Extensions of posets with an antitone involution to residuated structures

Abstract

We prove that every not necessarily bounded poset P=(P,,') with an antitone involution can be extended to a residuated poset E(P)=(E(P),,,→,1) where x'=x→0 for all x∈ P. If P is a lattice with an antitone involution then E(P) is a lattice, too. We show that a poset can be extended to a residuated poset by means of a finite chain and that a Boolean algebra (B,,,',p,q) can be extended to a residuated lattice (Q,,,,→,1) by means of a finite chain in such a way that x y=x y and x→ y=x' y for all x,y∈ B.