Application of simplest equations of Bernoulli and Riccati kind for obtaining exact traveling-wave solutions for a class of PDEs with polynomial nonlinearity

We discuss the class of equations where A ij (u), B kl (u) and C(u) are functions of u(x, t) as follows: (i) A ij , B kl and C are polynomials of u; or (ii) A ij , B kl and C can be reduced to polynomials of u by means of Taylor series for small values of u. For these two cases the above-mentioned

of simplest equation Exact traveling-wave solutions a b s t r a c t We search for traveling-wave solutions of two classes of equations: (I.) Class of reaction-diffusion equations Above a, b, c are parameters and D and F depend on the population density Q. We obtain such solutions by the modified me

of Bernoulli Equation of Riccati Elliptic equation a b s t r a c t The modified method of simplest equation is powerful tool for obtaining exact and approximate solutions of nonlinear PDEs. These solutions are constructed on the basis of solutions of more simple equations called simplest equations.

In this paper, we study two types of genuinely nonlinear K(n, n) equations and a generalized KP equation. By developing a mathematical method based on the reduction of order of nonlinear differential equations, we derive general formulas for the travelling wave solutions of the three equations. The