Institutional Repository of Key Laboratory of Ocean Circulation and Wave Studies, Institute of Oceanology, Chinese Academy of Sciences
Simulating regular wave propagation over a submerged bar by boundary element method model and Boussinesq equation model | |
Li Shuang1,2; He Hai-Lun3; He, HL | |
2013-02-01 | |
发表期刊 | CHINESE PHYSICS B |
ISSN | 1674-1056 |
卷号 | 22期号:2页码:24701 |
文章类型 | Article |
摘要 | Numerical models based on the boundary element method and Boussinesq equation are used to simulate the wave transform over a submerged bar for regular waves. In the boundary-element-method model the linear element is used, and the integrals are computed by analytical formulas. The Boussinesq-equation model is the well-known FUNWAVE from the University of Delaware. We compare the numerical free surface displacements with the laboratory data on both gentle slope and steep slope, and find that both the models simulate the wave transform well. We further compute the agreement indexes between the numerical result and laboratory data, and the results support that the boundary-element-method model has a stable good performance, which is due to the fact that its governing equation has no restriction on nonlinearity and dispersion as compared with Boussinesq equation.; Numerical models based on the boundary element method and Boussinesq equation are used to simulate the wave transform over a submerged bar for regular waves. In the boundary-element-method model the linear element is used, and the integrals are computed by analytical formulas. The Boussinesq-equation model is the well-known FUNWAVE from the University of Delaware. We compare the numerical free surface displacements with the laboratory data on both gentle slope and steep slope, and find that both the models simulate the wave transform well. We further compute the agreement indexes between the numerical result and laboratory data, and the results support that the boundary-element-method model has a stable good performance, which is due to the fact that its governing equation has no restriction on nonlinearity and dispersion as compared with Boussinesq equation. |
关键词 | Numerical Wave Tank Boundary Element Method Boussinesq Equation |
学科领域 | Physics |
DOI | 10.1088/1674-1056/22/2/024701 |
URL | 查看原文 |
收录类别 | SCI |
语种 | 英语 |
WOS研究方向 | Physics |
WOS类目 | Physics, Multidisciplinary |
WOS记录号 | WOS:000315347100047 |
WOS关键词 | DENSITY-STRATIFIED FLUID ; INTERFACIAL INTERNAL WAVES ; NUMERICAL-SIMULATION ; SURFACE-WAVES ; WATER-WAVES ; BREAKING ; STRENGTH ; ONSET |
WOS标题词 | Science & Technology ; Physical Sciences |
引用统计 | |
文献类型 | 期刊论文 |
条目标识符 | http://ir.qdio.ac.cn/handle/337002/16435 |
专题 | 海洋环流与波动重点实验室 |
通讯作者 | He, HL |
作者单位 | 1.Zhejiang Univ, Dept Ocean Sci & Engn, Hangzhou 310058, Zhejiang, Peoples R China 2.Chinese Acad Sci, Key Lab Ocean Circulat & Waves, Qingdao 266071, Peoples R China 3.SOA, Inst Oceanog 2, State Key Lab Satellite Ocean Environm Dynam, Hangzhou 310012, Zhejiang, Peoples R China |
第一作者单位 | 海洋环流与波动重点实验室 |
推荐引用方式 GB/T 7714 | Li Shuang,He Hai-Lun,He, HL. Simulating regular wave propagation over a submerged bar by boundary element method model and Boussinesq equation model[J]. CHINESE PHYSICS B,2013,22(2):24701. |
APA | Li Shuang,He Hai-Lun,&He, HL.(2013).Simulating regular wave propagation over a submerged bar by boundary element method model and Boussinesq equation model.CHINESE PHYSICS B,22(2),24701. |
MLA | Li Shuang,et al."Simulating regular wave propagation over a submerged bar by boundary element method model and Boussinesq equation model".CHINESE PHYSICS B 22.2(2013):24701. |
条目包含的文件 | ||||||
文件名称/大小 | 文献类型 | 版本类型 | 开放类型 | 使用许可 | ||
Simulating regular w(538KB) | 限制开放 | CC BY-NC-SA | 浏览 |
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