Similarity Solutions of the Surface Waves Equation in (2+1) Dimensions and Bifurcation
- Autores: Hamdy Abdelhameed, M. R. Belic
- Localización: Applied Mathematics and Nonlinear Sciences, ISSN-e 2444-8656, Vol. 8, Nº. 2, 2023, págs. 419-430
- Idioma: inglés
- Enlaces
-
Resumen
The equation of the surface waves in deep water, given here by (1), is extended to (2+1) dimensions, which is a novelequation.. It is shown that the surface waves equation is self- free source. So, it has a class of infinite solutions. Here manytypes of self-similar and semi-self similar solutions are obtained. The self-similar waves show various geometric structures.Among them, wave crest in the form of coupled lumps and soliton wave moving along the characteristic curve in the plane.It is entrained by troughs with cavities. The semi-self similar waves exhibit multi lumps or periodic waves with troughs andmulti-periodic waves. The study of bifurcation shows that the trajectories are open, so that the traveling wave solutions areunstable. The time-dependent steepness-function is defined here and it is found that it attains a maximum value and then itdecreases with time. The results found are interesting in ocean engineering and sciences. The extended unified method isused, here, to find the exact solutions, which was proposed recently
