Unitary Easy Quantum Groups Arising as Quantum Symmetry of Graph C*-algebras

In 2009, T. Banica and R. Speicher introduced the orthogonal easy quantum group which can be completely determined using the combinations of set partitions. Later, P. Tarrago and M. Weber extended this formulation to another special class of compact matrix quantum groups, known as unitary easy quantum groups, which are quantum subgroups of the free unitary quantum group (Uₙ^+) containing Sₙ. On the other hand, the quantum symmetry of graph C^*-algebras has been explored by several mathematicians within different categories in the past few years. In this article, we establish that there are exactly three families of unitary easy quantum groups that can be achieved as the quantum symmetry of graph C^*-algebra C^* () associated with a finite, connected, directed graph in the category introduced by Joardar and Mandal. Moreover, we demonstrate that there does not exist any graph C^*-algebra associated with a finite, connected, directed graph having Aₔ㵶 (F^) as the quantum automorphism group of C^* () for non-scalar matrix F^.