Yang-Baxter equations and $\mathcal O$-operators of a Hom-Jordan superalgebra with representation

Abstract: In this paper, first we recall the notion of Hom-Jordan superalgebras and study their representations. We define the Yang-Baxter equation in a Hom-Jordan superalgebra. Additionally, we extend the connections between $\mathcal {O}$-operators and skew-symmetric solutions Yang-Baxter equation of Hom-Jordan superalgebras (HJYBE). In which, we prove that a super skew-symmetric solution of HJYBE can be interpreted as an $\mathcal{O}$-operator associated to the coadjoint representation. Finally, we study the relationship between Hom-pre-Jordan superalgebras and Hom-Jordan superalgebras via an $\mathcal{O}$-operators. Some other related results are considered.