Sums of the triple divisor function over values of a ternary quadratic form
Abstract
Let τ3(n) be the triple divisor function which is the number of solutions of the equation d1d2d3=n in natural numbers. It is shown that Σ1≤ n1,n2,n3≤ xτ3(n12+n22+n32)=c1x32( x)2+ c2x32 x +c3x32 +O(x118+) for some constants c1, c2 and c3.
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