Four proof rules for recursive procedures in a Pascal-like language are presented. The main rule deals with total correctness and is based on results of Gries and Martin. The rule is easier to apply than Martin's. It is introduced as an extension of a specification format for Pascal-procedures, with its associated correctness and invocation rules. It uses well-founded recursion and is proved under the postulate that a procedure is semantically equal to its body. This rule for total correctness is compared with Hoare's rule for partial correctness of recursive procedures, in which no well-founded relation is needed. Both rules serve to prove correctness, i.e. sufficiency of certain preconditions. There are also two rules for proving necessit...
We provide a sound and relatively complete Hoare logic for reasoning about partial correctness of re...
Temporal weakest precondions are introduced for calculational reasoning about the states encountered...
Morgan's approach to program development is a refinement calculus: using this method, programs are d...
Four proof rules for recursive procedures in a Pascal-like language are presented. The main rule dea...
Abstract. Four proof rules for recursive procedures in a Pascal-like language are presented. The mai...
We show that some well-known rules in a Hoare-style proof system for total correctness of recursive ...
AbstractWe show that some well-known rules in a Hoare-style proof system for total correctness of re...
Abstract. We report work in progress concerning the theoretical basis and the implementation in the ...
We consider a recursive sorting algorithm in which, in each invocation, a new variable and a new pro...
We extend Hoares logic by allowing quantifiers and other logical connectives to be used on the level...
AbstractWe consider a recursive sorting algorithm in which, in each invocation, a new variable and a...
AbstractThe verification of programs that contain mutually recursive procedures is a difficult task,...
The weakest precondition semantics of recursive procedures with local variables are developed for an...
AbstractIn this paper processes specifiable over a non-uniform language are considered. The language...
We provide a sound and relatively complete Hoare logic for reasoning about partial correctness of re...
Temporal weakest precondions are introduced for calculational reasoning about the states encountered...
Morgan's approach to program development is a refinement calculus: using this method, programs are d...
Four proof rules for recursive procedures in a Pascal-like language are presented. The main rule dea...
Abstract. Four proof rules for recursive procedures in a Pascal-like language are presented. The mai...
We show that some well-known rules in a Hoare-style proof system for total correctness of recursive ...
AbstractWe show that some well-known rules in a Hoare-style proof system for total correctness of re...
Abstract. We report work in progress concerning the theoretical basis and the implementation in the ...
We consider a recursive sorting algorithm in which, in each invocation, a new variable and a new pro...
We extend Hoares logic by allowing quantifiers and other logical connectives to be used on the level...
AbstractWe consider a recursive sorting algorithm in which, in each invocation, a new variable and a...
AbstractThe verification of programs that contain mutually recursive procedures is a difficult task,...
The weakest precondition semantics of recursive procedures with local variables are developed for an...
AbstractIn this paper processes specifiable over a non-uniform language are considered. The language...
We provide a sound and relatively complete Hoare logic for reasoning about partial correctness of re...
Temporal weakest precondions are introduced for calculational reasoning about the states encountered...
Morgan's approach to program development is a refinement calculus: using this method, programs are d...