Spectra of Hadamard matrices

Abstract

A Butson Hadamard matrix H has entries in the kth roots of unity, and satisfies the matrix equation HH = nIn. We write BH(n, k) for the set of such matrices. A complete morphism of Butson matrices is a map BH(n, k) → BH(m, ). In this paper, we develop a technique for controlling the spectra of certain Hadamard matrices. For each integer t, we construct a real Hadamard matrix Ht of order nt = 22t-1-1 such that the minimal polynomial of 1ntHt is the cyclotomic polynomial 2t+1(x). Such matrices yield new examples of complete morphisms \[ BH(n, 2t) → BH(22t-1-1n, 2)\,, \] for each t ≥ 2, generalising a well-known result of Turyn.