Parity properties of Costas arrays defined via finite fields

Abstract

A Costas array of order n is an arrangement of dots and blanks into n rows and n columns, with exactly one dot in each row and each column, the arrangement satisfying certain specified conditions. A dot occurring in such an array is even/even if it occurs in the i-th row and j-th column, where i and j are both even integers, and there are similar definitions of odd/odd, even/odd and odd/even dots. Two types of Costas arrays, known as Golomb-Costas and Welch-Costas arrays, can be defined using finite fields. When q is a power of an odd prime, we enumerate the number of even/even odd/odd, even/odd and odd/even dots in a Golomb-Costas array. We show that three of these numbers are equal and they differ by 1 from the fourth. For a Welch-Costas array of order p-1, where p is an odd prime, the four numbers above are all equal to (p-1)/4 when p 14, but when p 34, we show that the four numbers are defined in terms of the class number of the imaginary quadratic field Q(-p), and thus behave in a much less predictable manner.