1,218 research outputs found
Finding Finite Herbrand Models
We show that finding finite Herbrand models for a restricted class of first-order clauses is ExpTime-complete. A Herbrand model is called finite if it interprets all predicates by finite subsets of the Herbrand universe. The restricted class of clauses consists of anti-Horn clauses with monadic predicates and terms constructed over unary function symbols and constants. The decision procedure can be used as a new goal-oriented algorithm to solve linear language equations and unification problems in the description logic FLâ‚€. The new algorithm has only worst-case exponential runtime, in contrast to the previous one which was even best-case exponential
On the Expressivity and Applicability of Model Representation Formalisms
A number of first-order calculi employ an explicit model representation
formalism for automated reasoning and for detecting satisfiability. Many of
these formalisms can represent infinite Herbrand models. The first-order
fragment of monadic, shallow, linear, Horn (MSLH) clauses, is such a formalism
used in the approximation refinement calculus. Our first result is a finite
model property for MSLH clause sets. Therefore, MSLH clause sets cannot
represent models of clause sets with inherently infinite models. Through a
translation to tree automata, we further show that this limitation also applies
to the linear fragments of implicit generalizations, which is the formalism
used in the model-evolution calculus, to atoms with disequality constraints,
the formalisms used in the non-redundant clause learning calculus (NRCL), and
to atoms with membership constraints, a formalism used for example in decision
procedures for algebraic data types. Although these formalisms cannot represent
models of clause sets with inherently infinite models, through an additional
approximation step they can. This is our second main result. For clause sets
including the definition of an equivalence relation with the help of an
additional, novel approximation, called reflexive relation splitting, the
approximation refinement calculus can automatically show satisfiability through
the MSLH clause set formalism.Comment: 15 page
Finding Minimal Cost Herbrand Models with Branch-Cut-and-Price
Given (1) a set of clauses in some first-order language and (2)
a cost function , mapping each
ground atom in the Herbrand base to a non-negative real, then
the problem of finding a minimal cost Herbrand model is to either find a
Herbrand model of which is guaranteed to minimise the sum of the
costs of true ground atoms, or establish that there is no Herbrand model for
. A branch-cut-and-price integer programming (IP) approach to solving this
problem is presented. Since the number of ground instantiations of clauses and
the size of the Herbrand base are both infinite in general, we add the
corresponding IP constraints and IP variables `on the fly' via `cutting' and
`pricing' respectively. In the special case of a finite Herbrand base we show
that adding all IP variables and constraints from the outset can be
advantageous, showing that a challenging Markov logic network MAP problem can
be solved in this way if encoded appropriately
On the Expressivity and Applicability of Model Representation Formalisms
A number of first-order calculi employ an explicit model representation formalism for automated reasoning and for detecting satisfiability. Many of these formalisms can represent infinite Herbrand models. The first-order fragment of monadic, shallow, linear, Horn (MSLH) clauses, is such a formalism used in the approximation refinement calculus. Our first result is a finite model property for MSLH clause sets. Therefore, MSLH clause sets cannot represent models of clause sets with inherently infinite models. Through a translation to tree automata, we further show that this limitation also applies to the linear fragments of implicit generalizations, which is the formalism used in the model-evolution calculus, to atoms with disequality constraints, the formalisms used in the non-redundant clause learning calculus (NRCL), and to atoms with membership constraints, a formalism used for example in decision procedures for algebraic data types. Although these formalisms cannot represent models of clause sets with inherently infinite models, through an additional approximation step they can. This is our second main result. For clause sets including the definition of an equivalence relation with the help of an additional, novel approximation, called reflexive relation splitting, the approximation refinement calculus can automatically show satisfiability through the MSLH clause set formalism
Herbrand Consistency of Some Arithmetical Theories
G\"odel's second incompleteness theorem is proved for Herbrand consistency of
some arithmetical theories with bounded induction, by using a technique of
logarithmic shrinking the witnesses of bounded formulas, due to Z. Adamowicz
[Herbrand consistency and bounded arithmetic, \textit{Fundamenta Mathematicae}
171 (2002) 279--292]. In that paper, it was shown that one cannot always shrink
the witness of a bounded formula logarithmically, but in the presence of
Herbrand consistency, for theories with , any witness for any bounded formula can be shortened logarithmically. This
immediately implies the unprovability of Herbrand consistency of a theory
in itself.
In this paper, the above results are generalized for . Also after tailoring the definition of Herbrand
consistency for we prove the corresponding theorems for . Thus the Herbrand version of G\"odel's second incompleteness
theorem follows for the theories and
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