Title: Cyclic Characters of Alternating Groups

Abstract: We determine the decomposition of cyclic characters of alternating groups into irreducible characters. As an application, we characterize pairs $(w, V)$, where $w\in A_n$ and $V$ is an irreducible representation of $A_n$ such that $w$ admits a non-zero invariant vector in $V$. We also establish new global conjugacy classes for alternating groups, thereby giving a new proof of a result of Heide and Zalessky on the existence of such classes.