File:Steep deep water wave.ogv
Summary
Steep deep water waves, with a wave length of about twice the water depth. The wave height is 90% of the maximum wave height.
Description of the animation: The white dots are fluid particles, also followed in time. In the case shown here, the mean Eulerian horizontal velocity below the wave trough is zero.
The wave physics are computed with the Rienecker & Fenton (R&F) streamfunction theory; for a computer code to compute these see: J.D. Fenton (1988) "The numerical solution of steady water wave problems". Computers & Geosciences 14(3), pp. 357–368. The animations are made from the R&F results with a series of Matlab scripts and batch files.
Licensing
Lua error in package.lua at line 80: module 'strict' not found.Lua error in package.lua at line 80: module 'strict' not found.
File history
Click on a date/time to view the file as it appeared at that time.
| Date/Time | Thumbnail | Dimensions | User | Comment | |
|---|---|---|---|---|---|
| current | 23:52, 7 January 2017 | 12 s, 390 × 292 (4.76 MB) | 127.0.0.1 (talk) | Steep deep water waves, with a wave length of about twice the water depth. The wave height is 90% of the maximum wave height.<br><i>Description of the animation</i>: The white dots are fluid particles, also followed in time. In the case shown here, the mean Eulerian horizontal velocity below the wave trough is zero.<br>The wave physics are computed with the Rienecker & Fenton (R&F) streamfunction theory; for a computer code to compute these see: J.D. Fenton (1988) "The numerical solution of steady water wave problems". Computers & Geosciences 14(3), pp. 357–368. The animations are made from the R&F results with a series of Matlab scripts and batch files. |
- You cannot overwrite this file.
File usage
The following page links to this file:
Transcode status
Update transcode statusNo transcoding required.
