Cyclic proof systems for modal fixpoint logics

This thesis is about cyclic and ill-founded proof systems for modal fixpoint logics, with and without explicit fixpoint quantifiers.Cyclic and ill-founded proof-theory allow proofs with infinite branches or paths, as long as they satisfy some correctness conditions ensuring the validity of the conclusion. In this dissertation we design a few cyclic and ill-founded systems: a cyclic one for the weak Grzegorczyk modal logic K4Grz, based on our explanation of the phenomenon of cyclic companionship; and ill-founded and cyclic ones for the full computation tree logic CTL* and the intuitionistic linear-time temporal logic iLTL. All systems are cut-free, and the cyclic ones for K4Grz and iLTL have fully finitary correctness conditions.Lastly, we use a cyclic system for the modal mu-calculus to obtain a proof of the uniform interpolation property for the logic which differs from the original, automata-based one

Proof Analysis in Temporal Logic

The logic of time is one of the most interesting modal logics, and its importance is widely acknowledged both for philosophical and formal reasons. In this thesis, we apply the method of internalisation of Kripke-style semantics into the syntax of sequent calculus to the proof-theoretical analysis of temporal logics. Sequent systems for different flows of time are obtained as modular extensions of a basic temporal calculus, through the addition of appropriate mathematical rules that correspond to the properties of temporal frames: a general and uniform treatment is thus achieved for a wide range of temporal logics. All the calculi enjoy remarkable structural properties, in particular are contraction and cut free. Linear discrete time is analysed by means of two infinitary calculi. The first is obtained by means of a rule with infinitely many premises, and the second through a new definition of provability which admits, under certain conditions, derivation trees with infinite branches. The first calculus enjoys the desired structural properties, but the presence of an infinitary rule is harmful for proof analysis. Two finitary systems are identified by replacing the infinitary rule with a weaker finitary rule, and by bounding the number of its premises, respectively. Corresponding, somehow complementary, conservativity results are proved with respect to adequate fragments of the original calculus. The second calculus stems from a closure algorithm which exploits the fixed-point equations for temporal operators and gives saturated sets of closure formulas from a given formula. Finitisation is obtained in the form of an upper bound to the proof-search procedure, and decidability follows as a major consequence

Resolution-based decision procedures for subclasses of first-order logic

This thesis studies decidable fragments of first-order logic which are relevant to the field of nonclassical logic and knowledge representation. We show that refinements of resolution based on suitable liftable orderings provide decision procedures for the subclasses E+, K, and DK of first-order logic. By the use of semantics-based translation methods we can embed the description logic ALB and extensions of the basic modal logic K into fragments of first-order logic. We describe various decision procedures based on ordering refinements and selection functions for these fragments and show that a polynomial simulation of tableaux-based decision procedures for these logics is possible. In the final part of the thesis we develop a benchmark suite and perform an empirical analysis of various modal theorem provers.Diese Arbeit untersucht entscheidbare Fragmente der Logik erster Stufe, die mit nicht-klassischen Logiken und Wissensrepräsentationsformalismen im Zusammenhang stehen. Wir zeigen, daß Entscheidungsverfahren für die Teilklassen E+, K, und DK der Logik erster Stufe unter Verwendung von Resolution eingeschränkt durch geeignete liftbare Ordnungen realisiert werden können. Durch Anwendung von semantikbasierten Übersetzungsverfahren lassen sich die Beschreibungslogik ALB und Erweiterungen der Basismodallogik K in Teilklassen der Logik erster Stufe einbetten. Wir stellen eine Reihe von Entscheidungsverfahren auf der Basis von Resolution eingeschränkt durch liftbare Ordnungen und Selektionsfunktionen für diese Logiken vor und zeigen, daß eine polynomielle Simulation von tableaux-basierten Entscheidungsverfahren für diese Logiken möglich ist. Im abschließenden Teil der Arbeit führen wir eine empirische Untersuchung der Performanz verschiedener modallogischer Theorembeweiser durch

Cut-free sequent and tableau systems for propositional diodorean modal logics

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