New Constructions of Group-Invariant Butson Hadamard Matrices

Abstract

Let G be a finite group and let h be a positive integer. A BH(G,h) matrix is a G-invariant |G|× |G| matrix H whose entries are complex hth roots of unity such that HH*=|G|I|G|, where H* denotes the complex conjugate transpose of H, and I|G| is the identity matrix of order |G|. In this paper, we give three new constructions of BH(G,h) matrices. The first construction is the first known family of BH(G,h) matrices in which G does not need to be abelian. The second and the third constructions are two families of BH(G,h) matrices in which G is a finite local ring.