Add to ORKGAn equational theory decomposed into a set B of equational axioms and a set \Delta of rewrite rules has the \emph{finite variant} (FV) \emph{property} in the sense of Comon-Lundh and Delaune iff for each term t there is a finite set \{t_{1},\ldots,t_{n}\} of \rightarrow_{\Delta,B}-normalized instances of t so that any instance of t normalizes to an instance of some t_{i} modulo B. This is a very useful property for cryptographic protocol analysis, and for solving both unification and disunification problems. Yet, at present the property has to be established by hand, giving a separate mathematical proof for each given theory: no checking algorithms seem to be known. In this paper we give both a necessary and a sufficient condition for FV fr...
Analysis of cryptographic protocols in a symbolic model is relative to a deduction system that model...
International audienceWe investigate the unification problemin theories defined by rewrite systems w...
Decision procedures can be either theory-specific, e.g., Presburger arithmetic, or theory-generic...
An equational theory decomposed into a set B of equational axioms and a set \Delta of rewrite rules ...
Abstract. An equational theory decomposed into a set B of equational axioms and a set ∆ of rewrite r...
Variants and the finite variant property were originally introduced about a decade ago by Hurbert Co...
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...
AbstractAutomated reasoning modulo an equational theory E is a fundamental technique in many applica...
Automated reasoning modulo an equational theory E is a fundamental technique in many applications. I...
Variant satisfiability is a theory-generic algorithm to decide quantifier-free satisfiability in an ini...
This paper introduces some novel features of Maude 2.6 focusing on the variants of a term. Given an ...
Automated reasoning modulo an equational theory E is a fundamental technique in many applications. I...
Decision procedures can be either theory specific, e.g., Presburger arithmetic, or theory-generic...
Although different satisfiability decision procedures can be combined by algorithms such as those...
Analysis of cryptographic protocols in a symbolic model is relative to a deduction system that model...
International audienceWe investigate the unification problemin theories defined by rewrite systems w...
Decision procedures can be either theory-specific, e.g., Presburger arithmetic, or theory-generic...
An equational theory decomposed into a set B of equational axioms and a set \Delta of rewrite rules ...
Abstract. An equational theory decomposed into a set B of equational axioms and a set ∆ of rewrite r...
Variants and the finite variant property were originally introduced about a decade ago by Hurbert Co...
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...
AbstractAutomated reasoning modulo an equational theory E is a fundamental technique in many applica...
Automated reasoning modulo an equational theory E is a fundamental technique in many applications. I...
Variant satisfiability is a theory-generic algorithm to decide quantifier-free satisfiability in an ini...
This paper introduces some novel features of Maude 2.6 focusing on the variants of a term. Given an ...
Automated reasoning modulo an equational theory E is a fundamental technique in many applications. I...
Decision procedures can be either theory specific, e.g., Presburger arithmetic, or theory-generic...
Although different satisfiability decision procedures can be combined by algorithms such as those...
Analysis of cryptographic protocols in a symbolic model is relative to a deduction system that model...
International audienceWe investigate the unification problemin theories defined by rewrite systems w...
Decision procedures can be either theory-specific, e.g., Presburger arithmetic, or theory-generic...