Characteristic functions of two meromorphic functions weakly sharing three small functions with bi-weights

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 two meromorphic functions f and g weakly share three small functions ai\ (1 i 3) with bi-weights (ni,k) satisfying n1n2n3>n1+n2+n3+2 then (1-ε-δε)T(r, f) (2+ε+δε)T(r, g)+S(r, g) for every positive number ε, where δε is explicitly estimated depending only on ε and k, so that δε tends to zero as k tends to +∞.