Traveling Wave-Guide Channels of a New Coupled Integrable Dispersionless System

Abstract: In the wake of the recent investigation of new coupled integrable dispersionless equations by means of the Darboux transformation [Zhaqilao, et al., Chin. Phys. B 18 (2009) 1780], we carry out the initial value analysis of the previous system using the fourth-order Runge-Kutta's computational scheme. As a result, while depicting its phase portraits accordingly, we show that the above dispersionless system actually supports two kinds of solutions amongst which the localized traveling wave-guide channels. In ad… Show more

“…Moreover, taking now the value of integration constant different to zero and 23) are stressed. The obtained bright and dark solitons solutions can be useful in communication system via the optical fibers [34][35][36][37][38][39][40][41]. These results will certainly encourage the search for solutions to nonlinear differential equations which seem to be difficult to handle without computer codes.…”

New explicit and exact traveling waves solutions to the modified complex Ginzburg Landau equation

“…Moreover, taking now the value of integration constant different to zero and 23) are stressed. The obtained bright and dark solitons solutions can be useful in communication system via the optical fibers [34][35][36][37][38][39][40][41]. These results will certainly encourage the search for solutions to nonlinear differential equations which seem to be difficult to handle without computer codes.…”

New explicit and exact traveling waves solutions to the modified complex Ginzburg Landau equation

“…e multirotating loop soliton solutions are given by the perturbation technique and symbolic computation [49]. Traveling wave-guide channels of a CID system are investigated by using the fourth-order Runge-Kutta's computational scheme [50] and Hirota's bilinear method [51]. Algebraic structures of a general CID system are analyzed through the prolongation structure approach [52].…”

CTE Solvability, Nonlocal Symmetry, and Interaction Solutions of Coupled Integrable Dispersionless System

“…Physically, system (3) describes a current-fed string interacting with an external magnetic fed. Geometrically, it describes the parallel transport of points of the arc along the time direction such that the connection is magnetic-valued [17][18][19][20][21]. It has attracted great interest from mathematicians and physicists, and many mathematical approaches have been developed to investigate novel solutions to it.…”

Dynamical Behaviour of Conformable Time-Fractional Coupled Konno-Oono Equation in Magnetic Field