Isolated circular orders on free products of cyclic groups

Abstract: In this paper, we construct countably many isolated circular orders on the free products $G = F_{2n} \ast \mathbb{Z}{m_1} \ast \cdots \ast \mathbb{Z}{m_k}$ of cyclic groups. Moreover, we prove that these isolated circular orders are not the automorphic images of the others. By using these isolated circular orders, we also construct countably many isolated left orders on a certain central $\mathbb{Z}$-extension of $G$, which are not the automorphic images of the others.