Fel's Conjecture on Syzygies of Numerical Semigroups

Abstract

Let S= d1,…,dm be a numerical semigroup and k[S] its semigroup ring. The Hilbert numerator of k[S] determines normalized alternating syzygy power sums Kp(S) encoding alternating power sums of syzygy degrees. Fel conjectured an explicit formula for Kp(S), for all p 0, in terms of the gap power sums Gr(S)=Σg S gr and universal symmetric polynomials Tn evaluated at the generator power sums σk=Σi dik (and δk=(σk-1)/2k). We prove Fel's conjecture via exponential generating functions and coefficient extraction, solating the universal identities for Tn needed for the derivation. The argument is fully formalized in Lean/Mathlib, and was produced automatically by AxiomProver from a natural-language statement of the conjecture.