摘要
If f(z) is meromorphic and of finite lower order μ in the plane, then the set of ite deficientfunctions is countable and the total sum of the corresponding deficiencies does not exceedmin{[2μ]+1, max(1,(1/2)2/2μπ)}.
If f(z) is meromorphic and of finite lower order μ in the plane, then the set of ite deficientfunctions is countable and the total sum of the corresponding deficiencies does not exceedmin{[2μ]+1, max(1,(1/2)2/2μπ)}.
