Normality Criteria for Differential Monomials and the Sharpness of Lappan-type Theorems

Abstract

A fundamental result of Lappan [Comment. Math. Helv. 49 (1974), 492-495.] states that a meromorphic function f in the unit disk D is normal if and only if its spherical derivative is bounded on a five-point subset E ⊂ C. In this paper, we establish new normality criteria that bridge this classical result with contemporary trends in value distribution theory. We demonstrate that the cardinality of the set E can be reduced from five to as few as three, provided that the spherical derivatives of the function and its successive derivatives f, f', …, f(k-1) are bounded on the pre-image of E. This shift reveals that analytic data from higher-order derivatives can effectively compensate for a reduction in geometric information from the target set. Furthermore, we extend the Pang-Zalcman theorem to a general class of differential monomials M[f]. We prove that if (M[f])\# is bounded on the set of a-points (a ≠ 0), the family F is normal, provided the degree dM satisfies a specific sharp threshold relative to the weight DM and order k. These results offer a refined perspective on the natural boundaries of normality and generalize several established findings in the field.