Real mutually unbiased bases and representations of groups of odd order by real scaled Hadamard matrices of 2-power size

Abstract

We prove the following two results relating real mutually unbiased bases and representations of finite groups of odd order. Let q be a power of 2 and r a positive integer. Then we can find a q2r× q2r real orthogonal matrix D, say, of multiplicative order q2r-1+1, whose q2r-1+1 powers D, …, Dq2r-1+1=I define q2r-1+1 mutually unbiased bases in Rq2r. Thus the scaled matrices qrD, …, qrDq2r-1 are q2r-1 different Hadamard matrices. When we take q=2, we achieve the maximum number of real mutually unbiased bases in dimension 22r using the elements of a cyclic group. We also prove the following. Let G be an arbitrary finite group of odd order 2k+1, where k≥ 3. Then G has a real representation R, say, of degree 22k-1 such that the elements R(σ), σ∈ G, define |G| mutually unbiased bases in Rd, where d= 22k-1. In addition, a group of order 5 defines five real mutually unbiased bases in R16 and a group of order 3 defines three real mutually unbiased bases in R4. Thus, an arbitrary group of odd order has a faithful representation by real scaled Hadamard matrices of 2-power size.