Quantum Automorphism Group of Direct Sum of Cuntz Algebras

Abstract

In this article, we explore the quantum symmetry of the direct sum of a finite family of Cuntz algebras \Oni \i=1m, viewing them as graph C*-algebras associated to the graphs \Lni\i=1m (where Ln denotes the graph containing n loops based at a single vertex), in the category introduced by Joardar and Mandal. It has been shown that the quantum automorphism group of the direct sum of non-isomorphic Cuntz algebras is Un1+*Un2+* ·s *Unm+ for distinct ni's, i.e. equation* QτLin(i=1m ~ Lni) *i=1m ~~ QτLin(Lni) Un1+*Un2+* ·s *Unm+, equation* where QτLin() denotes the quantum automorphism group of the graph C*-algebra associated to . Also, the quantum automorphism group of the direct sum of m copies of isomorphic Cuntz algebra On is Un+ * Sm+, i.e. equation* QτLin(i=1m ~ Ln) QτLin(Ln) * Sm+ Un+ * Sm+. equation* Furthermore, we have provided counter-examples to demonstrate that the isomorphisms mentioned above cannot be generalized to arbitrary graph C*-algebras, whereas analogous relations can be extended in the context of quantum automorphism groups of graphs in the sense of Banica and Bichon.