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Extended boussinesq equations for water-wave propagation in porous media / Hsiao, Shih-Chun in Journal of engineering mechanics, Vol. 136 N° 5 (Mai 2010) 

Public ISBD [article]  in Journal of engineering mechanics > Vol. 136 N° 5 (Mai 2010) . - pp. 625-640 Titre : Extended boussinesq equations for water-wave propagation in porous media Type de document : texte imprimé Auteurs : Hsiao, Shih-Chun, Auteur ; Hu, Kai-Cheng, Auteur ; Hwung, Hwung-Hweng, Auteur Article en page(s) : pp. 625-640 Note générale : Mécanique appliquée Langues : Anglais (eng) Mots-clés : Porous  media  Damping  Boussinesq  equations  Water  waves  Wave  propagation. Résumé : This paper presents a new Boussinesq-type model equations for describing nonlinear surface wave motions in porous media. The mathematical model based on perturbation approach reported by Hsiao et al. is derived. The drag force and turbulence effect suggested by Sollitt and Cross are incorporated for observing the flow behaviors within porous media. Additionally, the approach of Chen for eliminating the depth-dependent terms in the momentum equations is also adopted. The model capability on an applicable water depth range is satisfactorily validated against the linear wave theory. The nonlinear properties of model equations are numerically confirmed by the weakly nonlinear theory of Liu and Wen. Numerical experiments of regular waves propagating in porous media over an impermeable submerged breakwater are performed and the nonlinear behaviors of wave energy transfer between different harmonics are also examined DEWEY : 620.1 ISSN : 0733-9399 En ligne : http://ascelibrary.aip.org/vsearch/servlet/VerityServlet?KEY=ASCERL&CURRENT=null [...] [article] Extended boussinesq equations for water-wave propagation in porous media [texte imprimé] / Hsiao, Shih-Chun, Auteur ; Hu, Kai-Cheng, Auteur ; Hwung, Hwung-Hweng, Auteur . - pp. 625-640. Mécanique appliquée Langues : Anglais (eng) in Journal of engineering mechanics > Vol. 136 N° 5 (Mai 2010) . - pp. 625-640 Mots-clés : Porous  media  Damping  Boussinesq  equations  Water  waves  Wave  propagation. Résumé : This paper presents a new Boussinesq-type model equations for describing nonlinear surface wave motions in porous media. The mathematical model based on perturbation approach reported by Hsiao et al. is derived. The drag force and turbulence effect suggested by Sollitt and Cross are incorporated for observing the flow behaviors within porous media. Additionally, the approach of Chen for eliminating the depth-dependent terms in the momentum equations is also adopted. The model capability on an applicable water depth range is satisfactorily validated against the linear wave theory. The nonlinear properties of model equations are numerically confirmed by the weakly nonlinear theory of Liu and Wen. Numerical experiments of regular waves propagating in porous media over an impermeable submerged breakwater are performed and the nonlinear behaviors of wave energy transfer between different harmonics are also examined DEWEY : 620.1 ISSN : 0733-9399 En ligne : http://ascelibrary.aip.org/vsearch/servlet/VerityServlet?KEY=ASCERL&CURRENT=null [...]