Angular distribution towards the points of the neighbor-flips modular curve seen by a fast moving observer
Abstract
Let h be a fixed non-zero integer. For every t∈ R+ and every prime p, consider the angles between rays from an observer located at the point (-tJp2,0) on the real axis towards the set of all integral solutions (x,y) of the equation y-1-x-1 h p in the square [-Jp,Jp]2, where Jp=(p-1)/2. We prove the existence of the limiting gap distribution for this set of angles as p→ ∞, providing explicit formulas for the corresponding density function, which turns out to be independent of h.
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