Spectral mapping theorem of an abstract quantum walk

Abstract

Given two Hilbert spaces, H and K, we introduce an abstract unitary operator U on H and its discriminant T on K induced by a coisometry from H to K and a unitary involution on H. In a particular case, these operators U and T become the evolution operator of the Szegedy walk on a graph, possibly infinite, and the transition probability operator thereon. We show the spectral mapping theorem between U and T via the Joukowsky transform. Using this result, we have completely detemined the spectrum of the Grover walk on the Sierpi\'nski lattice, which is pure point and has a Cantor-like structure.