Completeness is a semantic non-operational notion of program correctness suggested (but not pursued) by W.W.Wadge. Program verification can be simplified using completeness, firstly by removing the approximation relation from proofs, and secondly by removing partial objects from proofs. The dissertation proves the validity of this approach by demonstrating how it can work in the class of metric domains. We show how the use of Tarski's least fixed point theorem can be replaced by a non-operational unique fixed point theorem for many well behaved Programs. The proof of this theorem is also non-operational. After this we consider the problem of deciding what it means f or a function to be "complete". It is shown that combinators such as functi...
interpretation is a well-known and extensively used method to extract over-approximate program invar...
AbstractIn [7], we presented a completeness theorem for proving partial correctness of programs in a...
Step-indexed models provide approximations to a class of domain equations and can prove type safety,...
Imprecision is inherent in any decidable (sound) approximation of undecidable program properties. In...
In de Bakker and Zucker proposed to use complete metric spaces for the semantic definition of progra...
In de Bakker and Zucker proposed to use complete metric spaces for the semantic definition of progra...
Completeness is a desirable, although uncommon, property of abstract interpretations, formalizing th...
Completeness is a desirable, although uncommon, property of abstract interpretations, formalizing th...
We prove a relative completeness result for a logic of functional programs extending D. Scott\u27s L...
Completeness in abstract interpretation is an ideal situation where the abstract semantics is able ...
Abstract interpretation is very useful for program analysis, because it provides a (sound) over-appr...
We want to prove that a static analysis of a given program is complete, namely, no imprecision arise...
Functional systems, based on the program notion are considered in the paper aiming at the general me...
Topological completeness properties seek to generalize the definition of complete metric space to th...
In the abstract interpretation framework, completeness represents an optimal simulation by the abst...
interpretation is a well-known and extensively used method to extract over-approximate program invar...
AbstractIn [7], we presented a completeness theorem for proving partial correctness of programs in a...
Step-indexed models provide approximations to a class of domain equations and can prove type safety,...
Imprecision is inherent in any decidable (sound) approximation of undecidable program properties. In...
In de Bakker and Zucker proposed to use complete metric spaces for the semantic definition of progra...
In de Bakker and Zucker proposed to use complete metric spaces for the semantic definition of progra...
Completeness is a desirable, although uncommon, property of abstract interpretations, formalizing th...
Completeness is a desirable, although uncommon, property of abstract interpretations, formalizing th...
We prove a relative completeness result for a logic of functional programs extending D. Scott\u27s L...
Completeness in abstract interpretation is an ideal situation where the abstract semantics is able ...
Abstract interpretation is very useful for program analysis, because it provides a (sound) over-appr...
We want to prove that a static analysis of a given program is complete, namely, no imprecision arise...
Functional systems, based on the program notion are considered in the paper aiming at the general me...
Topological completeness properties seek to generalize the definition of complete metric space to th...
In the abstract interpretation framework, completeness represents an optimal simulation by the abst...
interpretation is a well-known and extensively used method to extract over-approximate program invar...
AbstractIn [7], we presented a completeness theorem for proving partial correctness of programs in a...
Step-indexed models provide approximations to a class of domain equations and can prove type safety,...