Convenience constructor for creating axioms of the form A |- A.
Convenience constructor for creating axioms of the form A |- A.
The formula on both sides of the sequent.
Creates an axiom consisting of the antecedent ant and the succeedent suc. ant and suc have to have a shared formula. The rule: ------------(Axiom) ant |- suc
Creates an axiom consisting of the antecedent ant and the succeedent suc. ant and suc have to have a shared formula. The rule: ------------(Axiom) ant |- suc
The antecedent the axiom.
The succedent of the axiom.
The LKProof consisting of (ant |- suc) as its axiom.
Creates an axiom with the sequent seq (consisting of the antecedent sL and the succedent sR). sL and sR have to have a shared formula. The rule: ------------(Axiom) sL |- sR
Creates an axiom with the sequent seq (consisting of the antecedent sL and the succedent sR). sL and sR have to have a shared formula. The rule: ------------(Axiom) sL |- sR
The sequent of the axiom.
The LKProof consisting of s1 as its axiom.