Rotation Symmetries of Sequential Matrices with Applications to the Jacobi Symbol

Abstract

Suppose that p is an odd prime and ()·p denotes the Legendre symbol modulo p. If p is has the form p= n2+1 then one easily verifies that ()ap = ()-ap for all a∈ Z/p Z. We identify various symmetry properties of sequential matrices over Z/(n2+1) Z regardless of whether n2+1 is prime. We deduce from these results a collection of symmetries involving Jacobi symbol modulo n2+1 which generalize our above observation on the Legendre symbol.