How many times do we need and assumption ?

Published 3 May 2014 in cs.LO | (1405.0541v1)

Abstract: In this article we present a class of formulas Fn, n in Nat, that need at least 2ⁿ assumptions to be proved in a normal proof in Natural Deduction for purely implicational minimal propositional logic. In purely implicational classical propositional logic, with Peirce's rule, each Fn is proved with only one assumption in Natural Deduction in a normal proof. Hence, the formulas Fn have exponentially sized proofs in cut-free Sequent Calculus and Tableaux. In fact 2ⁿ is the lower-bound for normal proofs in ND, cut-free Sequent proofs and Tableaux. We discuss the consequences of the existence of this class of formulas for designing automatic proof-procedures based on these deductive systems.