Fourier spectrum and shape evolution of an internal Riemann wave of moderate amplitude
The nonlinear deformation of long internal waves in the ocean is studied using the dispersionless Gardner equation. The process of nonlinear wave deformation is determined by the signs of the coefficients of the quadratic and cubic nonlinear terms; the breaking time depends only on their absolute va...
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Copernicus Publications
2013-08-01
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| Series: | Nonlinear Processes in Geophysics |
| Online Access: | http://www.nonlin-processes-geophys.net/20/571/2013/npg-20-571-2013.pdf |
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doaj-88b37bf9ad794995994406c3c81572c62020-11-24T21:36:04ZengCopernicus PublicationsNonlinear Processes in Geophysics1023-58091607-79462013-08-0120457158010.5194/npg-20-571-2013Fourier spectrum and shape evolution of an internal Riemann wave of moderate amplitudeE. KartashovaE. PelinovskyT. TalipovaThe nonlinear deformation of long internal waves in the ocean is studied using the dispersionless Gardner equation. The process of nonlinear wave deformation is determined by the signs of the coefficients of the quadratic and cubic nonlinear terms; the breaking time depends only on their absolute values. The explicit formula for the Fourier spectrum of the deformed Riemann wave is derived and used to investigate the evolution of the spectrum of the initially pure sine wave. It is shown that the spectrum has exponential form for small times and a power asymptotic before breaking. The power asymptotic is universal for arbitrarily chosen coefficients of the nonlinear terms and has a slope close to –8/3.http://www.nonlin-processes-geophys.net/20/571/2013/npg-20-571-2013.pdf |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
E. Kartashova E. Pelinovsky T. Talipova |
| spellingShingle |
E. Kartashova E. Pelinovsky T. Talipova Fourier spectrum and shape evolution of an internal Riemann wave of moderate amplitude Nonlinear Processes in Geophysics |
| author_facet |
E. Kartashova E. Pelinovsky T. Talipova |
| author_sort |
E. Kartashova |
| title |
Fourier spectrum and shape evolution of an internal Riemann wave of moderate amplitude |
| title_short |
Fourier spectrum and shape evolution of an internal Riemann wave of moderate amplitude |
| title_full |
Fourier spectrum and shape evolution of an internal Riemann wave of moderate amplitude |
| title_fullStr |
Fourier spectrum and shape evolution of an internal Riemann wave of moderate amplitude |
| title_full_unstemmed |
Fourier spectrum and shape evolution of an internal Riemann wave of moderate amplitude |
| title_sort |
fourier spectrum and shape evolution of an internal riemann wave of moderate amplitude |
| publisher |
Copernicus Publications |
| series |
Nonlinear Processes in Geophysics |
| issn |
1023-5809 1607-7946 |
| publishDate |
2013-08-01 |
| description |
The nonlinear deformation of long internal waves in the ocean is studied using the dispersionless Gardner equation. The process of nonlinear wave deformation is determined by the signs of the coefficients of the quadratic and cubic nonlinear terms; the breaking time depends only on their absolute values. The explicit formula for the Fourier spectrum of the deformed Riemann wave is derived and used to investigate the evolution of the spectrum of the initially pure sine wave. It is shown that the spectrum has exponential form for small times and a power asymptotic before breaking. The power asymptotic is universal for arbitrarily chosen coefficients of the nonlinear terms and has a slope close to –8/3. |
| url |
http://www.nonlin-processes-geophys.net/20/571/2013/npg-20-571-2013.pdf |
| work_keys_str_mv |
AT ekartashova fourierspectrumandshapeevolutionofaninternalriemannwaveofmoderateamplitude AT epelinovsky fourierspectrumandshapeevolutionofaninternalriemannwaveofmoderateamplitude AT ttalipova fourierspectrumandshapeevolutionofaninternalriemannwaveofmoderateamplitude |
| _version_ |
1725942434005778432 |