Autoepistemic logic is one of the most successful formalisms for nonmonotonic reasoning. In this paper we provide a proof-theoretic analysis of sequent calculi for credulous and sceptical reasoning in propositional autoepistemic logic, introduced by Bonatti and Olivetti [5]. We show that the calculus for credulous reasoning obeys almost the same bounds on the proof size as Gentzen's system LK. Hence proving lower bounds for credulous reasoning will be as hard as proving lower bounds for LK. This contrasts with the situation in sceptical autoepistemic reasoning where we obtain an exponential lower bound to the proof length in Bonatti and Olivetti's calculus
We define abstract proof procedures for performing credulous and sceptical non-monotonic reasoning, ...
AbstractWithin a formal theory T where a ⊥-rule is provably valid and Gödel's second incompleteness ...
The driving force behind the theory of non-monotonic reasoning is the wish to draw conclusions in th...
Default logic is one of the most popular and successful formalisms for non-monotonic reasoning. In 2...
Abstract. Default logic is one of the most popular and successful formalisms for non-monotonic reaso...
Default logic is one of the most popular and successful formalisms for non-monotonic reasoning. In 2...
International audienceAutoepistemic logic extends propositional logic by the modal operator L. A for...
Autoepistemic logic extends propositional logic by the modal operator L. A formula ϕ that is precede...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
this paper, we investigate lengths of proofs of propositional calculi, resolution and Gentzen type s...
. In recent years, many authors have pointed out the strict correlation between non-Horn logic progr...
In recent years, many authors have pointed out the strict correlation between non-Horn logic program...
Abstract. Proof complexity is an interdisciplinary area of research util-ising techniques from logic...
This paper discusses lower bounds for proof length, especially as measured by number of steps (infe...
We prove lower bounds of the form exp (n " d ) ; " d ? 0; on the length of proofs of an ...
We define abstract proof procedures for performing credulous and sceptical non-monotonic reasoning, ...
AbstractWithin a formal theory T where a ⊥-rule is provably valid and Gödel's second incompleteness ...
The driving force behind the theory of non-monotonic reasoning is the wish to draw conclusions in th...
Default logic is one of the most popular and successful formalisms for non-monotonic reasoning. In 2...
Abstract. Default logic is one of the most popular and successful formalisms for non-monotonic reaso...
Default logic is one of the most popular and successful formalisms for non-monotonic reasoning. In 2...
International audienceAutoepistemic logic extends propositional logic by the modal operator L. A for...
Autoepistemic logic extends propositional logic by the modal operator L. A formula ϕ that is precede...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
this paper, we investigate lengths of proofs of propositional calculi, resolution and Gentzen type s...
. In recent years, many authors have pointed out the strict correlation between non-Horn logic progr...
In recent years, many authors have pointed out the strict correlation between non-Horn logic program...
Abstract. Proof complexity is an interdisciplinary area of research util-ising techniques from logic...
This paper discusses lower bounds for proof length, especially as measured by number of steps (infe...
We prove lower bounds of the form exp (n " d ) ; " d ? 0; on the length of proofs of an ...
We define abstract proof procedures for performing credulous and sceptical non-monotonic reasoning, ...
AbstractWithin a formal theory T where a ⊥-rule is provably valid and Gödel's second incompleteness ...
The driving force behind the theory of non-monotonic reasoning is the wish to draw conclusions in th...