Irregular labeling on Abelian groups of digraphs

Let $\overrightarrow{G}$ be a directed graph of order $n$ with no component of order less than $4$, and let $\Gamma$ be a finite Abelian group such that $|\Gamma|\geq n+6$. We show that there exists a mapping $\psi$ from the arc set $E(\overrightarrow{G})$ of $\overrightarrow{G}$ to an Abelian group $\Gamma$ such that if we define a mapping $\varphi_{\psi}$ from the vertex set $V(\overrightarrow{G})$ of $\overrightarrow{G}$ to $\Gamma$ by $$\varphi_{\psi}(x)=\sum_{y\in N^+(x)}\psi(xy)-\sum_{y\in N^-(x)}\psi(yx),\;\;\;(x\in V(\overrightarrow{G})),$$ then $\varphi_{\psi}$ is injective. Such a labeling $\psi$ is called \textit{irregular}.