Unification, or solving equations on finite trees, is a P-complete problem central to symbolic manipulation, especially in Resolution, Type Inference and Rewriting. We present a natural logic dedicated to unification, which includes a constructive version of equational logic. This logic enjoys the classical proof-theoretic properties: atomicity; strong normalization; Church-Rosserness; left right, introduction elimination and positive negative symmetries. Motivated by the Type Inference problem, we introduce, besides a model-theoretic semantics and its completeness, a geometrical interpretation of deductions describing their operational content. This allows the design of a normalization process. This unification logic provides significant t...
A new hierarchy of "exact" unification types is introduced, motivated by the study of admissible rul...
AbstractWe investigate the following classes of equational theories which are important in unificati...
We show that unification in certain extensions of shallow equational theories is decidable. Our exte...
Unification, or solving equations on finite trees, is a P-complete problem central to symbolic manip...
AbstractA complete unification algorithm is presented for the combination of two theories E in T(F,X...
During the last years unification theory has become an important subfield of automated reasoning and...
AbstractUnification is the problem to solve equations of first order terms by finding (all) substitu...
The paper presents a nondeterministic algorithm for unifying pairs of terms in equational theories c...
In this monograph we study two generalizations of standard unification, E-unification and higher-ord...
This paper studies unification for order-sorted equational logic. This logic generalizes unsorted eq...
AbstractAn equational formula is a first-order formula over an alphabet F of function symbols and th...
The observation that unification under associativity and commutativity reduces to the solution of ce...
Unification is a fundamental operation in various areas of computer science, in particular in automa...
. We show that deciding unification modulo both-sided distributivity of a symbol over a symbol + ca...
AbstractEquational logic programming is an extended programming paradigm of equational programming. ...
A new hierarchy of "exact" unification types is introduced, motivated by the study of admissible rul...
AbstractWe investigate the following classes of equational theories which are important in unificati...
We show that unification in certain extensions of shallow equational theories is decidable. Our exte...
Unification, or solving equations on finite trees, is a P-complete problem central to symbolic manip...
AbstractA complete unification algorithm is presented for the combination of two theories E in T(F,X...
During the last years unification theory has become an important subfield of automated reasoning and...
AbstractUnification is the problem to solve equations of first order terms by finding (all) substitu...
The paper presents a nondeterministic algorithm for unifying pairs of terms in equational theories c...
In this monograph we study two generalizations of standard unification, E-unification and higher-ord...
This paper studies unification for order-sorted equational logic. This logic generalizes unsorted eq...
AbstractAn equational formula is a first-order formula over an alphabet F of function symbols and th...
The observation that unification under associativity and commutativity reduces to the solution of ce...
Unification is a fundamental operation in various areas of computer science, in particular in automa...
. We show that deciding unification modulo both-sided distributivity of a symbol over a symbol + ca...
AbstractEquational logic programming is an extended programming paradigm of equational programming. ...
A new hierarchy of "exact" unification types is introduced, motivated by the study of admissible rul...
AbstractWe investigate the following classes of equational theories which are important in unificati...
We show that unification in certain extensions of shallow equational theories is decidable. Our exte...