Publication Date:
2020
Description:
〈p〉Publication date: Available online 11 January 2020〈/p〉
〈p〉〈b〉Source:〈/b〉 Journal of Ocean Engineering and Science〈/p〉
〈p〉Author(s): M. Mamun Miah, Aly R. Seadawy, H.M. Shahadat Ali, M. Ali Akbar〈/p〉
〈h5〉Abstract〈/h5〉
〈div〉〈p〉The propagation of waves in dispersive media, liquid flow containing gas bubbles, fluid flow in elastic tubes, oceans and gravity waves in a smaller domain, spatio-temporal rescaling of the nonlinear wave motion are delineated by the compound Korteweg-de Vries (KdV)-Burgers equation, the (2+1)-dimensional Maccari system and the generalized shallow water wave equation. In this work, we effectively derive abundant closed form wave solutions of these equations by using the double (〈em〉G〈/em〉′/〈em〉G〈/em〉, 1/〈em〉G〈/em〉) -expansion method. The obtained solutions include singular kink shaped soliton solutions, periodic solution, singular periodic solution, single soliton and other solutions as well. We show that the double (〈em〉G〈/em〉′/〈em〉G〈/em〉, 1/〈em〉G〈/em〉) -expansion method is an efficient and powerful method to examine nonlinear evolution equations (NLEEs) in mathematical physics and scientific application.〈/p〉〈/div〉
Electronic ISSN:
2468-0133
Topics:
Architecture, Civil Engineering, Surveying
