Explicit modal logic was first sketched by Gödel in [16] as the logic with the atoms "t is a proof of F". The complete axiomatization of the Logic of Proofs LP was found in [4] (see also [6],[7],[18]). In this paper we establish a sort of a functional completeness property of proof polynomials which constitute the system of proof terms in LP. Proof polynomials are built from variables and constants by three operations on proofs: "\Delta" (application), "!" (proof checker), and "+" (choice). Here constants stand for canonical proofs of "simple facts", namely instances of propositional axioms and axioms of LP in a given proof system. We show that every operation on proofs that (i) can be speci...
This book continues from where the authors' previous book, Structural Proof Theory, ended. It presen...
The logic of proofs is a refinement of modal logic introduced by Artemov in 1995 in which the modali...
In 1933 Godel introduced a modal logic of provability (S4) and left open the problem of a formal pro...
AbstractThe Logic of Proofs realizes the modalities from traditional modal logics with proof polynom...
AbstractArtemov's propositional logic of proofs LP captures all invariant properties of proof predic...
AbstractArtemov's logic of proofs LP is a complete calculus of propositions and proofs, which is now...
The Logic of Proofs realizes the modalities from traditional modal logics with proof polynomials, so...
Abstract. Artemov introduced the Logic of Proofs (LP) as a logic of explicit proofs. We can also off...
A new proof style adequate for modal logics is defined from the polynomial ring calculus. The new se...
AbstractAn infinitary proof theory is developed for modal logics whose models are coalgebras of poly...
There has recently been considerable progress in the area of using computers as a tool for theorem p...
There has recently been considerable progress in the area of using computers as a tool for theorem p...
The paper introduces semantic and algorithmic methods for establishing a variant of the analytic sub...
The logic of proofs LP was introduced in [3] and thoroughly studied in [1]. LP is a natural extensi...
We introduce verification logics, variants of Artemov's logic of proofs LP with new terms of the for...
This book continues from where the authors' previous book, Structural Proof Theory, ended. It presen...
The logic of proofs is a refinement of modal logic introduced by Artemov in 1995 in which the modali...
In 1933 Godel introduced a modal logic of provability (S4) and left open the problem of a formal pro...
AbstractThe Logic of Proofs realizes the modalities from traditional modal logics with proof polynom...
AbstractArtemov's propositional logic of proofs LP captures all invariant properties of proof predic...
AbstractArtemov's logic of proofs LP is a complete calculus of propositions and proofs, which is now...
The Logic of Proofs realizes the modalities from traditional modal logics with proof polynomials, so...
Abstract. Artemov introduced the Logic of Proofs (LP) as a logic of explicit proofs. We can also off...
A new proof style adequate for modal logics is defined from the polynomial ring calculus. The new se...
AbstractAn infinitary proof theory is developed for modal logics whose models are coalgebras of poly...
There has recently been considerable progress in the area of using computers as a tool for theorem p...
There has recently been considerable progress in the area of using computers as a tool for theorem p...
The paper introduces semantic and algorithmic methods for establishing a variant of the analytic sub...
The logic of proofs LP was introduced in [3] and thoroughly studied in [1]. LP is a natural extensi...
We introduce verification logics, variants of Artemov's logic of proofs LP with new terms of the for...
This book continues from where the authors' previous book, Structural Proof Theory, ended. It presen...
The logic of proofs is a refinement of modal logic introduced by Artemov in 1995 in which the modali...
In 1933 Godel introduced a modal logic of provability (S4) and left open the problem of a formal pro...