This paper proves the following theorem:Let F be a family of meromorphic functions in a domain D,k and l≥2 be positive integers,and b a non-zero complex number. If for each f∈F,the zeros of f(z)are of multiplicity at least k+l,and f(k)(z)=0f(k+l)(z)=0,f(k+l)(z)=b→f(k)(z)=b,then F is normal in D. any family F of meromorphic functions in a domain, whose every member's zeros are of multiplicity at least k and the member's k-order derivative takes values at the zeros with a uniform finite boundary,will be normal if the ...
