On some determinants arising from quadratic residues
Abstract
Let p>3 be a prime, and let d∈ Z with p d. For the determinants Sm(d,p)=[(i2+dj2)m]1≤slant i,j ≤slant (p-1)/2\ \ (p-12≤slant m≤slant p-1), Sun recently determined Sm(d,p) modulo p when m∈\p-2,p-3\ and ( -dp)=-1. In this paper, we obtain Sp-2(d,p) modulo p in the remaining case (-dp)=1, and determine the Legendre symbols (Sp-3\,(d,p)p) and (Sp-4\,(d,p)p) in some special cases.
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