1. Residuation algebras with functional duals
- Author
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Wesley Fussner, Alessandra Palmigiano, and Management and Organisation
- Subjects
Pure mathematics ,Class (set theory) ,Algebra and Number Theory ,Interpretation (logic) ,010102 general mathematics ,Canonical extensions ,0102 computer and information sciences ,Mathematics - Logic ,01 natural sciences ,010201 computation theory & mathematics ,FOS: Mathematics ,Residuation algebras ,Dual polyhedron ,0101 mathematics ,Variety (universal algebra) ,Algebra over a field ,Logic (math.LO) ,Definability of functionality ,Mathematics - Abstract
We employ the theory of canonical extensions to study residuation algebras whose associated relational structures are functional, i.e., for which the ternary relations associated to the expanded operations admit an interpretation as (possibly partial) functions. Providing a partial answer to a question of Gehrke, we demonstrate that functionality is not definable in the language of residuation algebras (or even residuated lattices), in the sense that no equational or quasi-equational condition in the language of residuation algebras is equivalent to the functionality of the associated relational structures. Finally, we show that the class of Boolean residuation algebras such that the atom structures of their canonical extensions are functional generates the variety of Boolean residuation algebras.
- Published
- 2019