Non-symmetric class 2 association schemes obtained by doubling of skew-Hadamard matrices are non-schurian

Abstract

We can obtain a non-symmetric class 2 association scheme by a skew-Hadamard matrix. We begin with a skew-Hadamard matrix of order n, construct a skew-Hadamard matrix of order 2n by doubling construction, and a non-symmetric class 2 association scheme of order 2n-1. We will show that the association scheme obtained in this way never be schurian if n is greater than or equal to 8.