AbstractWe study a programming language LPas consisting of blockstructured programs with a Pascal-like procedure concept which allows procedures as parameters. Due to Clarke (1979) there cannot be any sound and relatively complete Hoare-like system proving partial correctness for the full language LPas. However, in Langmaack and Olderog (1980) it has been conjectured that such a system exists once global variables are disallowed.In this paper we prove a slightly weaker version of this conjecture by presenting a Hoare-like system which is sound and g-complete for all programs in LPas without global variables; g-completeness means completeness modulo a special second-order theory and an appropriate notion of expressiveness. The proof system p...
Investigating soundness and completeness of verification calculi for imperative programming language...
Four proof rules for recursive procedures in a Pascal-like language are presented. The main rule dea...
Three theorems are proven which reconsider the completeness of Hoare's logic for the partial correct...
AbstractWe study a programming language LPas consisting of blockstructured programs with a Pascal-li...
We provide a sound and relatively complete axiom system for partial correctness assertions in an Alg...
AbstractWe provide a sound and relatively complete axiom system for partial correctness assertions i...
We extend Hoares logic by allowing quantifiers and other logical connectives to be used on the level...
The paper starts with the observation that in ALGOL 60 no specifications for formal procedure parame...
AbstractGeneralized Hoare logic (GHL) is a formal logical system for proving invariance properties o...
We introduce the notion of local completeness in abstract interpretation and define a logic for prov...
AbstractWe consider the completeness of Hoare's logic with a first-order assertion language applied ...
AbstractWe describe a language of specified programs devised to form a basis for a system for the de...
This report deals with program verification based on a refined Hoare-logic which allows to handle pr...
AbstractWe show that termination is a first-order notion if approached via Nonstandard Logics of Pro...
The proof of completeness for propositional logic is a constructive one, so a computer program is su...
Investigating soundness and completeness of verification calculi for imperative programming language...
Four proof rules for recursive procedures in a Pascal-like language are presented. The main rule dea...
Three theorems are proven which reconsider the completeness of Hoare's logic for the partial correct...
AbstractWe study a programming language LPas consisting of blockstructured programs with a Pascal-li...
We provide a sound and relatively complete axiom system for partial correctness assertions in an Alg...
AbstractWe provide a sound and relatively complete axiom system for partial correctness assertions i...
We extend Hoares logic by allowing quantifiers and other logical connectives to be used on the level...
The paper starts with the observation that in ALGOL 60 no specifications for formal procedure parame...
AbstractGeneralized Hoare logic (GHL) is a formal logical system for proving invariance properties o...
We introduce the notion of local completeness in abstract interpretation and define a logic for prov...
AbstractWe consider the completeness of Hoare's logic with a first-order assertion language applied ...
AbstractWe describe a language of specified programs devised to form a basis for a system for the de...
This report deals with program verification based on a refined Hoare-logic which allows to handle pr...
AbstractWe show that termination is a first-order notion if approached via Nonstandard Logics of Pro...
The proof of completeness for propositional logic is a constructive one, so a computer program is su...
Investigating soundness and completeness of verification calculi for imperative programming language...
Four proof rules for recursive procedures in a Pascal-like language are presented. The main rule dea...
Three theorems are proven which reconsider the completeness of Hoare's logic for the partial correct...