On the Number of Arrows of Cluster Quivers

Abstract

Let Q (resp. Q) be an extended exchange (resp. exchange) cluster quiver of finite mutation type. We introduce the distribution set of the number of arrows for Mut[Q] (resp. Mut[Q]), give the maximum and minimum numbers of the distribution set and establish the existence of an extended complete walk (resp. a complete walk). As a consequence, we prove that the distribution set for Mut[Q] (resp. Mut[Q]) is continuous except the exceptional cases. In case of cluster quivers Qinf of infinite mutation type, the number of arrows does not present a continuous distribution. Besides, we show that the maximal number of arrows of quivers in Mut[Qinf] is infinite if and only if the maximal number of arrows between any two vertices of a quiver in Mut[Qinf] is infinite.