Meromorphic functions bi-weighted weakly sharing pairs of small functions

Abstract

Two meromorphic functions f and g are said to weakly share a small function a with bi-weight (n,k) if the functions f-a and g-a have the same zeros with multiplicities truncated at level n+1, while zeros whose multiplicities exceed k are disregarded. In this article, we show that if f and g weakly share three distinct small functions with suitable bi-weights and are not related by a quasi-Möbius transformation, then for every other small function c, the counting function N(r,νfc) is asymptotically equivalent to the characteristic function T(r,f). Moreover, the truncated counting function N(3(r,νfc), which counts only zeros of multiplicity at least 3, is negligible. As an application, we further prove that f and g must be related by a quasi-Möbius transformation provided that they satisfy an additional condition, which is weaker than the usual assumption that they share a fourth pair of small functions.