On transcendental meromorphic solutions of certain types of differential equations

Abstract

In this paper, for a transcendental meromorphic function f and a∈ C, we have exhaustively studied the nature and form of solutions of a new type of non-linear differential equation of the following form which has never been investigated earlier: fn+afn-2f'+ Pd(z,f) = Σi=1kpi(z)eαi(z), where Pd(z,f) is differential polynomial of f, pi's and αi's are non-vanishing rational functions and non-constant polynomials respectively. When a=0, we have pointed out a major lacuna in a recent result of Xue [Math. Slovaca, 70(1)(2020), 87-94] and rectifying the result, presented the corrected form of the same at a large extent. The case a≠ 0 has also been manipulated to determine the form of the solutions. We also illustrate a handful number of examples for showing the accuracy of our results.