Undecidability of various properties of first order term rewriting systems is well-known. An undecidable property can be classified by the complexity of the formula defining it. This gives rise to a hierarchy of distinct levels of undecidability, starting from the arithmetical hierarchy classifying properties using first order arithmetical formulas and continuing into the analytic hierarchy, where also quantification over function variables is allowed. In this paper we consider properties of first order term rewriting systems and classify them in this hierarchy. Most of the standard properties are ¿0/2-complete, that is, of the same level as uniform halting of Turing machines. In this paper we show two exceptions. Weak confluence is S0/1 -c...
This paper discusses a number of methods to prove termination of higher-order term rewriting systems...
AbstractUsually termination of term rewriting systems (TRS's) is proved by means of a monotonic well...
AbstractA term rewriting system is called complete if it is both confluent and strongly normalising....
Undecidability of various properties of first order term rewriting systems is well-known. An undecid...
Undecidability of various properties of first order term rewriting systems is well-known. An undecid...
Undecidability of various properties of first-order term rewriting systems is well-known. An undecid...
AbstractUndecidability of various properties of first-order term rewriting systems is well-known. An...
Undecidability of various properties of first-order term rewriting systems is well-known. An undecid...
AbstractFor a hierarchy of properties of term rewriting systems related to termination we prove rela...
AbstractFor a hierarchy of properties of term rewriting systems related to confluence we prove relat...
Abstract. For two hierarchies of properties of term rewriting systems related to con uence and termi...
AbstractThis paper is on several basic properties of term rewrite systems: reachability, joinability...
AbstractBy reduction from the halting problem for Minsky's two-register machines we prove that there...
By reduction from the halting problem for Minsky's two-register machines we prove that there is...
By reduction from the halting problem for Minsky's two-register machines we prove that there is no a...
This paper discusses a number of methods to prove termination of higher-order term rewriting systems...
AbstractUsually termination of term rewriting systems (TRS's) is proved by means of a monotonic well...
AbstractA term rewriting system is called complete if it is both confluent and strongly normalising....
Undecidability of various properties of first order term rewriting systems is well-known. An undecid...
Undecidability of various properties of first order term rewriting systems is well-known. An undecid...
Undecidability of various properties of first-order term rewriting systems is well-known. An undecid...
AbstractUndecidability of various properties of first-order term rewriting systems is well-known. An...
Undecidability of various properties of first-order term rewriting systems is well-known. An undecid...
AbstractFor a hierarchy of properties of term rewriting systems related to termination we prove rela...
AbstractFor a hierarchy of properties of term rewriting systems related to confluence we prove relat...
Abstract. For two hierarchies of properties of term rewriting systems related to con uence and termi...
AbstractThis paper is on several basic properties of term rewrite systems: reachability, joinability...
AbstractBy reduction from the halting problem for Minsky's two-register machines we prove that there...
By reduction from the halting problem for Minsky's two-register machines we prove that there is...
By reduction from the halting problem for Minsky's two-register machines we prove that there is no a...
This paper discusses a number of methods to prove termination of higher-order term rewriting systems...
AbstractUsually termination of term rewriting systems (TRS's) is proved by means of a monotonic well...
AbstractA term rewriting system is called complete if it is both confluent and strongly normalising....