Residuated Park Theories

Abstract

When L is a complete lattice, the collection L of all monotone functions Lp Ln, n,p ≥ 0, forms a Lawvere theory. We enrich this Lawvere theory with the binary supremum operation , an operation of (left) residuation and the parameterized least fixed point operation . We exhibit a system of equational axioms which is sound and proves all valid equations of the theories L involving only the theory operations, and , i.e., all valid equations not involving residuation. We also present an alternative axiomatization, where is replaced by a star operation, and provide an application to regular tree languages.