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Villain-Lai-Das Sarma (VLDS)方程因其能够有效描述分子束外延生长过程而在表面生长动力学等领域中备受关注. 然而, 长程关联噪声驱动下的VLDS方程的标度结果尚不明确, 不同解析近似方法所得的标度结果仍不自洽. 在数值模拟方面, 由于非线性项的存在, VLDS方程一直存在数值发散的问题. 当前主要引入指数衰减技术替换非线性项以缓解数值发散的问题, 但是最近研究表明, 这种方法会导致所获得的标度指数发生歧变. 因此本文基于深度神经网络来表征VLDS方程中的各个确定项, 并基于数值稳定型神经网络分别对含长程时间和空间关联噪声的VLDS系统进行有效的数值模拟. 结果表明, 我们所构建的深度神经网络具有良好的数值计算稳定性和泛化性, 可以获得不同关联噪声驱动下的VLDS方程的可靠标度指数. 同时, 本文还发现长程时间关联噪声驱动的VLDS系统在时间关联指数较大时呈现谷堆状的表面形貌, 而空间关联噪声驱动下的表面形貌则仍然呈现自仿射分形结构.
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关键词:
- 神经网络 /
- 分子束外延生长 /
- Villain-Lai-Das Sarma方程 /
- 动力学标度
The Villain-Lai-Das Sarma (VLDS) equation has received much attention in surface growth dynamics due to its effective description of molecular beam epitaxy (MBE) growth process. However, the scaling exponent of the VLDS equation driven by long-range correlated noise is still unclear, because different analytical approximation methods yield inconsistent results. The nonlinear term in the VLDS equation challenges the numerical simulation methods, which often leads to the problem of numerical divergence. In the existing numerical approaches, the exponential decay techniques are mainly used to replace nonlinear terms to alleviate the numerical divergence. However, recent studies have shown that these methods may change the scaling exponent and universality class of the growth system. Therefore, we propose a novel deep neural network-based method to address this problem in this work. First, we construct a fully convolutional neural network to characterize the deterministic terms in the VLDS equation. To train the neural network, we generate training data by using the traditional finite-difference method before numerical divergence occurs. Then, we train the neural network to represent the deterministic terms, and perform simulations of VLDS driven by long-range temporally and spatially correlated noises based on the neural networks. The simulation results demonstrate that the deep neural networks constructed here possess good numerical stability. It can obtain reliable scaling exponents of the VLDS equation driven by different uncorrelated noise and correlated noise. Furthermore, in this work, it is also found that the VLDS system driven by long-range correlated noise exhibits a mound-like morphology when the temporal correlation exponent is large enough, while the growing surface morphology driven by spatially correlated noise still presents a self-affine fractal structure, independent of the spatial correlation exponent.-
Keywords:
- neural network /
- molecular beam epitaxy growth /
- Villain-Lai-Das Sarma equation /
- dynamic scaling
[1] Cho A Y, Arthur J R 1975 Prog. Solid State Ch. 10 157Google Scholar
[2] Panish M B 1980 Science 208 916Google Scholar
[3] Arthur J R 2002 Surf. Sci. 500 189Google Scholar
[4] Wolf D E, Villain J 1990 EPL 13 389Google Scholar
[5] Das Sarma S, Tamborenea P 1991 Phys. Rev. Lett. 66 325Google Scholar
[6] Villain J 1991 J. Phys. I 1 19
[7] Lai Z W, Das Sarma S 1991 Phys. Rev. Lett. 66 2348Google Scholar
[8] Family F, Vicsek T S 1991 Dynamics of Fractal Surfaces (Singapore: World Scientific) pp73–132
[9] Katzav E 2002 Phys. Rev. E 65 032103Google Scholar
[10] Tang G, Ma B 2001 Int. J. Mod. Phys. B 15 2275Google Scholar
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[14] Raissi M, Perdikaris P, Karniadakis G E 2019 J. Comput. Phys. 378 686Google Scholar
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Fang B L, Wang J G, Feng G B 2022 Acta Phys. Sin. 71 200601Google Scholar
[16] 田十方, 李彪 2023 物理学报 72 100202Google Scholar
Tian S F, Li B 2023 Acta Phys. Sin. 72 100202Google Scholar
[17] 方波浪, 武俊杰, 王晟, 吴振杰, 李天植, 张洋, 杨鹏翎, 王建国 2024 物理学报 73 094301Google Scholar
Fang B L, Wu J J, Wang S, Wu Z J, Li T Z, Zhang Y, Yang P L, Wang J G 2024 Acta Phys. Sin. 73 094301Google Scholar
[18] Vinuesa R, Brunton S L 2022 Nat. Comput. Sci. 2 358Google Scholar
[19] Kochkov D, Smith J A, Alieva A, Wang Q, Brenner M P, Hoyer S 2021 PNAS 118 e2101784118Google Scholar
[20] Obiols-Sales O, Vishnu A, Malaya N, Chandramowliswharan A 2020 Proceedings of the 34th ACM International Conference on Supercomputing Barcelona Spain, June 29– July 2, 2020
[21] Ling J, Kurzawski A, Templeton J 2016 J. Fluid Mech. 807 155Google Scholar
[22] Beck A, Flad D, Munz C D 2019 J. Comput. Phys. 398 108910Google Scholar
[23] Rumelhart D E, Hinton G E, Williams R J 1986 Nature 323 533Google Scholar
[24] Kingma D P, Ba J 2017 arXiv: 1412.6980 [cs. LG]
[25] Dasgupta C, Kim J M, Dutta M, Das Sarma S 1997 Phys. Rev. E 55 2235Google Scholar
[26] Mandelbrot B B 1971 Water Resour. Res. 7 543Google Scholar
[27] Lam C H, Sander L M 1992 Phys. Rev. A 46 R6128Google Scholar
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图 5 长程时间和空间关联噪声驱动的VLDS系统在稳态生长阶段的表面形貌 (a) $ \theta = 0.05 $; (b) $ \theta = 0.25 $; (c) $ \theta = 0.45 $; (d) $ \rho = $$ 0.05 $; (e) $ \rho = 0.25 $; (f) $ \rho = 0.45 $
Fig. 5. Surface morphologies of VLDS system driven by long range temporally and spatially correlated noises in the steady growth regions: (a) $ \theta = 0.05 $; (b) $ \theta = 0.25 $; (c) $ \theta = 0.45 $; (d) $ \rho = 0.05 $; (e) $ \rho = 0.25 $; (f) $ \rho = 0.45 $.
