TRAVELLING WAVE SOLUTION OF THE PARTIAL DIFFERENTIAL EQUATIONS DESCRIBING NONLINEAR WAVE MOTION.

The solution of nonlinear mathematical models has much importance and in soliton theory their worth has increased. In present article, a research has been made of nonlinear Jimbo Miwa and Kadomtsev-Petviashvilli equations, to discuss behavior of these equations and to attain travelling wave solutions. Exp(-f(?)) -expansion technique is used to construct soliton wave solutions. Wave transformation is applied to convert problem in the form of ordinary differential equation. The drawn-out novel type outcomes pay an essential role in the transportation of energy. It is noticed that under study approach is extremely dependable and it may be prolonged to further mathematical models signified mostly in nonlinear differential equations. [ABSTRACT FROM AUTHOR]