Bilinear Forms on Finite Abelian Groups and Group-Invariant Butson Hadamard Matrices

Abstract

Let K be a finite abelian group and let (K) denote the least common multiple of the orders of the elements of K. A BH(K,h) matrix is a K-invariant |K|× |K| matrix H whose entries are complex hth roots of unity such that HH*=|K|I, where H* denotes the complex conjugate transpose of H, and I is the identity matrix of order |K|. Let p(x) denote the p-adic valuation of the integer x. Using bilinear forms on K, we show that a BH(K,h) exists whenever (i) p(h) ≥ p((K))/2 for every prime divisor p of |K| and (ii) 2(h) 2 if 2(|K|) is odd and K has a direct factor Z2. Employing the field descent method, we prove that these conditions are necessary for the existence of a BH(K,h) matrix in the case where K is cyclic of prime power order.