# On the value distribution of a Differential Monomial and some normality   criteria

**Authors:** Weiran L\"u, Bikash Chakraborty

arXiv: 1903.10940 · 2020-08-31

## TL;DR

This paper investigates the value distribution of differential monomials of transcendental meromorphic functions and establishes a normality criterion for families of analytic functions based on differential inequalities.

## Contribution

It provides a quantitative estimate of the characteristic function related to differential monomials and proves a new normality criterion involving differential inequalities.

## Key findings

- Quantitative estimation of the characteristic function T(r, f)
- Normality criterion for families of analytic functions
- Conditions involving differential monomials and zeros

## Abstract

Let $f$ be a transcendental meromorphic function defined in the complex plane $\mathbb{C}$, and $\varphi(\not\equiv 0,\infty)$ be a small function of $f$. In this paper, We give a quantitative estimation of the characteristic function $T(r, f)$ in terms of $N\left(r,\frac{1}{M[f]-\varphi(z)}\right)$ as well as $\ol{N}\left(r,\frac{1}{M[f]-\varphi(z)}\right)$, where $M[f]$ is the differential monomial, generated by $f$.\par Moreover, we prove one normality criterion: Let $\mathscr{F}$ be a family of analytic functions on a domain $D$ and let $k(\geq1)$, $q_{0}(\geq 3)$, $q_{i}(\geq0)$ $(i=1,2,\ldots,k-1)$, $q_{k}(\geq1)$ be positive integers. If for each $f\in \mathscr{F}$, $f$ has only zeros of multiplicity at least $k$, and $f^{q_{0}}(f')^{q_{1}}...(f^{(k)})^{q_{k}}\not=1$, then $\mathscr{F}$ is normal on domain $D$.

## Full text

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## References

19 references — full list in the complete paper: https://tomesphere.com/paper/1903.10940/full.md

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Source: https://tomesphere.com/paper/1903.10940