The Quartic Residues Latin Square

Abstract

We establish an elementary, but rather striking pattern concerning the quartic residues of primes p that are congruent to 5 modulo 8. Let g be a generator of the multiplicative group of Zp and let M be the 4× 4 matrix whose (i+1),(j+1)-th entry is the number of elements x of Zp of the form x gk p where k i 4 and 4x/p = j, for i,j=0,1,2,3. We show that M is a Latin square, provided the entries in the first row are distinct, and that M is essentially independent of the choice of g. As an application, we prove that the sum in Z of the quartic residues is p5(M11+2M12+3M13+4M14).