Saved in:
Bibliographic Details
Main Author: The Clankers
Format: Recurso digital
Language:
Published: Zenodo 2026
Online Access:https://doi.org/10.5281/zenodo.19120905
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866901564256419840
author The Clankers
author_facet The Clankers
contents <p>We extend the baseline globalization theory of the split-zero semiring S = G(R) = R ⊔ {τ}, with operations r ⊕ s = r + s, r ⊕ τ = r, τ ⊕ τ = τ, rs = rs, rτ = τr = τ, τ² = τ, for a nonzero commutative ring R with identity. Throughout, we assume the results of the companion note: the ring reflection pᵣ, the support character χᵣ, the classification of ideals, prime ideals, congruences, and localizations, and the supported-zero projector νᵣ(x) = 0ᵣx.</p> <p>The main results are the exact classification of G(R)-semimodules as join-semilattice-indexed diagrams of R-modules; the identification of the cancellative subcategory with R-Mod; the Boolean-cubical form of free semimodules; the product theorem G(A × B) ≅ G(A) ×_ G(B); reconstruction from the multiplicative monoid together with the missing additive relations; the infinite-dimensionality of the multiplicative-monoid spectrum in the UFD case; the contracted monoid-algebra decomposition; conservative ideal/class/factorization results; and the full all-orders deformation theory of the shifted quotient-size zeta sheet, including universal jets, cumulants, arithmetic kernels, non-Eulerianity, Faulhaber interpolation, factorial interpolation, and the exact endpoint defect controlled by a two-point Stone model.</p>
format Recurso digital
id zenodo_https___doi_org_10_5281_zenodo_19120905
institution Zenodo
language
publishDate 2026
publisher Zenodo
record_format zenodo
spellingShingle A Secondary Note on Split-Zero Globalization: Semimodule Classification, Multiplicative Reconstruction, and All-Orders Zeta Deformation
The Clankers
<p>We extend the baseline globalization theory of the split-zero semiring S = G(R) = R ⊔ {τ}, with operations r ⊕ s = r + s, r ⊕ τ = r, τ ⊕ τ = τ, rs = rs, rτ = τr = τ, τ² = τ, for a nonzero commutative ring R with identity. Throughout, we assume the results of the companion note: the ring reflection pᵣ, the support character χᵣ, the classification of ideals, prime ideals, congruences, and localizations, and the supported-zero projector νᵣ(x) = 0ᵣx.</p> <p>The main results are the exact classification of G(R)-semimodules as join-semilattice-indexed diagrams of R-modules; the identification of the cancellative subcategory with R-Mod; the Boolean-cubical form of free semimodules; the product theorem G(A × B) ≅ G(A) ×_ G(B); reconstruction from the multiplicative monoid together with the missing additive relations; the infinite-dimensionality of the multiplicative-monoid spectrum in the UFD case; the contracted monoid-algebra decomposition; conservative ideal/class/factorization results; and the full all-orders deformation theory of the shifted quotient-size zeta sheet, including universal jets, cumulants, arithmetic kernels, non-Eulerianity, Faulhaber interpolation, factorial interpolation, and the exact endpoint defect controlled by a two-point Stone model.</p>
title A Secondary Note on Split-Zero Globalization: Semimodule Classification, Multiplicative Reconstruction, and All-Orders Zeta Deformation
url https://doi.org/10.5281/zenodo.19120905