anomalous exponents as a function of the noise correlation exponents. We also show that super-roughening appears exactly at the threshold point where the local slope surface field becomes rough. In addition, our results indicate that the recent numerical finding of anomalous kinetic roughing of the Kardar-Parisi-Zhang model subject to temporally correlated noise may be inherited from the linear...
Surface growth models may give rise to instabilities with mound formation whose typical linear size ...
AbstractEarth surface evolution, like many natural phenomena typified by fluctuations on a wide rang...
Abstract. We present a microscopic description of interface growth with power-law noise distriiurion...
arXiv:1911.10937v1We study the simple, linear, Edwards–Wilkinson equation that describes surface gro...
We investigate Kardar-Parisi-Zhang (KPZ) surface growth in the presence of power-law temporally corr...
We investigate the theory of growth of anisotropically self-similar (i.e. self-affine) rough surface...
6 pages, 3 figures.-- PACS nrs.: 05.40.+j, 05.70.Ln, 68.35.Fx.-- ArXiv pre-print available at: http:...
19 pages, 6 figures.-- PACS nrs.: 05.40.+j; 05.70.Ln; 68.35.Fx.In this paper we study kinetically ro...
Large scale simulations of stochastic growth of 2+1 dimensional surfaces were carried out on a 16K p...
[[abstract]]We give an extensive study on a class of interfacial superroughening processes with fini...
We study the phenomenon of super-roughening found on surfaces growing on disordered substrates. We c...
Using simple scaling arguments it is shown that a sufficiently slowly decaying power law noise dist...
[[abstract]]An extensive study on the (2+1)-dimensional super-rough growth processes, described by a...
[[abstract]]An extensive analytical and numerical study on a class of growth processes with spatiote...
We propose a phenomenological equation to describe kinetic roughening of a growing surface in the pr...
Surface growth models may give rise to instabilities with mound formation whose typical linear size ...
AbstractEarth surface evolution, like many natural phenomena typified by fluctuations on a wide rang...
Abstract. We present a microscopic description of interface growth with power-law noise distriiurion...
arXiv:1911.10937v1We study the simple, linear, Edwards–Wilkinson equation that describes surface gro...
We investigate Kardar-Parisi-Zhang (KPZ) surface growth in the presence of power-law temporally corr...
We investigate the theory of growth of anisotropically self-similar (i.e. self-affine) rough surface...
6 pages, 3 figures.-- PACS nrs.: 05.40.+j, 05.70.Ln, 68.35.Fx.-- ArXiv pre-print available at: http:...
19 pages, 6 figures.-- PACS nrs.: 05.40.+j; 05.70.Ln; 68.35.Fx.In this paper we study kinetically ro...
Large scale simulations of stochastic growth of 2+1 dimensional surfaces were carried out on a 16K p...
[[abstract]]We give an extensive study on a class of interfacial superroughening processes with fini...
We study the phenomenon of super-roughening found on surfaces growing on disordered substrates. We c...
Using simple scaling arguments it is shown that a sufficiently slowly decaying power law noise dist...
[[abstract]]An extensive study on the (2+1)-dimensional super-rough growth processes, described by a...
[[abstract]]An extensive analytical and numerical study on a class of growth processes with spatiote...
We propose a phenomenological equation to describe kinetic roughening of a growing surface in the pr...
Surface growth models may give rise to instabilities with mound formation whose typical linear size ...
AbstractEarth surface evolution, like many natural phenomena typified by fluctuations on a wide rang...
Abstract. We present a microscopic description of interface growth with power-law noise distriiurion...