Uniqueness of meromorphic functions sharing a value (Q382128)

In this paper the authors consider the existence of solutions of \([L(f)]^{(k)}-1\) and studies the corresponding uniqueness theorem. Elaborately the authors studies the relationship between two entire (meromorphic) functions \(f\) and \(g\) when \([L(f)]^{(k)}\) and \([L(g)]^{(k)}\) share the value \(1\) IM or CM, where \[ L(z)=a_{n}z^{n}+a_{n-1}z^{n-1}+\ldots+a_{0}, \] where \(a_{i}\), \(i=0,1,\ldots,n-1\), \(a_{n}\not=0\) are distinct finite complex numbers. There results generalize a number of results in this perspective as previously researchers used to consider the value sharing of \([f^{r}L(f)]^{(k)}\) and \([g^{r}L(g)]^{(k)}\), where \(r\) is a positive integer.