The higher-order nonlinear Boussinesq type wave equation describes the propagation of small amplitude long capillary-gravity waves on the surface of shallow water. Mathematical physics, shallow water waves, fluid dynamics, and fluid movement are all examples of this model. To acquire exact solutions in the form of solitary wave and complex functions solutions, we use the (m 1/G')-expansion method. These results aid mathematicians and physicians in comprehending the model's physical phenomena. This approach may be employed on different models in order to generate whole new solutions for nonlinear PDEs encountered in mathematical physics.
Yayın Adı (dc.title) | Complex solutions to the higher-order nonlinear boussinesq type wave equation transform |
Yazar/lar (dc.contributor.yazarlar) | S.Ş.Ş. Kiliç, E. Çelik |
Yayın Türü (dc.type) | Makale |
Dil (dc.language) | İngilizce |
Yayımlanma Yılı (dc.date.issued) | 2022 |
Ulusal/Uluslararası (dc.identifier.ulusaluluslararasi) | Uluslararası |
Kaynak (dc.relation.journal) | Ricerche di Matematica |
Süreli Sayı (dc.identifier.issue) | Published online: 06 May 2022 |
ISSN/ISBN (dc.identifier.issn) | ISSN: 0035-5038; Online ISSN: 1827-3491 |
Yayıncı (dc.publisher) | Springer |
Veri Tabanları (dc.contributor.veritaban) | Web of Science Core Collection |
Veri Tabanları (dc.contributor.veritaban) | Springer |
Veri Tabanları (dc.contributor.veritaban) | Scopus |
İndex Türü (dc.identifier.index) | SCI Expanded |
İndex Türü (dc.identifier.index) | Scopus |
Etki Faktörü (dc.identifier.etkifaktoru) | 1,166 / 2021-WOS / 5 Year: 1,096 |
Özet (dc.description.abstract) | The higher-order nonlinear Boussinesq type wave equation describes the propagation of small amplitude long capillary-gravity waves on the surface of shallow water. Mathematical physics, shallow water waves, fluid dynamics, and fluid movement are all examples of this model. To acquire exact solutions in the form of solitary wave and complex functions solutions, we use the (m 1/G')-expansion method. These results aid mathematicians and physicians in comprehending the model's physical phenomena. This approach may be employed on different models in order to generate whole new solutions for nonlinear PDEs encountered in mathematical physics. |
URL (dc.rights) | https://link.springer.com/article/10.1007/s11587-022-00698-1 |
DOI (dc.identifier.doi) | 10.1007/s11587-022-00698-1 |
Fakültesi / Enstitütü (dc.identifier.fakulte) | Fen Fakültesi |
Bölümü (dc.identifier.bolum) | Uygulamalı Matematik ve Enformatik Bölümü |
Kurumdaki Yazar/lar (dc.contributor.author) | Ercan ÇELİK |
Kayıt No (dc.identifier.kayitno) | BLC0F4BFD0 |
Kayıt Giriş Tarihi (dc.date.available) | 2022-05-25 |
Not (Yayımlanma Yılı) (dc.identifier.notyayinyili) | WOS Early Access: May 2022 |
Wos No (dc.identifier.wos) | WOS:000791645500001 |
Konu Başlıkları (dc.subject) | the higher-order nonlinear boussinesq type wave equation |
Konu Başlıkları (dc.subject) | (m+1/G ')-expansion method |
Konu Başlıkları (dc.subject) | complex soliton solutions |
Konu Başlıkları (dc.subject) | physical phenomena |