2019
DOI: 10.1103/physreve.99.042802
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Effects of a kinetic barrier on limited-mobility interface growth models

Abstract: The role played by a kinetic barrier originated by out-of-plane step edge diffusion, introduced in [Leal et al., J. Phys. Condens. Matter 23, 292201 (2011)], is investigated in the Wolf-Villain and Das Sarma-Tamborenea models with short range diffusion. Using large-scale simulations, we observe that this barrier is sufficient to produce growth instability, forming quasiregular mounds in one and two dimensions. The characteristic surface length saturates quickly indicating a uncorrelated growth of the three-dim… Show more

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Cited by 6 publications
(3 citation statements)
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“…[45], for the case of a homogeneous XXZ model with target polarization at the boundaries and asymmetric external magnetic field, the authors show the existence of spin rectification for N > 2, but it does not exist for N = 2. Here, for the quantum Ising model, if we keep only nearest-neighbor interactions, there is also a drastic difference: there are heat current and rectification for N = 2, and no heat current for N > 2 [46]. Interestingly, in the presence of long range interactions capable to link the first to the last site of the chain, the heat current reappears together with the possibility of a perfect rectification if the temperature of one of the baths goes to zero [46].…”
Section: Quantum Spin Chainsmentioning
confidence: 99%
See 1 more Smart Citation
“…[45], for the case of a homogeneous XXZ model with target polarization at the boundaries and asymmetric external magnetic field, the authors show the existence of spin rectification for N > 2, but it does not exist for N = 2. Here, for the quantum Ising model, if we keep only nearest-neighbor interactions, there is also a drastic difference: there are heat current and rectification for N = 2, and no heat current for N > 2 [46]. Interestingly, in the presence of long range interactions capable to link the first to the last site of the chain, the heat current reappears together with the possibility of a perfect rectification if the temperature of one of the baths goes to zero [46].…”
Section: Quantum Spin Chainsmentioning
confidence: 99%
“…Here, for the quantum Ising model, if we keep only nearest-neighbor interactions, there is also a drastic difference: there are heat current and rectification for N = 2, and no heat current for N > 2 [46]. Interestingly, in the presence of long range interactions capable to link the first to the last site of the chain, the heat current reappears together with the possibility of a perfect rectification if the temperature of one of the baths goes to zero [46].…”
Section: Quantum Spin Chainsmentioning
confidence: 99%
“…Growth instabilities can induce the formation of mound-like patterns and it is well accepted that the original DT model displays quasiregular mound formation [62][63][64][65][66][67]84]. To investigate how diffusional fluctuations alter this characteristic feature, we show exemplary interface profiles for two diffusion lengths l and different values of σ 2 in Fig.…”
Section: Interface Profiles and The Effect Of Diffusional Fluctuationsmentioning
confidence: 99%