FREE-SURFACE FLOW OVER A POLYGONAL AND SMOOTH TOPOGRAPHY

被引:2
|
作者
HANNA, SN
机构
[1] Department of Engineering, Mathematics and Physics, Faculty of Engineering, Alexandria University, Alexandria
来源
ACTA MECHANICA | 1993年 / 100卷 / 3-4期
关键词
D O I
10.1007/BF01174792
中图分类号
O3 [力学];
学科分类号
08 ; 0801 ;
摘要
The study of two-dimensional, irrotational, inviscid, incompressible steady state motion generated by a polygonal and a smooth obstruction, is made in terms of the linearized theory. The bottom is represented in integral form using Fourier's double integral theorem. Then following Lamb [1], a linear free-surface profile is obtained for the supercritical and subcritical cases. The results are plotted and discussed for the two cases of the flow for different shapes of the bottom and different values of Froude number, F.
引用
收藏
页码:241 / 251
页数:11
相关论文
共 50 条
  • [1] Critical free-surface flow over a polygonal obstacle
    Hanna, Sarwat N.
    AEJ - Alexandria Engineering Journal, 1994, 33 (01):
  • [2] THE MODELING OF THE FREE-SURFACE FLOW OF WATER OVER TOPOGRAPHY
    JOHNS, B
    COASTAL ENGINEERING, 1991, 15 (03) : 257 - 278
  • [3] SYMMETRIC SUPERCRITICAL FREE-SURFACE FLOW OVER A POLYGONAL OBSTACLE
    SMITH, AC
    LIM, TH
    INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE, 1985, 23 (03) : 289 - 306
  • [4] Steady free-surface flow over spatially periodic topography
    Binder, B. J.
    Blyth, M. G.
    Balasuriya, S.
    JOURNAL OF FLUID MECHANICS, 2015, 781
  • [5] INFLUENCE OF SURFACE-TENSION ON FREE-SURFACE FLOW OVER A POLYGONAL AND CURVED OBSTRUCTION
    HANNA, SN
    JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 1994, 51 (03) : 357 - 374
  • [6] Near-critical free-surface rotating flow over topography
    Vilenski, GG
    Johnson, ER
    PROCEEDINGS OF THE ROYAL SOCIETY A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES, 2004, 460 (2050): : 2865 - 2881
  • [7] On the critical free-surface over localised topography
    Keeler, J. S.
    Binder, B. J.
    Blyth, M. G.
    JOURNAL OF FLUID MECHANICS, 2017, 832 : 73 - 96
  • [8] An Exact Solution to the Inverse Problem of Steady Free-Surface Flow over Topography
    Blyth, M. G.
    WATER WAVES, 2024, 6 (02) : 349 - 366
  • [9] Steady bilayer channel and free-surface isothermal film flow over topography
    Abdalla, A. A.
    Veremieiev, S.
    Gaskell, P. H.
    CHEMICAL ENGINEERING SCIENCE, 2018, 181 : 215 - 236
  • [10] Three-dimensional free-surface flow over arbitrary bottom topography
    Buttle, Nicholas R.
    Pethiyagoda, Ravindra
    Moroney, Timothy J.
    McCue, Scott W.
    JOURNAL OF FLUID MECHANICS, 2018, 846 : 166 - 189
12345