Partial differential equations arise frequently in the formulation of fundamental laws of nature and in the mathematical analysis of a wide variety of problems in applied mathematics, mathematical physics, and engineering science. This subject plays a central role in modern mathematical sciences. In recent years, it has turned out that many phenomena in fluid mechanics, viscoelasticity, biology, physics, engineering and other areas of science can be successfully modeled by the use of fractional derivatives and integrals [1] [2] . In this article, we study fractional differential equations associated with derivatives. Such a kind of equation appears in many problems. In particular, we have found fractional differential equations related to the classical Klein-Gordon equation [3] .

The Jumarie’s modified Riemann-Lionvile derivative, of order, can be defined by the following expression

Moreover, some properties for the modified Riemann-Liouville derivative can be given as follows:

Consider the time fractional differential equation with independent variables and a dependent variable,

Using the variable transformation

where and are constants to be determined later. The fractional differential Equation (5) is reduced to a nonlinear ordinary differential equation

We assume that Equation (7) has a solution in the form

and introduce a new independent variable,which leads to a new system of ordinary differential equations

By using the division theorem for two variables in complex domain which is based on the Hilbert- Nullstellensatz theorem [4] , we can obtain a first integral to Equation (9) which can applied to Equation (7) to obtain a first-order ordinary differential equation. An exact solution to Equation (5) is then obtained by solving the equations that are obtained from applying Equation (9) into Equation (7). Now, we wish to quickly recall the division theory.

Theorem 2.1 [The Division Theorem]

Suppose that and are polynomials of two variables and in and is irreducible in. If vanishes at all points of, then there exists a polynomial in such that.

We discuss the problem by using the first integral method and consider the general formula [5] :

where are real constant.

Substituting Equation (7) in Equation (6), we get the system

Now, we apply the division theorem. Suppose that and are nontrivial solution of equation (11). Then

which is an irreducible Polynomial in the complex domain, thus

are polynomial and, Equation (13) is called the first integral method. There exists a polynomial in the complex domain such that

which can be written as

by comparing the coefficients of on both sides of Equation (15), we obtain

from (12a), we deduce that is a constant and, we take, and by balancing the degrees of, we find the degree of. Now we consider the following cases.

Case (1)

When, in Equation (12), then the Equation (13) becomes

Since are polynomial, then from Equation (14a) we deduce that is constant and

For simplicity, we take. By balancing the degrees of and, we conclude that

Suppose that, then we can find.

where is an arbitrary integration constant. By substituting in Equation (17c), and setting all the coefficients of powers of X to zero, we obtain a system of nonlinear algebraic equations and by solving it, we obtain

Substituting Equation (16) in Equation (10), we obtain

By combining Equation (20) with Equation (11), we find the exact solution of Equation (11).

Case (2)

When M = 2, in Equation (15), then the Equation (16) became

Since are polynomial, then from Equation (14a) we deduce that is constant and

For simplicity, we take. By balancing the degrees of and, we conclude that,

Suppose that, then we find

where are arbitrary integration constants.

By substituting in (21d), and setting all the coefficients of powers of X to zero, we obtain a system of nonlinear algebraic equations and by solving it, we obtain

Using Equation (23) in Equation (12), we obtain two equal roots for Y.

Note that

Combining Equation (24) with Equation (11), we find the exact solution of Equation (11).

Case 3

When M = 3, in Equation (15), then the Equation (16) become

(26a) (26b)

Since are polynomial, then from Equation (17a) we deduce that is constant and

For simplicity, we take. Balancing the degrees of and. We conclude that

Suppose that, then we find:

where are arbitrary integration constants.

Substituting in Equation (21d), and setting all the coefficients of powers of X to zero, we obtain a system of nonlinear algebraic equations and by solving it, we obtain

Substituting Equation (23) in Equation (12), we obtain three equal roots for Y

Note that

,

then, (31)

Combining Equation (24) with Equation (11), we find the exact solution of Equation (11).

By the integrating Equations (20), (25) and (30), we can find different solutions of Equation (10), and the exact solution of the general formula in Equation (10) are given by combining Equations (20), (24), (30), with (11) and integrating respect with respect to.

We can apply Theorem 3.1 to studying some time fractional differential equations.

Consider the nonlinear fractional Klein-Gordon equation,

For our purpose, we introduce the following transformations

where are constant.

Substituting Equation (33) in Equation (32)

which is the same as in the form of Equation (10) where

Integrating with respect to then

where.

where is an arbitrary constant.

Consider the initial condition (32), we can see that the generalized the nonlinear fractional Klein-Gordon Equation (32) have the exact solution

Comparing our results with that of resalts [6] , shows the novelty of our solution. See Appendix A Figure 1.

A general formula of the first integral method is used successfully to solve systems of nonlinear fractional differential equations. The performance of this method is reliable, effective and gives more solutions. We have extended the general formula to solve other fractional differential equations.