Symmetric mutations algebras in the context of sub-cluster algebras

Abstract

For a rooted cluster algebra A(Q) over a valued quiver Q, a symmetric cluster variable is any cluster variable belonging to a cluster associated with a quiver σ (Q), for some permutation σ. The subalgebra of A(Q) generated by all symmetric cluster variables is called the symmetric mutation subalgebra and is denoted by B(Q). In this paper we identify the class of cluster algebras that satisfy B(Q)=A(Q), which contains almost every quiver of finite mutation type. In the process of proving the main theorem, we provide a classification of quivers mutation classes based on their weights. Some properties of symmetric mutation subalgebras are given.