ENTIRE AND MEROMORPHIC SOLUTIONS FOR SEVERAL FERMAT TYPE PARTIAL DIFFERENTIAL DIFFERENCE EQUATIONS IN C2

We explore the existence and the forms of entire and meromorphic solutions for the partial differentialdifference equations with more general forms of (alpha partial derivative f(z1, z2)/partial derivative z1 + ss partial derivative f (z1, z2)/partial derivative z(2) )(2) + f(z1 + c1, z2 + c2)(2) = e(g(z1, z2)) and ( alpha partial derivative f(z1, z2)/partial derivative z1 + ss partial derivative f (z1, z2)/partial derivative z(2) )(2) + [f(z1+ c1, z2 + c2) - f(z1,z2)](2) = e(g(z1, z2)) where g(z1, z2) is a polynomial in C-2 and alpha, ss are constants in C. Some of the results about the forms of solutions for these equations that are obtained are great improvements over previous results. It is important that some of the examples show that there exist some significant differences in the forms of transcendental entire solutions of finite order of the equations between several complex variables and a single complex variable.