On a polynomial involving quadratic residues modulo primes
Abstract
Let p be an odd prime, and define Gp(x)=Πk=1(p-1)/2(x-e2π i k2/p). In this paper we study values of Gp(x) at roots of unity via Galois theory, and confirm some previous conjectures. For example, for any primitive tenth root ζ of unity, we prove that Gp(ζ)=cases(-1)|\1 k p+910:\ ( kp)=-1\| &if\ p2140, \\(-1)|\1 k p+110:\ ( kp)=-1\|ζ2&if\ p 2940, cases where ( kp) denotes the Legendre symbol.
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