The Collision Spectrum

Abstract

For a prime base b and primitive odd Dirichlet character modulo b2, the collision transform coefficient S() admits an exact factorization: \[ S() = -B1, · SG()φ(b2), \] where B1, is the generalized first Bernoulli number and SG() is the diagonal character sum. By the standard Bernoulli--L-value formula, |B1| = (b/π)\, |L(1, )|, so the collision invariant's Fourier spectrum encodes L-function special values. A Parseval identity gives an exact formula for the weighted second moment Σ |L(1, )|2 · |SG()|2 in terms of the collision invariant's values on the finite group. The digit function computes this L-value moment exactly. Under a conditional zero-free hypothesis, the triangle inequality yields a separate bound connecting L(1) to L(s) for s in the critical strip. At base~5, the factorization gives |S| |L(1)|2 exactly. For quadratic characters in the family, the decomposition specializes to class-number data.

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