表 1 VLDSNet网络结构
Table 1. Network structure of the VLDSNet.
网络层 卷积核(通道、大小、填充) 尺寸(通道×尺寸) 输入 — 1 × L 卷积层1 (9, 5, 2) 9 × L 卷积层2 (16, 3, 1) 16 × L 卷积层3 (64, 1, 0) 64 × L 卷积层4 (9, 1, 0) 9 × L 卷积层5 (1, 3, 1) 1 × L 输出 — 1 × L 表 2 VLDSNet和有限差分方法数值发散比较
Table 2. Comparison of numerical divergence between VLDSNet and FD.
噪声缩放比例 离散时间步长 FD
发散时间
(高斯噪声)VLDSNet发散时间
(高斯噪声)FD
发散时间
(均匀噪声)VLDSNet发散时间
(均匀噪声)0.1 0.05 未发散 未发散 未发散 未发散 1 0.05 17.4 未发散 1728.5 未发散 10 0.05 7.0 未发散 9.9 未发散 100 0.05 5.0 未发散 6.0 未发散 0.1 0.1 2284.4 未发散 未发散 未发散 1 0.1 8.6 未发散 31.9 未发散 10 0.1 6.0 未发散 7.0 未发散 100 0.1 5.0 未发散 5.0 未发散 -
[1] Cho A Y, Arthur J R 1975 Prog. Solid State Ch. 10 157Google Scholar
[2] Panish M B 1980 Science 208 916Google Scholar
[3] Arthur J R 2002 Surf. Sci. 500 189Google Scholar
[4] Wolf D E, Villain J 1990 EPL 13 389Google Scholar
[5] Das Sarma S, Tamborenea P 1991 Phys. Rev. Lett. 66 325Google Scholar
[6] Villain J 1991 J. Phys. I 1 19
[7] Lai Z W, Das Sarma S 1991 Phys. Rev. Lett. 66 2348Google Scholar
[8] Family F, Vicsek T S 1991 Dynamics of Fractal Surfaces (Singapore: World Scientific) pp73–132
[9] Katzav E 2002 Phys. Rev. E 65 032103Google Scholar
[10] Tang G, Ma B 2001 Int. J. Mod. Phys. B 15 2275Google Scholar
[11] Song T S, Xia H 2021 Phys. Rev. E 103 012121Google Scholar
[12] Li B, Tan Z H, Jiao Y, Xia H 2021 J. Stat. Mech. Theory E 2021 023210Google Scholar
[13] Song T S, Xia H 2021 J. Stat. Mech. Theory. E 2021 073203Google Scholar
[14] Raissi M, Perdikaris P, Karniadakis G E 2019 J. Comput. Phys. 378 686Google Scholar
[15] 方波浪, 王建国, 冯国斌 2022 物理学报 71 200601Google Scholar
Fang B L, Wang J G, Feng G B 2022 Acta Phys. Sin. 71 200601Google Scholar
[16] 田十方, 李彪 2023 物理学报 72 100202Google Scholar
Tian S F, Li B 2023 Acta Phys. Sin. 72 100202Google Scholar
[17] 方波浪, 武俊杰, 王晟, 吴振杰, 李天植, 张洋, 杨鹏翎, 王建国 2024 物理学报 73 094301Google Scholar
Fang B L, Wu J J, Wang S, Wu Z J, Li T Z, Zhang Y, Yang P L, Wang J G 2024 Acta Phys. Sin. 73 094301Google Scholar
[18] Vinuesa R, Brunton S L 2022 Nat. Comput. Sci. 2 358Google Scholar
[19] Kochkov D, Smith J A, Alieva A, Wang Q, Brenner M P, Hoyer S 2021 PNAS 118 e2101784118Google Scholar
[20] Obiols-Sales O, Vishnu A, Malaya N, Chandramowliswharan A 2020 Proceedings of the 34th ACM International Conference on Supercomputing Barcelona Spain, June 29– July 2, 2020
[21] Ling J, Kurzawski A, Templeton J 2016 J. Fluid Mech. 807 155Google Scholar
[22] Beck A, Flad D, Munz C D 2019 J. Comput. Phys. 398 108910Google Scholar
[23] Rumelhart D E, Hinton G E, Williams R J 1986 Nature 323 533Google Scholar
[24] Kingma D P, Ba J 2017 arXiv: 1412.6980 [cs. LG]
[25] Dasgupta C, Kim J M, Dutta M, Das Sarma S 1997 Phys. Rev. E 55 2235Google Scholar
[26] Mandelbrot B B 1971 Water Resour. Res. 7 543Google Scholar
[27] Lam C H, Sander L M 1992 Phys. Rev. A 46 R6128Google Scholar
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