Unified Geometric, Fuzzy, and Computational Framework for Ternary Gamma Semirings
Abstract
Aim. This paper (Paper D) unifies the ideal-theoretic, computational, and homological layers developed in Papers A (Rao 2025), B (Rao 2025), and C (Rao 2025) into a geometric framework that includes fuzzy and computational geometries on the spectrum SpecG(T) and derived invariants in TGMod. Scope. We construct structure sheaves and Grothendieck topologies adapted to ternary G-products, develop fuzzy and weighted sites, and prove dualities bridging primitive spectra, Schur-density embeddings, and derived functors Ext and Tor. Outcomes. We obtain comparison theorems between radical/primitive strata and cohomological supports, and supply computable criteria and algorithms for finite models.
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