Wave Kinematics and Pressure Field of Third-Order Theory for Bichromatic Bi-Directional Waves in Water of Finite Depth

被引:0
|
作者
Huang, Hu [1 ]
Liu, Guoliang [1 ]
机构
[1] Shanghai Univ, Shanghai Inst Appl Math & Mech, Shanghai Key Lab Mech Energy Engn, Shanghai 200072, Peoples R China
来源
ADVANCES IN CIVIL AND INDUSTRIAL ENGINEERING IV | 2014年 / 580-583卷
关键词
Wave Kinematics and Pressure fields; Bichromatic Bi-Directional Waves; Third-Order Theory; Nonlinear Dispersion Relation; Ambient Currents; Finite Water Depth;
D O I
10.4028/www.scientific.net/AMM.580-583.2166
中图分类号
T [工业技术];
学科分类号
08 ;
摘要
Based on the third-order theory for bichromatic bi-directional waves in water of finite depth, a set of explicit formulas for the state-of-the art quantities of wave kinematics for horizontal and vertical particle displacements, velocities and accelerations, and wave pressure field is developed, and would be much more accurate and realistic in the design of harbor, coastal and offshore structures and their structural members.
引用
收藏
页码:2166 / +
页数:2
相关论文
共 19 条
  • [1] Third-order theory for bichromatic bi-directional water waves
    Madsen, Per A.
    Fuhrman, David R.
    [J]. JOURNAL OF FLUID MECHANICS, 2006, 557 : 369 - 397
  • [2] THIRD-ORDER STEADY-STATE SOLUTIONS OF BICHROMATIC BI-DIRECTIONAL WATER WAVES
    Gao, Zhe
    Liu, Yi
    Jia, L. S.
    Teng, Yunfei
    Wang, Dejun
    Jia, Xu
    [J]. PROCEEDINGS OF ASME 2023 42ND INTERNATIONAL CONFERENCE ON OCEAN, OFFSHORE & ARCTIC ENGINEERING, OMAE2023, VOL 5, 2023,
  • [3] The effect of third-order nonlinearity on statistical properties of random directional waves in finite depth
    Toffoli, A.
    Benoit, M.
    Onorato, M.
    Bitner-Gregersen, E. M.
    [J]. NONLINEAR PROCESSES IN GEOPHYSICS, 2009, 16 (01) : 131 - 139
  • [4] Third-order theory for bichromatic bidirectional water waves partially reflected from vertical breakwaters
    Li, Yang
    Hu, Huang
    [J]. ACTA PHYSICA SINICA, 2010, 59 (07) : 4442 - 4452
  • [5] Third-order theory for multi-directional irregular waves
    Madsen, Per A.
    Fuhrman, David R.
    [J]. JOURNAL OF FLUID MECHANICS, 2012, 698 : 304 - 334
  • [6] Solitary wave solutions of the high-order KdV models for bi-directional water waves
    Burde, Georgy I.
    [J]. COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION, 2011, 16 (03) : 1314 - 1328
  • [7] Analysis of bi-directional functionally graded plates by FEM and a new third-order shear deformation plate theory
    Thom Van Do
    Dinh Kien Nguyen
    Nguyen Dinh Duc
    Duc Hong Doan
    Tinh Quoc Bui
    [J]. THIN-WALLED STRUCTURES, 2017, 119 : 687 - 699
  • [8] Postbuckling analysis of bi-directional functionally graded imperfect beams based on a novel third-order shear deformation theory
    Lei, Jian
    He, Yuming
    Li, Zhenkun
    Guo, Song
    Liu, Dabiao
    [J]. COMPOSITE STRUCTURES, 2019, 209 : 811 - 829
  • [9] A Third-Order DT ΔΣ Modulator Using Noise-Shaped Bi-Directional Single-Slope Quantizer
    Maghari, Nima
    Moon, Un-Ku
    [J]. IEEE JOURNAL OF SOLID-STATE CIRCUITS, 2011, 46 (12) : 2882 - 2891
  • [10] Statistical distribution of wave-surface elevation for second-order random directional ocean waves in finite water depth
    Song, JB
    Hou, YJ
    He, YJ
    Wu, YH
    Yin, BS
    [J]. COASTAL ENGINEERING, 2002, 46 (01) : 51 - 60
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