7,532 research outputs found
Fifty years of Hoare's Logic
We present a history of Hoare's logic.Comment: 79 pages. To appear in Formal Aspects of Computin
Logic Programming for Describing and Solving Planning Problems
A logic programming paradigm which expresses solutions to problems as stable
models has recently been promoted as a declarative approach to solving various
combinatorial and search problems, including planning problems. In this
paradigm, all program rules are considered as constraints and solutions are
stable models of the rule set. This is a rather radical departure from the
standard paradigm of logic programming. In this paper we revisit abductive
logic programming and argue that it allows a programming style which is as
declarative as programming based on stable models. However, within abductive
logic programming, one has two kinds of rules. On the one hand predicate
definitions (which may depend on the abducibles) which are nothing else than
standard logic programs (with their non-monotonic semantics when containing
with negation); on the other hand rules which constrain the models for the
abducibles. In this sense abductive logic programming is a smooth extension of
the standard paradigm of logic programming, not a radical departure.Comment: 8 pages, no figures, Eighth International Workshop on Nonmonotonic
Reasoning, special track on Representing Actions and Plannin
Polynomial Interpretations for Higher-Order Rewriting
The termination method of weakly monotonic algebras, which has been defined
for higher-order rewriting in the HRS formalism, offers a lot of power, but has
seen little use in recent years. We adapt and extend this method to the
alternative formalism of algebraic functional systems, where the simply-typed
lambda-calculus is combined with algebraic reduction. Using this theory, we
define higher-order polynomial interpretations, and show how the implementation
challenges of this technique can be tackled. A full implementation is provided
in the termination tool WANDA
Termination Analysis by Learning Terminating Programs
We present a novel approach to termination analysis. In a first step, the
analysis uses a program as a black-box which exhibits only a finite set of
sample traces. Each sample trace is infinite but can be represented by a finite
lasso. The analysis can "learn" a program from a termination proof for the
lasso, a program that is terminating by construction. In a second step, the
analysis checks that the set of sample traces is representative in a sense that
we can make formal. An experimental evaluation indicates that the approach is a
potentially useful addition to the portfolio of existing approaches to
termination analysis
A Fixpoint Semantics of Event Systems with and without Fairness Assumptions
We present a fixpoint semantics of event systems. The semantics is presented
in a general framework without concerns of fairness. Soundness and completeness
of rules for deriving "leads-to" properties are proved in this general
framework. The general framework is instantiated to minimal progress and weak
fairness assumptions and similar results are obtained. We show the power of
these results by deriving sufficient conditions for "leads-to" under minimal
progress proving soundness of proof obligations without reasoning over
state-traces
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