For narrowing with a set of rules \Delta modulo a set of axioms B almost nothing is known about terminating narrowing strategies, and basic narrowing is known to be incomplete for B=AC. In this work we ask and answer the question: Is there such a thing as an extremely terminating narrowing strategy modulo B? where we call a narrowing strategy S enjoying appropriate completeness properties extremely terminating iff whenever any other narrowing strategy S' enjoying the same completeness properties terminates on a term t, then S is guaranteed to terminate on t as well. We show that basic narrowing is not extremely terminating already for B=\emptyset, and provide a positive answer to the above question by means of a sequence of increasingly mor...
We present a refinement of the narrowing directed by a graph of terms, which is complete for conflue...
For an unconditional equational theory (Σ,E) whose oriented equations E⃗ are confluent and terminati...
In this paper we analyze completeness results for basic narrowing. We show that basic narrowing is n...
For narrowing with a set of rules \Delta modulo a set of axioms B almost nothing is known about term...
Automated reasoning modulo an equational theory E is a fundamental technique in many applications. I...
Automated reasoning modulo an equational theory E is a fundamental technique in many applications. I...
AbstractAutomated reasoning modulo an equational theory E is a fundamental technique in many applica...
Narrowing is a well-known complete procedure for equational E-unification when E can be decomposed a...
AbstractNarrowing is a well-known complete procedure for equational E-unification when E can be deco...
Abstract. Basic narrowing is a restricted form of narrowing which con-strains narrowing steps to a s...
AbstractWe address the problem of unification modulo a set of equations, using the narrowing relatio...
AbstractThis paper describes several classes of term rewriting systems (TRS’s), where narrowing has ...
The narrowing relation over terms constitutes the basis of the most important operational semantics ...
Narrowing calculus that uses strategies to solve reachability problems in order-sorted rewrite theor...
Narrowing provides an operational semantics for languages combining functional and logic programming...
We present a refinement of the narrowing directed by a graph of terms, which is complete for conflue...
For an unconditional equational theory (Σ,E) whose oriented equations E⃗ are confluent and terminati...
In this paper we analyze completeness results for basic narrowing. We show that basic narrowing is n...
For narrowing with a set of rules \Delta modulo a set of axioms B almost nothing is known about term...
Automated reasoning modulo an equational theory E is a fundamental technique in many applications. I...
Automated reasoning modulo an equational theory E is a fundamental technique in many applications. I...
AbstractAutomated reasoning modulo an equational theory E is a fundamental technique in many applica...
Narrowing is a well-known complete procedure for equational E-unification when E can be decomposed a...
AbstractNarrowing is a well-known complete procedure for equational E-unification when E can be deco...
Abstract. Basic narrowing is a restricted form of narrowing which con-strains narrowing steps to a s...
AbstractWe address the problem of unification modulo a set of equations, using the narrowing relatio...
AbstractThis paper describes several classes of term rewriting systems (TRS’s), where narrowing has ...
The narrowing relation over terms constitutes the basis of the most important operational semantics ...
Narrowing calculus that uses strategies to solve reachability problems in order-sorted rewrite theor...
Narrowing provides an operational semantics for languages combining functional and logic programming...
We present a refinement of the narrowing directed by a graph of terms, which is complete for conflue...
For an unconditional equational theory (Σ,E) whose oriented equations E⃗ are confluent and terminati...
In this paper we analyze completeness results for basic narrowing. We show that basic narrowing is n...