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| Naji, M. |
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| Motta, Antonella |
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| Aletan, Dirar |
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| Mohamed, Tarek |
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| Ertürk, Emre |
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| Taccardi, Nicola |
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| Kononenko, Denys |
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| Petrov, R. H. | Madrid |
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| Alshaaer, Mazen | Brussels |
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| Bih, L. |
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| Casati, R. |
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| Muller, Hermance |
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| Kočí, Jan | Prague |
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| Šuljagić, Marija |
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| Kalteremidou, Kalliopi-Artemi | Brussels |
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| Azam, Siraj |
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| Ospanova, Alyiya |
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| Blanpain, Bart |
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| Ali, M. A. |
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| Popa, V. |
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| Rančić, M. |
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| Ollier, Nadège |
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| Azevedo, Nuno Monteiro |
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| Landes, Michael |
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| Rignanese, Gian-Marco |
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Ala-Nissila, Tapio
Aalto University
in Cooperation with on an Cooperation-Score of 37%
Topics
Publications (27/27 displayed)
- 2024Adsorption of polyelectrolytes in the presence of varying dielectric discontinuity between solution and substratecitations
- 2023Theoretical and computational analysis of the electrophoretic polymer mobility inversion induced by charge correlationscitations
- 2021Silica-silicon composites for near-infrared reflectioncitations
- 2021Silica-silicon composites for near-infrared reflection: A comprehensive computational and experimental studycitations
- 2019Theoretical modeling of polymer translocationcitations
- 2019Thermoplasmonic Response of Semiconductor Nanoparticlescitations
- 2019Phase-field crystal model for heterostructurescitations
- 2018Dielectric trapping of biopolymers translocating through insulating membranescitations
- 2016Electrostatic energy barriers from dielectric membranes upon approach of translocating DNA moleculescitations
- 2016Global transition path search for dislocation formation in Ge on Si(001)citations
- 2016Novel microstructured polyol-polystyrene composites for seasonal heat storagecitations
- 2016Multiscale modeling of polycrystalline graphenecitations
- 2015Entropy production in a non-Markovian environmentcitations
- 2014Biopolymer Filtration in Corrugated Nanochannelscitations
- 2014Electrostatic correlations on the ionic selectivity of cylindrical membrane nanoporescitations
- 2013Microscopic formulation of non-local electrostatics in polar liquids embedding polarizable ionscitations
- 2013Modeling Self-Organization of Thin Strained Metallic Overlayers from Atomic to Micron Scalescitations
- 2013Alteration of gas phase ion polarizabilities upon hydration in high dielectric liquidscitations
- 2012Unifying model of driven polymer translocationcitations
- 2012Correlations between mechanical, structural, and dynamical properties of polymer nanocompositescitations
- 2012Influence of nanoparticle size, loading, and shape on the mechanical properties of polymer nanocompositescitations
- 2009Thermodynamics of bcc metals in phase-field-crystal modelscitations
- 2009Diffusion-controlled anisotropic growth of stable and metastable crystal polymorphs in the phase-field crystal modelcitations
- 2007Interplay between steps and non-equilibrium effects in surface diffusion for a lattice-gas model of O/W(110)citations
- 2007Polymer scaling and dynamics in steady-state sedimentation at infinite Peclet numbercitations
- 2002Effects of quenched impurities on surface diffusion, spreading and ordering of O/W(110)citations
- 2001Density profile evolution and nonequilibrium effects in partial and full spreading measurements of surface diffusioncitations
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article
Interplay between steps and non-equilibrium effects in surface diffusion for a lattice-gas model of O/W(110)
Abstract
The authors consider the influence of steps and nonequilibrium conditions on surface diffusion in a strongly interacting surface adsorbate system. This problem is addressed through Monte Carlo simulations of a lattice-gas model of O∕W(110), where steps are described by an additional binding energy EB at the lower step edge positions. Both equilibrium fluctuation and Boltzmann-Matano spreading studies indicate that the role of steps for diffusion across the steps is prominent in the ordered phases at intermediate coverages. The strongest effects are found in the p(2×1) phase, whose periodicity Lp is 2. The collective diffusion then depends on two competing factors: domain growth within the ordered phase, which on a flat surface has two degenerate orientations [p(2×1) and p(1×2)], and the step-induced ordering due to the enhanced binding at the lower step edge position. The latter case favors the p(2×1) phase, in which all adsorption sites right below the step edge are occupied. When these two factors compete, two possible scenarios emerge. First, when the terrace width L does not match the periodicity of the ordered adatom layer (L/Lp is noninteger), the mismatch gives rise to frustration, which eliminates the effect of steps provided that EB is not exceptionally large. Under these circumstances, the collective diffusion coefficient behaves largely as on a flat surface. Second, however, if the terrace width does match the periodicity of the ordered adatom layer (L/Lp is an integer), collective diffusion is strongly affected by steps. In this case, the influence of steps is manifested as the disappearance of the major peak associated with the ordered p(2×1) and p(1×2) structures on a flat surface. This effect is particularly strong for narrow terraces, yet it persists up to about L≈25Lp for small EB and up to about L≈500Lp for EB, which is of the same magnitude as the bare potential of the surface. On real surfaces, similar competition is expected, although the effects are likely to be smaller due to fluctuations in terrace widths. Finally, Boltzmann-Matano spreading simulations indicate that even slight deviations from equilibrium conditions may give rise to transient peaks in the collective diffusion coefficient. These transient structures are due to the interplay between steps and nonequilibrium conditions and emerge at coverages, which do not correspond to the ideal ordered phases.