Calculation of Wave Radiation Stress in Combination with Parabolic Mild Slope Equation 被引量：1

Calculation of Wave Radiation Stress in Combination with Parabolic Mild Slope Equation

下载PDF

导出

摘要 A new method for the calculation of wave radiation stress is proposed by linking the expressions for wave radiation stress with the variables in the parabolic mild slope equation. The governing equations are solved numerically by the finite difference method. Numerical results show that the new method is accurate enough, can be efficiently solved with little programming effort, and can be applied to the calculation of wave radiation stress for large coastal areas. A new method for the calculation of wave radiation stress is proposed by linking the expressions for wave radiation stress with the variables in the parabolic mild slope equation. The governing equations are solved numerically by the finite difference method. Numerical results show that the new method is accurate enough, can be efficiently solved with little programming effort, and can be applied to the calculation of wave radiation stress for large coastal areas.

作者郑永红沈永明邱大洪

出处《China Ocean Engineering》 SCIE EI 2000年第4期495-502,共8页 中国海洋工程（英文版）

基金 This subject was financially supported by the National Natural Science Foundation of China(Grant No.59839330 and No.49910161985)

关键词 radiation stress parabolic mild-slope equation numerical solution water waves radiation stress parabolic mild-slope equation numerical solution water waves

分类号 TV139.2 [水利工程—水力学及河流动力学]

引文网络
相关文献

参考文献11

1[1]Copeland, G. J. M., 1985. Practical Radiation Stress Calculations Connected with Equations of Wave Propagation,Coastal Engineering, 9, 195～219. 被引量：1
2[2]DING Pingxing, KONG Yazhen and SHI Fengyan, 1998. Radiation Stress of Water Waves and Its Calculation, Journal of East China Normal University, (1): 82～87. (in Chinese) 被引量：1
3[3]Kirby, J. T. and Dalrymple, R. A., 1983. A Parabolic Equation for the Combined Refraction-Diffraction of Stokes Waves by Mildly Varying Topography, J. Fluid Mech., 136, 453～466. 被引量：1
4[4]Kirby, J. T., 1986a. Rational Approximations in the Parabolic Equation Method for Water Waves, Coastal Engineering, 10, 355～378. 被引量：1
5[5]Kirby, J. T., 1986b. Open Lateral Boundary Condition for Application in the Parabolic Equation Method, J. Waterway Port. Coastal Eng., ASCE, 112, 460～465. 被引量：1
6[6]Longuet-Higgins, M. S. and Stewart, R. W., 1960. Changes in the Form of Short Gravity Waves on Long Waves and Tidal Currents, J. Fluid Mech., 8, 565～583. 被引量：1
7[7]Longuet-Higgins, M. S. and Stewart, R. W., 1961. The Changes in Amplitude of Short Gravity Waves on Steady Non. uniform Currents, J. Fluid Mech., 10, 529～549. 被引量：1
8[8]Longuet-Higgins, M. S. and Stewart, R. W., 1962. Radiation Stress and Mass Transport in Gravity Waves with Application to Surf Beats, J. Fluid Mech., 13, 481～504. 被引量：1
9[9]Longuet-Higgins, M. S. and Stewart, R. W., 1964. Radiation Stress in Water Waves: a Physical Discussion with Applications, Deep-Sea Res., 11,529～562. 被引量：1
10[10]Longuet-Higgins, M. S., 1970. Longshore Currents Generated by Obliquely Incident Sea Waves, J. Geophys, Res., 75,6778～6801. 被引量：1

同被引文献6

1高山,孙孚.风浪场波生横向彻体切应力的分析[J].海洋与湖沼,2005,36(4):367-375. 被引量：2
2孙孚,魏永亮,吴克俭.地转条件下的浪致辐射应力[J].海洋学报,2006,28(6):1-4. 被引量：3
3丁平兴,孔亚珍,史峰岩.水波的辐射应力及其计算[J].华东师范大学学报（自然科学版）,1998(1):82-87. 被引量：10
4郑永红,沈永明,邱大洪.结合抛物型缓坡方程计算波浪辐射应力[J].海洋学报,2000,22(6):110-116. 被引量：17
5郑金海,严以新.波浪辐射应力张量的垂向变化[J].水动力学研究与进展（A辑）,2001,16(2):246-253. 被引量：9
6孙孚,钱成春,王伟,高山.海浪波生切应力及其对流驱动作用的估计[J].中国科学（D辑）,2003,33(8):791-798. 被引量：11

引证文献1

1齐鹏,陈新平.波浪辐射应力对海流模式影响的数值分析[J].海洋工程,2018,36(1):55-61.

1Zuo, Qihua, Yao, Guoquan, Ding, Bingcan.Water Wave Refraction and Diffraction over Frictional Topography[J].China Ocean Engineering,1993,8(1):73-84. 被引量：2
2TANG Jun,LYU Yigang,SHEN Yongming.Numerical study on water waves and wave-induced longshore currents in Obaky coastal water[J].Acta Oceanologica Sinica,2014,33(9):40-46. 被引量：1
3TANG Jun,SHEN Yongming,SHI Feng,ZHANG Ming.Numerical study of wave and longshore current interaction[J].Acta Oceanologica Sinica,2012,31(3):10-17. 被引量：3
4Asu INAN Lale BALAS.Applications of A Numerical Model to Wave Propagation on Mild Slopes[J].China Ocean Engineering,2002,17(4):569-576. 被引量：3
5陶建华,韩光.Numerical Simulation of Breaking Wave Based on Higher-Order Mild Slope Equation[J].China Ocean Engineering,2001,16(2):269-280. 被引量：2
6韩光,陶建华.Parabolic Approximation of the Weakly Nonlinear Mild Slope Equation with Bottom Friction[J].China Ocean Engineering,1999,14(4):467-478.
7冯卫兵,洪广文.Numerical Modeling of Wave Diffraction-Refraction in Water of Varying Current and Topography[J].China Ocean Engineering,2000,15(1):45-58. 被引量：7
8GEOCHEMISTRY[J].Abstracts of Chinese Geological Literature,1994,10(1):16-20.
9郑永红,沈永明,邱大洪,夏进.Efficient Elliptic Solver for the Mild Slope Equation Using BI-CGSTAB Method[J].China Ocean Engineering,2000,15(2):175-184. 被引量：4
10王彦,邹志利.Longshore Currents over Barred Beach with Mild Slope[J].China Ocean Engineering,2016,30(2):193-204.

China Ocean Engineering

2000年第4期

浏览历史

内容加载中请稍等...

Calculation of Wave Radiation Stress in Combination with Parabolic Mild Slope Equation 被引量：1

参考文献11

同被引文献6

引证文献1

相关作者

相关机构

相关主题

浏览历史