Zariski Topology and Cohomology for Commutative Ternary Gamma Semirings

Abstract

This paper develops the algebraic foundation required to build a Zariski-type geometry for commutative ternary -semirings, where multiplication is an inherently triadic, multi-parametric interaction (a,b,c,γ)\abc\γ. Rather than treating triadic multiplication as an optional variation of binary algebra, we adopt it as an algebraic necessity for modeling systems whose elementary interactions are intrinsically three-body and whose operational modes are indexed by parameters . We construct the prime spectrum (T) and its Zariski topology, prove functoriality, and build the structure sheaf _(T) via local fraction descriptions that must simultaneously respect triadic associativity and the sheaf gluing axioms. A key technical point is ensuring that local representations by ternary-parametric fractions glue uniquely, despite the absence of a binary product and despite the parameter dependence of the multiplication law. We then define sheaves of -modules, quasi-coherent sheaves associated to algebraic modules, and the cohomology groups Hi(X,) as derived functors of global sections. Finally, we give a concrete finite structural example (a ternary -version of Z/nZ) and compute its -spectrum explicitly, thereby exhibiting nontrivial spectral behavior in a fully finite setting.

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