Salvato in:
Dettagli Bibliografici
Autori principali: Velez, Juan D., Cadavid, Carlos
Natura: Preprint
Pubblicazione: 2026
Soggetti:
Accesso online:https://arxiv.org/abs/2602.07638
Tags: Aggiungi Tag
Nessun Tag, puoi essere il primo ad aggiungerne!!
_version_ 1866910015363743744
author Velez, Juan D.
Cadavid, Carlos
author_facet Velez, Juan D.
Cadavid, Carlos
contents We study truncation compatible families F = (F_m)_{m>=1} over Q[z] through an inverse limit formalism, and we evaluate them at the punctured cyclotomic cosine points alpha_{k,n} = cos(2 pi k/n) with the specialization z equals n-1. For symmetric families of uniformly bounded total degree in x <= d, we prove a stable range rigidity theorem: for all n >= d+2, the cosine point evaluation factors through the finitely many punctured cosine power sums the finitely many power sums P1(n) through Pd(n). In the purely polynomial case this implies eventual polynomiality in n. We then extend the framework to include fixed product factors and package their cosine point contribution in multiplicative invariants MQ(n). In the stable range, the bounded degree symmetric part collapses as before; any remaining cyclotomic dependence occurs only through these explicit product terms. Finally, we show that coefficient extraction from such products produces further bounded degree symmetric families, and we apply this to complete symmetric functions h_r evaluated at cosine points.
format Preprint
id arxiv_https___arxiv_org_abs_2602_07638
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Inverse-Limit Formulas and Stable-Range Rigidity for Cyclotomic Sums
Velez, Juan D.
Cadavid, Carlos
Combinatorics
11L03
We study truncation compatible families F = (F_m)_{m>=1} over Q[z] through an inverse limit formalism, and we evaluate them at the punctured cyclotomic cosine points alpha_{k,n} = cos(2 pi k/n) with the specialization z equals n-1. For symmetric families of uniformly bounded total degree in x <= d, we prove a stable range rigidity theorem: for all n >= d+2, the cosine point evaluation factors through the finitely many punctured cosine power sums the finitely many power sums P1(n) through Pd(n). In the purely polynomial case this implies eventual polynomiality in n. We then extend the framework to include fixed product factors and package their cosine point contribution in multiplicative invariants MQ(n). In the stable range, the bounded degree symmetric part collapses as before; any remaining cyclotomic dependence occurs only through these explicit product terms. Finally, we show that coefficient extraction from such products produces further bounded degree symmetric families, and we apply this to complete symmetric functions h_r evaluated at cosine points.
title Inverse-Limit Formulas and Stable-Range Rigidity for Cyclotomic Sums
topic Combinatorics
11L03
url https://arxiv.org/abs/2602.07638