Meromorphic functions on annuli sharing finite sets with truncated multiplicity

Abstract

The purpose of this paper has twofold. The first is to establish a second main theorem for meromorphic functions on annuli and meromorphic function targets (may not be small functions) with truncated counting functions (truncation level 1) and with a detailed estimate for the error term. The second is to show that if the polynomial PS(w)=(w-a1)·s (w-aq) is a uniqueness polynomial for admissible meromorphic functions on an annulus A(R0) such that P'S(w) has exactly k distinct zeros and q>(5k+7)2-175, then the set S=\a1,…,aq\ is a finite range set with truncation level for admissible meromorphic functions on A(R0). This result extends the previous result on the finite range set (with truncation level =∞) for holomorphic functions on C of H. Fujimoto.