Traveling Wave Solutions to the K(m,n) equation with generalized evolution Using the First Integral Method

In this paper, we investigate the first integral method for solving the K(m,n) equation with generalized evolution (u^n )_t+a(u^m )_(u_x )+b(u^n )_xxx=0 A class of traveling wave solutions for the considered equations are obtained where 4n=3(m + 1). This idea can obtain some exact solutions of this equations based on the theory of Commutative algebra. A class of traveling wave solutions for the considered equations are obtained where 4