Meromorphic functions partially sharing 1CM+1IM concerning periodicities and shifts
2019
The purpose of this article is to deal with the uniqueness problems of
meromorphic functions partially sharing values. It is showed that two entire
functions f and 1 with ρ2(f) < 1 and periodic restriction must be
identically if E(0,f(z)) = E(0,g(z)) except for a possible set G1 and
E‾(1, f(z)) = E‾(1,g(z)) except for a possible set G2 with N(r,Gi) = O(rλ),
(i=1,2), where λ(< 1) is a fixed constant. This result is a
generalization of some previous works of Chen in [5] and Cai and Chen in
[7].
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