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- Stokes_wave abstract "In fluid dynamics, a Stokes wave refers to a non-linear and periodic surface wave on an inviscid fluid layer of constant mean depth.This type of modelling has its origins in the mid 19th century when Sir George Stokes – using a perturbation series approach, now known as the Stokes expansion – obtained approximate solutions for non-linear wave motion.Stokes' wave theory is of direct practical use for waves on intermediate and deep water. It is used in the design of coastal and offshore structures, in order to determine the wave kinematics (free surface elevation and flow velocities). The wave kinematics are subsequently needed in the design process to determine the wave loads on a structure. For long waves (as compared to depth) – and using only a few terms in the Stokes expansion – its applicability is limited to waves of small amplitude. In such shallow water, a cnoidal wave theory often provides better periodic-wave approximations.While, in the strict sense, Stokes wave refers to progressive periodic waves of permanent form, the term is also used in connection with standing waves and even for random waves.".
- Stokes_wave thumbnail Stokes3_wave.svg?width=300.
- Stokes_wave wikiPageExternalLink nonLinear.html.
- Stokes_wave wikiPageExternalLink SurfaceWaves.
- Stokes_wave wikiPageExternalLink mathphyspapers01stokrich.
- Stokes_wave wikiPageExternalLink scientificpapers06rayliala.
- Stokes_wave wikiPageExternalLink Fenton90b-Nonlinear-wave-theories.pdf.
- Stokes_wave wikiPageID "15440535".
- Stokes_wave wikiPageRevisionID "605282474".
- Stokes_wave hasPhotoCollection Stokes_wave.
- Stokes_wave subject Category:Fluid_dynamics.
- Stokes_wave subject Category:Water_waves.
- Stokes_wave comment "In fluid dynamics, a Stokes wave refers to a non-linear and periodic surface wave on an inviscid fluid layer of constant mean depth.This type of modelling has its origins in the mid 19th century when Sir George Stokes – using a perturbation series approach, now known as the Stokes expansion – obtained approximate solutions for non-linear wave motion.Stokes' wave theory is of direct practical use for waves on intermediate and deep water.".
- Stokes_wave label "Stokes wave".
- Stokes_wave sameAs m.0lq0xh0.
- Stokes_wave sameAs Q7618554.
- Stokes_wave sameAs Q7618554.
- Stokes_wave wasDerivedFrom Stokes_wave?oldid=605282474.
- Stokes_wave depiction Stokes3_wave.svg.
- Stokes_wave isPrimaryTopicOf Stokes_wave.
