Research Article
Year 2023,
Volume: 44 Issue: 1, 203 - 208, 26.03.2023
Abstract
References
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- [3] Ozdemir M., Zangwill A., Morphological Equilibration of a Corrugated Crystalline Surface, Phys. Rev. B, 42 (1990) 5013.
- [4] Umbach C.C., Keeffe M.E., Blakely J.M., Scanning Tunneling Microscopy of One Dimensional Periodic Corrugated Silicon Surfaces, J. Vac. Sci. Technol. A, 9 (1991) 1014.
- [5] Israeli N., Kandel D., Profile of a Decaying Crystalline Cone, Phys. Rev. B, 60 (1999) 5946.
- [6] Ichimiya A., Hayashi K., Williams E.D., Einstein T.L., Uwaha M., Watanabe K., Decay of Silicon Mounds: Scaling Laws and Description with Continuum Step Parameters, Appl. Surf. Sci., 175– 176 (2001) 33–35.
- [7] Li M., Wendelken J.F., Liu B., Wang E.G., Zhang Z., Decay Characteristics of Surface Mounds with Contrasting Interlayer Mass Transport Channels, Phys. Rev. Lett., 86 (2001) 2345.
- [8] Kodambaka S., Petrova V., Vailionis A., Petrov I., Greene J.E., In Situ High-Temperature Scanning Tunneling Microscopy Studies of Two-Dimensional TiN Island Coarsening Kinetics on TiN (001), Surf. Sci., 526 (2003) 85–96.
- [9] Kodambaka S., Israeli N., Bareno J., Swiech W., Ohmori K., Petrov I., Greene J.E., Low Energy Electron Microscopy Studies of Interlayer Mass Transport Kinetics on TiN (111), Surf. Sci., 560 (2004) 53–62.
- [10] Kellogg G.L., Bartelt N.C., Surface-Diffusion-Limited Island Decay on Rh(001), Surf. Sci., 577 (2005) 151-157.
- [11] Esen M., Tüzemen A.T., Ozdemir M., Equilibration of a Cone: KMC Simulation Results, Eur. Phys. J. B, 85 (2012) 117.
- [12] Tüzemen A.T., Esen M., Ozdemir M., Scaling Properties of Equilibrating Semiconductor Mounds of Various Initial Shapes, J. Cryst. Growth, 470 (2017) 94–98.
- [13] Tüzemen A.T., Esen M., Ozdemir M., The Investigation of the Morphology of a Decaying Conic Mound in the Presence of Repulsive and Attractive Step Interactions, J. Cryst. Growth, 501 (2018) 1–6.
- [14] Gruber E.E., Mullins W.W., On the Theory of Anisotropy of Crystalline Surface Tension, J. Phys. Chem. Solids., 28 (1967) 875-887.
- [15] Andreev A.F., Kosevich A.Y., Capillary Phenomena in the Theory of Elasticity, Sov. Phys. JETP, 54 (1981) 761.
- [16] Marchenko V.I., Parshin A.Ya., Elastic Properties of Crystal Surfaces, Zh. Eksp. Teor. Fiz., 79 (1980) 257-260.
- [17] Tanaka S., Bartelt N.C., Umbach C.C., Tromp R.M., Blakely J.M., Step Permeability and the Relaxation of Biperiodic Gratings on Si(001), Phys. Rev. Lett., 78 (1997) 3342.
- [18] Jeong H.C., Williams E.D., Steps on Surfaces: Experiment and Theory, Surf. Sci. Rep. 34 (1999) 171–294.
- [19] Israeli N., Kandel D., Profile Scaling in Decay of Nanostructures, Phys. Rev. B, 80 (1998) 3300.
Year 2023,
Volume: 44 Issue: 1, 203 - 208, 26.03.2023
Abstract
The evolution of an initial surface (below its roughening temperature) bounded by a sinusoidal function and consisting of concentric circular steps in two dimensions has been investigated in the Diffusion Limited (DL) regime. Assuming that there were entropic interactions between steps and the local mass transfer took place due to the surface diffusion, the solution of the diffusion equation has been obtained by using polar coordinates in two dimensions. The results obtained in this investigation with analyzing the surface height’s evolution as a function of time are as follows: The surface’s height approximately decreases as τ^α (α≈0.35) and α is independent of the amplitude and the wavelength of the initial surface. The variations in the heights of the surfaces which have different amplitudes (A_01,A_02 ) and wavelengths (λ_1,λ_2 ) scale as (A_01⁄A_02 ) (λ_1⁄λ_2 )^3.
