Splitting method for solving systems of nonlinear evolution equations

The present method has several steps. The first step starts for each unknown with a random value in the interval for the unknown. The second step starts at a point near the best point obtained in step one; specifically, for each unknown variable, the second step starts with a value which is, say, th

In this paper, the Exp-function method is used to obtain generalized solitary solutions of the generalized Drinfel'd-Sokolov-Wilson (DSW) system and the generalized (2 + 1)dimensional Burgers-type equation. Then, some of the solitary solutions are converted to periodic solutions or hyperbolic functi

Systems of nonlinear algebraic equations (SNAE) are ubiquitous in the many applications requiring numerical simulation, and more robust and efficient methods for solving SNAE are continuously being sought. In this paper, we present an overview of existing algorithmic approaches for solving SNAE such