AbstractIn the second part of this work, we formulate a new inductive assertion method applying to the class of nondeterministic flowchart programs with recursive procedures studied in part 1. Using results on unfolding proved in part 1, we prove that this method is sound and complete with a finite number of assertions. We study four notions of correctness: two notions of partial correctness (existential and universal) and the corresponding notions of total correctness. We also formalize two notions of extension and equivalence (existential and universal) in the second-order predicate calculus
Based on the algebraic characterization of reducible graphical flowcharts, recursive flowchart schem...
We present a technique for the mechanical proof of correctness properties of programs. We define a l...
The ability of flow-chart programs to define relations and functions nondefinable by open first-orde...
AbstractIn the second part of this work, we formulate a new inductive assertion method applying to t...
AbstractIn this paper, we study some aspects of the semantics of nondeterministic flowchart programs...
Manna's theorem on (partial) correctness of programs essentially states that in the statement o...
Manna's theorem on (partial) correctness of programs essentially states that in the statement of the...
In this paper we give new characterizations for the flowchartability of recursive functionals. Here ...
Four proof rules for recursive procedures in a Pascal-like language are presented. The main rule dea...
AbstractCertain properties of logic programs are inexpressible in terms of their declarative semanti...
AbstractWe give a calculus for nondeterministic flowchart schemes similar to the calculus of polynom...
AbstractCall a set of assertions A complete (with respect to a class of programs S) if for any p, q∈...
Abstract. Four proof rules for recursive procedures in a Pascal-like language are presented. The mai...
Abstract. Partial, total and general correctness and further models of sequential computations diffe...
We prove a relatively simple inductive theorem (analogous to Floyd and Dijkstra's Invariance Theorem...
Based on the algebraic characterization of reducible graphical flowcharts, recursive flowchart schem...
We present a technique for the mechanical proof of correctness properties of programs. We define a l...
The ability of flow-chart programs to define relations and functions nondefinable by open first-orde...
AbstractIn the second part of this work, we formulate a new inductive assertion method applying to t...
AbstractIn this paper, we study some aspects of the semantics of nondeterministic flowchart programs...
Manna's theorem on (partial) correctness of programs essentially states that in the statement o...
Manna's theorem on (partial) correctness of programs essentially states that in the statement of the...
In this paper we give new characterizations for the flowchartability of recursive functionals. Here ...
Four proof rules for recursive procedures in a Pascal-like language are presented. The main rule dea...
AbstractCertain properties of logic programs are inexpressible in terms of their declarative semanti...
AbstractWe give a calculus for nondeterministic flowchart schemes similar to the calculus of polynom...
AbstractCall a set of assertions A complete (with respect to a class of programs S) if for any p, q∈...
Abstract. Four proof rules for recursive procedures in a Pascal-like language are presented. The mai...
Abstract. Partial, total and general correctness and further models of sequential computations diffe...
We prove a relatively simple inductive theorem (analogous to Floyd and Dijkstra's Invariance Theorem...
Based on the algebraic characterization of reducible graphical flowcharts, recursive flowchart schem...
We present a technique for the mechanical proof of correctness properties of programs. We define a l...
The ability of flow-chart programs to define relations and functions nondefinable by open first-orde...