Homotopical Foundations of Ternary Gamma Modules and Higher Structural Invariants

Abstract

We establish a foundational homotopical framework for ternary -modules by establishing that T-Mod is a Barr-exact, monoidal closed category. We resolve the long-standing "additivity obstruction" in non-binary algebra by constructing a cofibrantly generated Quillen model structure on the simplicial category s(T-Mod). Our central discovery is that the derived category D(T-Mod) constitutes a 3-angulated category, where the derived periodicity is governed by triadic quadrilaterals rather than binary triangles. We derive the 3-ary long exact sequence and characterize the connecting morphisms as invariants of the -parameter space. This framework provides a rigorous homological bridge to Nambu mechanics and absolute geometry over F1.