A General Verification for Functional Completeness by Abstract Operators

Abstract

An operator set is functionally incomplete if it can not represent the full set ,,,→,. The verification for the functional incompleteness highly relies on constructive proofs. The judgement with a large untested operator set can be inefficient. Given with a mass of potential operators proposed in various logic systems, a general verification method for their functional completeness is demanded. This paper offers an universal verification for the functional completeness. Firstly, we propose two abstract operators R and R, both of which have no fixed form and are only defined by several weak constraints. Specially, R≥ and R≥ are the abstract operators defined with the total order relation ≥. Then, we prove that any operator set R is functionally complete if and only if it can represent the composite operator R≥R≥ or R≥R≥. Otherwise R is determined to be functionally incomplete. This theory can be generally applied to any untested operator set to determine whether it is functionally complete.