Exact Categories and Homological Foundations of Non-Commutative n-ary Gamma. Semirings

TL;DR

This paper develops the homological and geometric foundations for non-commutative n-ary Gamma-semirings, unifying Gamma-geometry and spectral theory within a categorical and homological framework.

Contribution

It introduces new categories of Gamma-modules, constructs resolutions, and extends homological tools to non-commutative Gamma-spectra, establishing a foundational framework.

Findings

Categories of Gamma-modules are additive and exact.

Constructed projective and injective resolutions.

Extended homological tools like Ext and Tor to non-commutative Gamma-geometry.

Abstract

This paper establishes the homological and geometric foundations of non-commutative n-ary Gamma-semirings, unifying two previously distinct directions in Gamma-algebra: the derived Gamma-geometry developed for the commutative ternary case and the structural and spectral theory for general non-commutative n-ary systems. We introduce categories of left, right, and bi-Gamma-modules that respect positional asymmetry and prove that they form additive and exact categories in Quillen's sense. Within this setting, we construct projective and injective resolutions, define the derived functors Ext^Gamma and Tor_Gamma, and establish long exact sequences and spectral balance theorems in the n-ary regime. By extending sheaf-theoretic and homological tools to the non-commutative Gamma-spectrum Spec_Gamma^nc(T), we obtain a coherent framework of non-commutative derived Gamma-geometry that parallels the classical paradigms of Grothendieck and Kontsevich in homological algebra and non-commutative geometry. The framework developed here establishes the foundational exact-categorical and homological structures that enable Morita-type analyses and spectral interpretations in the subsequent parts of this series.