References
- [1] Rettori A., Villain J., Flattening of Grooves on a Crystal Surface: A Method of Investigation of Surface Roughness, J. Phys. France, 49 (1988) 257–267.
- [2] Uwaha M., Relaxation of Crystal Shapes Caused by Step Motion, J. Phys. Soc. Jpn., 57 (1988) 1681–1686.
- [3] Ozdemir M., Zangwill A., Morphological Equilibration of a Corrugated Crystalline Surface, Phys. Rev. B, 42 (1990) 5013.
- [4] Umbach C.C., Keeffe M.E., Blakely J.M., Scanning Tunneling Microscopy of One Dimensional Periodic Corrugated Silicon Surfaces, J. Vac. Sci. Technol. A, 9 (1991) 1014.
- [5] Israeli N., Kandel D., Profile of a Decaying Crystalline Cone, Phys. Rev. B, 60 (1999) 5946.
- [6] Ichimiya A., Hayashi K., Williams E.D., Einstein T.L., Uwaha M., Watanabe K., Decay of Silicon Mounds: Scaling Laws and Description with Continuum Step Parameters, Appl. Surf. Sci., 175– 176 (2001) 33–35.
- [7] Li M., Wendelken J.F., Liu B., Wang E.G., Zhang Z., Decay Characteristics of Surface Mounds with Contrasting Interlayer Mass Transport Channels, Phys. Rev. Lett., 86 (2001) 2345.
- [8] Kodambaka S., Petrova V., Vailionis A., Petrov I., Greene J.E., In Situ High-Temperature Scanning Tunneling Microscopy Studies of Two-Dimensional TiN Island Coarsening Kinetics on TiN (001), Surf. Sci., 526 (2003) 85–96.
- [9] Kodambaka S., Israeli N., Bareno J., Swiech W., Ohmori K., Petrov I., Greene J.E., Low Energy Electron Microscopy Studies of Interlayer Mass Transport Kinetics on TiN (111), Surf. Sci., 560 (2004) 53–62.
- [10] Kellogg G.L., Bartelt N.C., Surface-Diffusion-Limited Island Decay on Rh(001), Surf. Sci., 577 (2005) 151-157.
- [11] Esen M., Tüzemen A.T., Ozdemir M., Equilibration of a Cone: KMC Simulation Results, Eur. Phys. J. B, 85 (2012) 117.
- [12] Tüzemen A.T., Esen M., Ozdemir M., Scaling Properties of Equilibrating Semiconductor Mounds of Various Initial Shapes, J. Cryst. Growth, 470 (2017) 94–98.
- [13] Tüzemen A.T., Esen M., Ozdemir M., The Investigation of the Morphology of a Decaying Conic Mound in the Presence of Repulsive and Attractive Step Interactions, J. Cryst. Growth, 501 (2018) 1–6.
- [14] Gruber E.E., Mullins W.W., On the Theory of Anisotropy of Crystalline Surface Tension, J. Phys. Chem. Solids., 28 (1967) 875-887.
- [15] Andreev A.F., Kosevich A.Y., Capillary Phenomena in the Theory of Elasticity, Sov. Phys. JETP, 54 (1981) 761.
- [16] Marchenko V.I., Parshin A.Ya., Elastic Properties of Crystal Surfaces, Zh. Eksp. Teor. Fiz., 79 (1980) 257-260.
- [17] Tanaka S., Bartelt N.C., Umbach C.C., Tromp R.M., Blakely J.M., Step Permeability and the Relaxation of Biperiodic Gratings on Si(001), Phys. Rev. Lett., 78 (1997) 3342.
- [18] Jeong H.C., Williams E.D., Steps on Surfaces: Experiment and Theory, Surf. Sci. Rep. 34 (1999) 171–294.
- [19] Israeli N., Kandel D., Profile Scaling in Decay of Nanostructures, Phys. Rev. B, 80 (1998) 3300.
There are 19 citations in total.
Details
| Primary Language | English |
|---|---|
| Subjects | Classical Physics (Other) |
| Journal Section | Natural Sciences |
| Authors | |
| Publication Date | March 26, 2023 |
| Submission Date | October 12, 2022 |
| Acceptance Date | December 15, 2022 |
| Published in Issue | Year 2023Volume: 44 Issue: 1 |
