Solutions of x12+x22-x32=n2 with small x3
Abstract
Friedlander and Iwaniec investigated integral solutions (x1,x2,x3) of the equation x12+x22-x32=D, where D is square-free and satisfies the congruence condition D 58. They obtained an asymptotic formula for solutions with x3 M, where M is much smaller than D. To be precise, their condition is M D1/2-1/1332. Their analysis led them to averages of certain Weyl sums. The condition of D being square-free is essential in their work. We investigate the "opposite" case when D=n2 is a square of an odd integer n. This case is different in nature and leads to sums of Kloosterman sums. We obtain an asymptotic formula for solutions with x3 M, where M D1/2-1/16+ for any fixed >0.
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