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W. Bergweiler (1995)
On the zeros of certain homogeneous differential polynomialsArchiv der Mathematik, 64
J. Clunie (1962)
On Integral and Meromorphic FunctionsJournal of The London Mathematical Society-second Series
K. Tohge (1993)
On the zeros of a homogeneous differential polynomial.Kodai Mathematical Journal, 16
K. Tohge (1993)
The logarithmic derivative and a homogeneous differential polynomial of a meromorphic functionKodai Mathematical Journal, 16
K Tohge (1993)
On the zeros of a homogeneous differential polynomial of a meromorphic functionKodai Math. J., 16
E. Mues, N. Steinmetz (1981)
The Theorem of Tumura‐Clunie for Meromorphic FunctionsJournal of The London Mathematical Society-second Series
W K Hayman (1964)
Meromorphic Functions
We apply lemmas of Mues and Steinmetz from [4] to non-linear homogeneous differential polynomials in the meromorphic function f and f (k) with coefficients which are O(log r) + O(T(r, f)) in order to find sufficient conditions for f to be of the form Re P where R is a rational function and P is a polynomial.
Computational Methods and Function Theory – Springer Journals
Published: Nov 30, 2011
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