Öz
Sobolev equations have been used to describe many physical phenomena and they are characterized by having mixed time and space derivatives appearing in the highest-order terms of an partial differential equation. In this work we consider two important system of Sobolev type equations namely improved Boussinesq and higher-order improved Boussinesq. By using tanh-coth method, we obtain abundant new travelling wave solutions of these important physical structures.
Anahtar Kelimeler
Sobolev equation The tanh-coth method The system of improved Boussinesq equations The system of higher-order improved Boussinesq equations
Kaynakça
- [1] P. L. Christiansen, P. S. Lomdahl and V. Muto, "On a Toda lattice model with a transversal degree of freedom", Nonlinearity, vol. 4, pp. 477-501, 1991.
- [2] K. R. Khusnutdinova, A. M. Samsonov and A. S. Zakharov, "Nonlinear layered lattice model and generalized solitary waves in imperfectly bonded structures", Physical Review E, pp. 1-14, vol. 79, 2009
- [3] J. A. D. Wattis, "Solitary waves in a diatomic lattice: analytic approximations for a wide range of speeds by quasi-continuum methods", Physics Letters A, vol. 284, pp. 16-22, 2001
- [4] A. De Godefroy, "Blow up of solutions of a generalized Boussinesq equation", IMA Journal of Applied Mathematics, vol. 60, pp.123-138,1998
- [5] S. Wang and M. Li, "The Cauchy problem for coupled IMBq equations", IMA Journal of Applied Mathematics, vol. 74 ,pp. 726-740, 2009
- [6] D. Rosenau, "Dynamics of dense lattice", Phys. Rev. B, vol.36, pp. 5868-5876, 1987
Öz
Sobolov denklemleri en yüksek mertebeden türevinde zaman ve boyuta göre türevleri beraber bulunduran denklemler olarak tanımlanır. Bu çalışmada, Boussinesq ve yüksek mertebeden geliştirilmiş Boussinesq adlı iki önemli Sobolev denklem sistemini ele aldık. Tanh-coth yöntemi kullanarak bu iki önemli denklem sisteminin bir çok yeni hareketli dalga çözümünü elde ettik
Anahtar Kelimeler
Sobolev denklemi Tanh-coth metot Geliştirilmiş Boussinesq denklem sistemi Yüksek mertebeden geliştirilmiş Boussinesq denklem sistemi
Kaynakça
- [1] P. L. Christiansen, P. S. Lomdahl and V. Muto, "On a Toda lattice model with a transversal degree of freedom", Nonlinearity, vol. 4, pp. 477-501, 1991.
- [2] K. R. Khusnutdinova, A. M. Samsonov and A. S. Zakharov, "Nonlinear layered lattice model and generalized solitary waves in imperfectly bonded structures", Physical Review E, pp. 1-14, vol. 79, 2009
- [3] J. A. D. Wattis, "Solitary waves in a diatomic lattice: analytic approximations for a wide range of speeds by quasi-continuum methods", Physics Letters A, vol. 284, pp. 16-22, 2001
- [4] A. De Godefroy, "Blow up of solutions of a generalized Boussinesq equation", IMA Journal of Applied Mathematics, vol. 60, pp.123-138,1998
- [5] S. Wang and M. Li, "The Cauchy problem for coupled IMBq equations", IMA Journal of Applied Mathematics, vol. 74 ,pp. 726-740, 2009
- [6] D. Rosenau, "Dynamics of dense lattice", Phys. Rev. B, vol.36, pp. 5868-5876, 1987
Ayrıntılar
| Diğer ID | JA36PT65RC |
|---|---|
| Bölüm | Araştırma Makalesi |
| Yazarlar | |
| Yayımlanma Tarihi | 1 Mayıs 2016 |
| Yayımlandığı Sayı | Yıl 2016 Cilt: 4 Sayı: 1 |
Kaynak Göster
Manas Journal of Engineering