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| Title: | 2D HIGHER ORDER BOUSSINESQ EQUATIONS FOR WAVES IN FLOWS WITH VORTICITY | |
| DOI No: | 10.1142/9789812701916_0007 | |
| Source: | COASTAL ENGINEERING 2004 (pp 106-118) | |
| Author(s): | Z. L. Zou
State Key Laboratory of Coastal and Offshore Engineering, Dalian University of Technology, Dalian 116024, P R China J. T. Kirby Center for Applied Coastal Research, University of Delaware, Newark, DE 19716, USA F. Y. Shi Center for Applied Coastal Research, University of Delaware, Newark, DE 19716, USA |
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| Abstract: | This paper considers the higher order Boussinesq equations for the flow with vorticity, such as the wave propagation in shear currents or in surf zone. In order to show the characteristics of the mathematical model, the equations are first derived for a simple case: vertical two-dimension, horizontal bottom and constant vorticity. Then, the form of the equations for horizontal 2D case is given. Comparison with the Veeramony and Svendsen's horizontal 1D model is made. The determination of the horizontal vorticity component is discussed in order to make the closure of the equations. | |
| Full Text: | View full text in PDF format (374KB) | |
| TOC: | Back to Table of Contents | |
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