{$\underline{E. McLean}$}, R. I. Bowles, B. Scheichl, J.-M. Vanden-Broeck:
''Free Overfall Flow'';
Poster: BMC-BAMC Meeting, Glasgow, Glasgow, UK; 2021-04-06 - 2021-04-09.
@unpublished{mclean21[TUW-295530],
author = {McLean, Ellen and Bowles, Robert I. and Scheichl, Bernhard and Vanden-Broeck, Jean-Marc},
title = {Free Overfall Flow},
year = {2021},
keywords = {conformal mapping, downfall, free-surface flows, overfall, potential flows, weir flows},
abstract = {Many works have considered two-dimensional free-surface flow over the edge of a plate, forming a waterfall, and with uniform horizontal flow far upstream. The flow is assumed to be steady and irrotational, whilst the fluid is assumed to be inviscid and incompressible, and gravity is taken into account. In particular, amongst these works, numerical solutions for both supercritical and subcritical flows are computed by Dias and Tuck (1991), utilising conformal mappings as well as a series truncation and collocation method. I will present an extension to this work where a more appropriate expression is taken for the assumed form of the complex velocity. The justification of this lies in the behaviour of the waterfall flow far downstream and how the parabolic nature of such a free-falling jet can be better encapsulated. New numerical results will be presented, demonstrating the difference in the shape of the new free surface profiles. Comparisons with the asymptotic solutions found by Clarke (1965) will also be made to validate these numerical solutions.},
note = {poster presentation: {BMC}-{BAMC} Meeting, Glasgow, Glasgow, {UK;} 2021-04-06 -- 2021-04-09}
}
Created from the Publication Database of the Vienna University of Technology.