Perfect state transfer in Grover walks on dihedral Cayley graphs

Abstract

The paper investigates perfect state transfer (PST) in Grover walks on Cayley graphs over the dihedral group Dn. The Grover walk is a discrete-time quantum walk widely studied in quantum information processing. A Cayley graph Cay(,S) is called normal if S is the union of some conjugacy classes of the group ; otherwise, it is called non-normal. Most existing studies have been restricted to Cayley graphs over abelian groups. In contrast, we investigate both normal and non-normal cases for Cayley graphs over the non-abelian group Dn. By examining the parity of n and the normality of the Cayley graph, we obtain a complete characterization of PST on Cay(Dn,S). In particular, we establish necessary and sufficient conditions for the occurrence of PST in all possible cases, and prove that PST does not occur for normal Cayley graphs when n is odd. Furthermore, we construct several infinite families of normal and non-normal Cayley graphs Cay(Dn,S) that exhibit PST, illustrating the application of the main result. Our approach is based on the representation theory of the dihedral group.