AbstractThe paper concerns the relationship between graph theoretic and algebraic properties of structured flowchart schemes. For each of ten classes of flowchart schemes defined algebraically, a graph theoretic property is given which characterizes this class. The classes include the Dijkstra schemes, Elgot's CACI and G-schemes, the reducible schemes and Kosaraju's BJn-schemes. For two classes of schemes defined by a graph theoretic property, an equivalent algebraic characterization is found
AbstractReducible flowcharts as introduced by Hecht and Ullman have been algebraically characterized...
summary:In this paper we investigate some of the computational aspects of generic properties of line...
In this paper we give new characterizations for the flowchartability of recursive functionals. Here ...
AbstractThe paper concerns the relationship between graph theoretic and algebraic properties of stru...
AbstractThe G-schemes are a class of structured flowchart schemes defined algebraically by Elgot in ...
Based on the algebraic characterization of reducible graphical flowcharts, recursive flowchart schem...
AbstractA “scalar” flowchart scheme, i.e. one with a single begin “instruction” is reducible iff its...
AbstractAn abstract flowchart scheme (Căzănescu and Ştefănescu [10]) differs from a usual flowchart ...
AbstractWe give a calculus for nondeterministic flowchart schemes similar to the calculus of polynom...
We present some structure theorems for the class of binary flowgraphs. These graphs show up in the s...
AbstractGraph theory is used to model program control structures rigorously as flowgraphs. Formal me...
In an effort to eliminate some inconveniences connected with Dijkstra's method of Structured Program...
A flow network N is a capacited finite directed graph, with multiple input ports/arcs and multiple o...
Abstract. This paper explores the effect of various graphical constructions upon the associated grap...
summary:Algorithmic nets (or flow diagrams) are a generalization of logical nets. They are finite, o...
AbstractReducible flowcharts as introduced by Hecht and Ullman have been algebraically characterized...
summary:In this paper we investigate some of the computational aspects of generic properties of line...
In this paper we give new characterizations for the flowchartability of recursive functionals. Here ...
AbstractThe paper concerns the relationship between graph theoretic and algebraic properties of stru...
AbstractThe G-schemes are a class of structured flowchart schemes defined algebraically by Elgot in ...
Based on the algebraic characterization of reducible graphical flowcharts, recursive flowchart schem...
AbstractA “scalar” flowchart scheme, i.e. one with a single begin “instruction” is reducible iff its...
AbstractAn abstract flowchart scheme (Căzănescu and Ştefănescu [10]) differs from a usual flowchart ...
AbstractWe give a calculus for nondeterministic flowchart schemes similar to the calculus of polynom...
We present some structure theorems for the class of binary flowgraphs. These graphs show up in the s...
AbstractGraph theory is used to model program control structures rigorously as flowgraphs. Formal me...
In an effort to eliminate some inconveniences connected with Dijkstra's method of Structured Program...
A flow network N is a capacited finite directed graph, with multiple input ports/arcs and multiple o...
Abstract. This paper explores the effect of various graphical constructions upon the associated grap...
summary:Algorithmic nets (or flow diagrams) are a generalization of logical nets. They are finite, o...
AbstractReducible flowcharts as introduced by Hecht and Ullman have been algebraically characterized...
summary:In this paper we investigate some of the computational aspects of generic properties of line...
In this paper we give new characterizations for the flowchartability of recursive functionals. Here ...