Rigorous Geometric Obstructions for Fourier Curves Generated by Prime Numbers

Abstract

We study planar curves defined by finite Fourier series of the form Fn(t)=Σp n vp(n!)\, ei p t, where the frequencies are the prime numbers and vp(n!) denotes the exponent of the prime p in the factorization of n!. We establish several rigorous obstructions to uniform geometric regularity as n∞. In particular, we prove that the curve lengths grow without bound, that neither the first nor the second derivatives remain uniformly bounded, and that the diameters grow at least on the order of n n. As a consequence, the covering numbers of the curves satisfy explicit quantitative lower bounds. These results provide a rigorous explanation for the complex geometric behavior observed in numerical investigations of this model.