Quadratic residues and quartic residues modulo primes
Abstract
In this paper we study some products related to quadratic residues and quartic residues modulo primes. Let p be an odd prime and let A be any integer. We mainly determine completely the product fp(A):=Π1 i,j(p-1)/2 p i2-Aij-j2(i2-Aij-j2) modulo p; for example, if p14 then fp(A)cases-(A2+4)(p-1)/4 p&if\ (A2+4p)=1, \\(-A2-4)(p-1)/4 p&if\ (A2+4p)=-1,cases where (·p) denotes the Legendre symbol. We also determine Π(p-1)/2i,j=1 p 2i2+5ij+2j2(2i2+5ij+2j2) \ and\ Π(p-1)/2i,j=1 p 2i2-5ij+2j2(2i2-5ij+2j2) modulo p.
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