On the Functional Equation f n +g n = h n

On meromorphic solutions of the Fermat-type functional equation \(f(z)^n+f(z+c)^m=e^{\alpha z+\beta}\) ⋮ On complex analytic solutions of certain trinomial functional and partial differential equations ⋮ On pseudo-primality of the \(2n\)-th power of prime entire functions ⋮ On entire solutions of some differential-difference equations ⋮ On the equation 𝑓ⁿ+𝑔ⁿ=1 ⋮ On entire solutions of two certain Fermat-type differential-difference equations ⋮ Transcendental solutions of Fermat-type functional equations in \(\mathbb{C}^n\) ⋮ Meromorphic solutions of nonlinear systems of Fermat type ⋮ Value cross-sharing of meromorphic functions ⋮ Meromorphic solutions of Fermat type differential and difference equations of certain types ⋮ Solutions of Fermat-type partial differential-difference equations in \(\mathbb{C}^n\) ⋮ Fermat and Malmquist type matrix differential equations ⋮ Entire solutions of the second-order Fermat-type differential-difference equation ⋮ On meromorphic solutions of the Fermat-type functional equations \(f(z)^3 + f(z+c)^3 = e^p\) ⋮ ON THE PERIODICITY OF TRANSCENDENTAL ENTIRE FUNCTIONS ⋮ On the equation \(f^n + (f^{\prime\prime})^m \equiv 1\) ⋮ Entire solutions of Fermat type differential-difference equations ⋮ On the functional equation \[ \sum_{i=0}^ p a_ i f_ i^{n_ i} = 1 \] ⋮ Existence of entire solutions of some non-linear differential-difference equations ⋮ Unnamed Item ⋮ A note on solutions of some differential-difference equations ⋮ On meromorphic solutions of functional equations of Fermat type ⋮ Meromorphic functions ⋮ On the equation \(f^n(z) + g^n(z) = E^{ \alpha z+ \beta }\) ⋮ Existence of meromorphic solutions of some generalized Fermat functional equations ⋮ On the Fermat-type difference equation \(f^3(z)+[c_1f(z+c)+c_0f(z)^3=E^{\alpha z+\beta}\)] ⋮ Entire solutions of some differential-difference equations ⋮ Endlichkeits- und Picardsätze für quasiprojektive Räume. (Finiteness- and Picard theorems for quasi-projective spaces) ⋮ Unnamed Item ⋮ Miyanishi's characterization of the affine 3-space does not hold in higher dimensions ⋮ Unnamed Item