On generalized Legendre matrices involving roots of unity over finite fields

Abstract

In this paper, motivated by the work of Chapman, Vsemirnov and Sun et al., we investigate some arithmetic properties of the generalized Legendre matrices over finite fields. For example, letting a1,·s,a(q-1)/2 be all non-zero squares in the finite field Fq which contains q elements with 2 q, we give the explicit value of D(q-1)/2=[(ai+aj)(q-3)/2]1 i,j (q-1)/2. In particular, if q=p is a prime greater than 3, then ( D(p-1)/2p)= cases 1 & if\ p14, (-1)(h(-p)+1)/2 & if\ p 34\ and\ p>3, cases where (·/p) is the Legendre symbol and h(-p) is the class number of Q(-p).