Pseudo grading on cluster automorphism group with application to cluster algebras of rank 3
Abstract
We introduce a pseudo N-grading on the cluster auotmorphism group Aut(A) with respect to an initial seed of A, which consists of a family of subsets \Gi\i∈ N of Aut(A) such that Aut(A)=i∈ NGi and Gk· Gl⊂ i=0k+lGi. We prove that Aut(A) is generated by G0 G1, leading to an elementary approach for calculating cluster automorphism groups of certain cluster algebras. As an application, we completely determined the cluster automorphism groups of cluster algebras of rank 3 with indecomposable exchange matrices.
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