Ethic Duality: A Homological Framework for Primal-Dual Problems

Abstract

We develop a homological duality framework based on a contravariant functor D=HomE(-,R) with dualizing object R. A morphism is called ethic when it satisfies the canonical double-dual compatibility D2(f)η=η f. In the derived setting, the functor RHomE(-,R) produces a graded family of Ext-groups that measure all failures of this compatibility. The first layer Ext1 identifies primal-dual gaps, while higher Extk provide a systematic hierarchy of derived obstructions to exactness. This formulation specializes uniformly across several classical domains. In linear and conic optimization, Farkas- and Slater-type exactness criteria correspond to the vanishing of Ext1, and integer duality gaps coincide with torsion Ext-classes. In graph theory, Kirchhoff- and Baker-Norine-type dualities arise as instances of ethic exactness. In dynamical systems, the higher derived layers encode nonvanishing persistence phenomena. Additional examples include social-choice configurations, categorical factorization in scattering formalisms, coding-theoretic duality, and Bellman-type recurrences, all appearing as concrete instances of Ext-controlled exactness. All resulting invariants are stable under derived Morita equivalence and depend only on the dualizing pair (E,R). The framework therefore provides a substrate-independent criterion for primal-dual exactness and a uniform homological description of its obstructions.

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