Gauss Circle Primes (2502.06804v1)

Abstract: Given a circle of radius $r$ centered at the origin, the Gauss Circle Problem concerns counting the number of lattice points $C(r)$ within this circle. It is known that as $r$ grows large, the number of lattice points approaches $\pi r^2$, that is, the area of the circle. The present research is to study how often $C(r)$ will return a prime number of lattice points for $r \leq n$. The Prime Number Theorem predicts that the number of primes less than or equal to $n$ is asymptotic to $\frac{n}{\log n}$. We find that the number of Gauss Circle Primes for $r \leq n$ is also of order $\frac{n}{\log n}$ for $n \leq 2 \times 10^6$. We include a heuristic argument that the Gauss Circle Primes can be approximated by $\frac{n}{\log n}$.