1989 | OriginalPaper | Chapter
Forced Tidal Oscillations in the World Ocean
Authors : G. I. Marchuk, B. A. Kagan
Published in: Dynamics of Ocean Tides
Publisher: Springer Netherlands
Included in: Professional Book Archive
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To describe forced tidal oscillations we turn again to the traditional equations of tidal dynamics, simplified as compared to (3.2.1), (3.2.2) by excluding the frictional forces, and present them as 5.1.1$$ \frac{{\partial w}}{{\partial t}}{\rm{ + }}L{\rm{ }}w{\rm{ = }}L{\rm{ }}{w^ + }; $$ here w = (v.ζ); w+ = (0.ζ+); $$ L\,{\rm{ = }}\left( {\begin{array}{*{20}{c}} {l{\rm{ }}k{\rm{ }} \times }&{gh{\rm{ }}\nabla }\\ \nabla &0 \end{array}} \right). $$