Cylindric quasi-implication algebras

Abstract

In this note, we study the operation of Sasaki hook within the setting of quantum cylindric algebras by introducing cylindric quasi-implication algebras. It is first demonstrated that every quantum cylindric algebra can be converted into a cylindric quasi-implication algebra and conversely that every cylindric quasi-implication algebra gives rise to a quantum cylindric algebra. These constructions are then shown to induce an isomorphism between the category CQIA of cylindric quasi-implication algebras and the category QCA of quantum cylindric algebras. We then give two alternative constructions of a cylindric orthoframe XA from a cylindric quasi-implication algebra A. The first construction of XA arises via the non-zero elements of A and generalizes the construction given by Harding in the setting of cylindric ortholattices from the perspective of MacNeille completions. The second construction of XA arises via the proper filters of A and generalizes the construction given by McDonald in the setting of cylindric ortholattices from the perspective of canonical completions.

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