Covering integers by x2 + dy2
Abstract
What proportion of integers n ≤slant N may be expressed as x2 + dy2 for some d ≤slant , with x,y integers? Writing as ( N) 2 2α N for some α ∈ (-∞, ∞), we show that the answer is (α) + o(1), where is the Gaussian distribution function (α) = 12π ∫α-∞ e-x2/2 dx. A consequence of this is a phase transition: almost none of the integers n ≤slant N can be represented by x2 + dy2 with d ≤slant ( N) 2 - , but almost all of them can be represented by x2 + dy2 with d ≤slant ( N) 2 + .
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