Schinzel's theorem

In the geometry of numbers, Schinzel's theorem is the following statement:

It was originally proved by and named after Andrzej Schinzel.^[1][2]

Schinzel proved this theorem by the following construction. If ${\displaystyle n}$ is an even number, with ${\displaystyle n=2k}$, then the circle given by the following equation passes through exactly ${\displaystyle n}$ points:^[1][2] $${\displaystyle {(x-\frac{1}{2})}^2+y^2=\frac{1}{4}{5}^{k-1}.}$$ This circle has radius ${\displaystyle 5^{(k-1)/2}/2}$, and is centered at the point ${\displaystyle (\frac{1}{2},0)}$. For instance, the figure shows a circle with radius ${\displaystyle \sqrt{5}/2}$ through four integer points.

Multiplying both sides of Schinzel's equation by four produces an equivalent equation in integers, $${\displaystyle {(2x-1)}^2+(2y{)}^2=5^{k-1}.}$$ This writes ${\displaystyle 5^{k-1}}$ as a sum of two squares, where the first is odd and the second is even. There are exactly ${\displaystyle 4k}$ ways to write ${\displaystyle 5^{k-1}}$ as a sum of two squares, and half are in the order (odd, even) by symmetry. For example, ${\displaystyle 5^1=(\pm 1{)}^2+(\pm 2{)}^2}$, so we have ${\displaystyle 2x-1=1}$ or ${\displaystyle 2x-1=-1}$, and ${\displaystyle 2y=2}$ or ${\displaystyle 2y=-2}$, which produces the four points pictured.

On the other hand, if ${\displaystyle n}$ is odd, with ${\displaystyle n=2k+1}$, then the circle given by the following equation passes through exactly ${\displaystyle n}$ points:^[1][2] $${\displaystyle {(x-\frac{1}{3})}^2+y^2=\frac{1}{9}{5}^{2k}.}$$ This circle has radius ${\displaystyle 5^k/3}$, and is centered at the point ${\displaystyle (\frac{1}{3},0)}$.

The circles generated by Schinzel's construction are not the smallest possible circles passing through the given number of integer points,^[3] but they have the advantage that they are described by an explicit equation.^[2]

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