A proof system for the positive fragment of GL

Abstract

In this paper, we present a proof system GL+, which is based on a sequent system K+ given by Dunn, for the positive fragment of GL. Positive modal formulas are modal formulas that contain neither negation symbols nor implication symbols. More precisely, they are modal formulas constructed from the connectives , , , , , , and propositional variables. The logic GL is the least normal modal logic that contains K and the Löb formula ( p⊃ p)⊃ p. Following Dunn, a sequent is an expression of the form ϕψ, where ϕ and ψ are positive modal formulas. We present a proof system GL+ for sequents with the property that a sequent ϕψ is provable in GL+, if and only if ϕ⊃ψ is provable in GL.