This dissertation studies the relative expressive power and properties of several fixpoint and second-order logics. We use the term fixpoint logic in a broad sense, referring to any logic which can encode some type of recursion, iteration or repetition. Our main objective is to systematically identify several important logics as precise fragments of other well-known logics. In order to accomplish this task, we develop automata-theoretic tools to analyze these fragments. The results of this dissertation provide new insight on the relationship of fixpoint and second-order logic and provides further evidence of the successful logic-automata connection
International audienceGuardedness restrictions are one of the principal means to obtain decidable lo...
International audienceWe look at characterizing which formulas are expressible in rich decidable log...
Guardedness restrictions are one of the principal means to obtain decidable logics — operators such ...
AbstractThe variety of semantical approaches that have been invented for logic programs is quite bro...
We prove that the bisimulation-invariant fragment of weak monadic second-order logic (WMSO) is equiv...
We use the connection between automata and logic to prove that a wide class of coalgebraic fixpoint ...
International audienceWe prove that the bisimulation-invariant fragment of weak monadic second-order...
Ordered logic is the theoretical foundation of the LOCO programing language [9] which combines the d...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Recent advances in knowledge compilation introduced techniques to compile positive logic programs in...
AbstractThis paper introduces a new higher-order typed constructive predicate logic for fixpoint com...
Abstract. The present paper gives a classification of the expressive power of two-variable least fix...
One of van Benthem’s seminal results is the Bisimulation Theorem characterizing modal logic as the b...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
We investigate properties of logic programs that permit refinements in their fixpoint evaluation and...
International audienceGuardedness restrictions are one of the principal means to obtain decidable lo...
International audienceWe look at characterizing which formulas are expressible in rich decidable log...
Guardedness restrictions are one of the principal means to obtain decidable logics — operators such ...
AbstractThe variety of semantical approaches that have been invented for logic programs is quite bro...
We prove that the bisimulation-invariant fragment of weak monadic second-order logic (WMSO) is equiv...
We use the connection between automata and logic to prove that a wide class of coalgebraic fixpoint ...
International audienceWe prove that the bisimulation-invariant fragment of weak monadic second-order...
Ordered logic is the theoretical foundation of the LOCO programing language [9] which combines the d...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Recent advances in knowledge compilation introduced techniques to compile positive logic programs in...
AbstractThis paper introduces a new higher-order typed constructive predicate logic for fixpoint com...
Abstract. The present paper gives a classification of the expressive power of two-variable least fix...
One of van Benthem’s seminal results is the Bisimulation Theorem characterizing modal logic as the b...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
We investigate properties of logic programs that permit refinements in their fixpoint evaluation and...
International audienceGuardedness restrictions are one of the principal means to obtain decidable lo...
International audienceWe look at characterizing which formulas are expressible in rich decidable log...
Guardedness restrictions are one of the principal means to obtain decidable logics — operators such ...