647 research outputs found
Towards a Proof Theory of G\"odel Modal Logics
Analytic proof calculi are introduced for box and diamond fragments of basic
modal fuzzy logics that combine the Kripke semantics of modal logic K with the
many-valued semantics of G\"odel logic. The calculi are used to establish
completeness and complexity results for these fragments
Neutrality and Many-Valued Logics
In this book, we consider various many-valued logics: standard, linear,
hyperbolic, parabolic, non-Archimedean, p-adic, interval, neutrosophic, etc. We
survey also results which show the tree different proof-theoretic frameworks
for many-valued logics, e.g. frameworks of the following deductive calculi:
Hilbert's style, sequent, and hypersequent. We present a general way that
allows to construct systematically analytic calculi for a large family of
non-Archimedean many-valued logics: hyperrational-valued, hyperreal-valued, and
p-adic valued logics characterized by a special format of semantics with an
appropriate rejection of Archimedes' axiom. These logics are built as different
extensions of standard many-valued logics (namely, Lukasiewicz's, Goedel's,
Product, and Post's logics). The informal sense of Archimedes' axiom is that
anything can be measured by a ruler. Also logical multiple-validity without
Archimedes' axiom consists in that the set of truth values is infinite and it
is not well-founded and well-ordered. On the base of non-Archimedean valued
logics, we construct non-Archimedean valued interval neutrosophic logic INL by
which we can describe neutrality phenomena.Comment: 119 page
Hyper Natural Deduction
Paper introduces a Hyper Natural Deduction system as an extension of Gentzen's Natural Deduction system, by adding additional rules providing means for communication between derivations. It is shown that the Hyper Natural Deduction system is sound and complete for infinite-valued propositional Gödel Logic, by giving translations to and from Avron's Hyper sequent Calculus. The paper also provides conversions for normalisation and prove the existence of normal forms for the Hyper Natural Deduction system
A Complete Axiomatization of Quantified Differential Dynamic Logic for Distributed Hybrid Systems
We address a fundamental mismatch between the combinations of dynamics that
occur in cyber-physical systems and the limited kinds of dynamics supported in
analysis. Modern applications combine communication, computation, and control.
They may even form dynamic distributed networks, where neither structure nor
dimension stay the same while the system follows hybrid dynamics, i.e., mixed
discrete and continuous dynamics. We provide the logical foundations for
closing this analytic gap. We develop a formal model for distributed hybrid
systems. It combines quantified differential equations with quantified
assignments and dynamic dimensionality-changes. We introduce a dynamic logic
for verifying distributed hybrid systems and present a proof calculus for this
logic. This is the first formal verification approach for distributed hybrid
systems. We prove that our calculus is a sound and complete axiomatization of
the behavior of distributed hybrid systems relative to quantified differential
equations. In our calculus we have proven collision freedom in distributed car
control even when an unbounded number of new cars may appear dynamically on the
road
Automated Deduction – CADE 28
This open access book constitutes the proceeding of the 28th International Conference on Automated Deduction, CADE 28, held virtually in July 2021. The 29 full papers and 7 system descriptions presented together with 2 invited papers were carefully reviewed and selected from 76 submissions. CADE is the major forum for the presentation of research in all aspects of automated deduction, including foundations, applications, implementations, and practical experience. The papers are organized in the following topics: Logical foundations; theory and principles; implementation and application; ATP and AI; and system descriptions
Toward Structured Proofs for Dynamic Logics
We present Kaisar, a structured interactive proof language for differential
dynamic logic (dL), for safety-critical cyber-physical systems (CPS). The
defining feature of Kaisar is *nominal terms*, which simplify CPS proofs by
making the frequently needed historical references to past program states
first-class. To support nominals, we extend the notion of structured proof with
a first-class notion of *structured symbolic execution* of CPS models. We
implement Kaisar in the theorem prover KeYmaera X and reproduce an example on
the safe operation of a parachute and a case study on ground robot control. We
show how nominals simplify common CPS reasoning tasks when combined with other
features of structured proof. We develop an extensive metatheory for Kaisar. In
addition to soundness and completeness, we show a formal specification for
Kaisar's nominals and relate Kaisar to a nominal variant of dL
Automated Reasoning
This volume, LNAI 13385, constitutes the refereed proceedings of the 11th International Joint Conference on Automated Reasoning, IJCAR 2022, held in Haifa, Israel, in August 2022. The 32 full research papers and 9 short papers presented together with two invited talks were carefully reviewed and selected from 85 submissions. The papers focus on the following topics: Satisfiability, SMT Solving,Arithmetic; Calculi and Orderings; Knowledge Representation and Jutsification; Choices, Invariance, Substitutions and Formalization; Modal Logics; Proofs System and Proofs Search; Evolution, Termination and Decision Prolems. This is an open access book
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