Unified correspondence as a proof-theoretic tool

Abstract: The present paper aims at establishing formal connections between correspondence phenomena, well known from the area of modal logic, and the theory of display calculi, originated by Belnap.These connections have been seminally observed and exploited by Marcus Kracht, in the context of his characterization of the modal axioms (which he calls primitive formulas) which can be effectively transformed into 'analytic' structural rules of display calculi. In this context, a rule is 'analytic' if adding it to a displa… Show more

“…A general solution which establishes the conservativity of display calculi for tense logics over their modal fragments, by making use of algebraic semantics, has been presented in [17]. Our work here obtains this result syntactically in the context of tense logics with modal general path axioms by exploiting the translations developed in the previous sections (i.e., corollary 4.5): As shown in [15], this result can also by proved syntactically for the more restricted set of modal path axioms by leveraging the separation property.…”

From Display to Labelled Proofs for Tense Logics

“…A general solution which establishes the conservativity of display calculi for tense logics over their modal fragments, by making use of algebraic semantics, has been presented in [17]. Our work here obtains this result syntactically in the context of tense logics with modal general path axioms by exploiting the translations developed in the previous sections (i.e., corollary 4.5): As shown in [15], this result can also by proved syntactically for the more restricted set of modal path axioms by leveraging the separation property.…”

From Display to Labelled Proofs for Tense Logics

“…Definition 6. An abstract Kent algebra (aKa) is a structure A = (L, s , s , ℓ , ℓ ) such that L is a lattice, and s , s , ℓ , ℓ are unary operations on L validating (11), (12) and (13). We let KA denote the class of abstract Kent algebras.…”

“…The inequality corresponding to the lower variant of IA3, which was analytic in the presence of distributivity, is not analytic inductive in the absence of distributivity (cf. [12,Definition 55]). However, the inequality corresponding to the upper variant of IA3 is analytic inductive, and hence can be captured in terms of an analytic structural rule.…”

Logics for Rough Concept Analysis

“…To conclude, a proof theory for axiomatic extensions and expansions of general lattice logic is comparably not as modular as that of the axiomatic extensions and expansions of the logic of distributive lattices, which can rely on the theory of proper display calculi [50,38]. The idea guiding the approach of the present paper, which we will elaborate upon in the next sections, is that, rather than trying to work our way up starting from a calculus for lattice logic, we will obtain a calculus for lattice logic from the standard proper display calculus for the logic of distributive lattices, by endowing it with a suitable mechanism to block the derivation of distributivity.…”

“…To argue that the calculus D.LL introduced in Section 5 adequately captures lattice logic, we follow the standard proof strategy discussed in [38,37]. Let | = HA denote the semantic consequence relation arising from the heterogeneous algebras introduced in Section 3.…”

Lattice Logic Properly Displayed