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Herbrand structure

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(Redirected from Term model) Structure over a vocabulary defined solely by syntactical properties

In first-order logic, a Herbrand structure S is a structure over a vocabulary σ that is defined solely by the syntactical properties of σ. The idea is to take the symbol strings of terms as their values, e.g. the denotation of a constant symbol c is just "c" (the symbol). It is named after Jacques Herbrand.

Herbrand structures play an important role in the foundations of logic programming.

Herbrand universe

Definition

The Herbrand universe serves as the universe in the Herbrand structure.

  1. The Herbrand universe of a first-order language L, is the set of all ground terms of L. If the language has no constants, then the language is extended by adding an arbitrary new constant.
    • The Herbrand universe is countably infinite if σ is countable and a function symbol of arity greater than 0 exists.
    • In the context of first-order languages we also speak simply of the Herbrand universe of the vocabulary σ.
  2. The Herbrand universe of a closed formula in Skolem normal form F is the set of all terms without variables that can be constructed using the function symbols and constants of F. If F has no constants, then F is extended by adding an arbitrary new constant.

Example

Let L, be a first-order language with the vocabulary

  • constant symbols: c
  • function symbols: f(·), g(·)

then the Herbrand universe of L (or σ) is {c, f(c), g(c), f(f(c)), f(g(c)), g(f(c)), g(g(c)), ...}.

Notice that the relation symbols are not relevant for a Herbrand universe.

Herbrand structure

A Herbrand structure interprets terms on top of a Herbrand universe.

Definition

Let S be a structure, with vocabulary σ and universe U. Let W be the set of all terms over σ and W0 be the subset of all variable-free terms. S is said to be a Herbrand structure iff

  1. U = W0
  2. f(t1, ..., tn) = f(t1, ..., tn) for every n-ary function symbol fσ and t1, ..., tnW0
  3. c = c for every constant c in σ

Remarks

  1. U is the Herbrand universe of σ.
  2. A Herbrand structure that is a model of a theory T is called a Herbrand model of T.

Examples

For a constant symbol c and a unary function symbol f(.) we have the following interpretation:

  • U = {c, fc, ffc, fffc, ...}
  • fcfc, ffcffc, ...
  • cc

Herbrand base

In addition to the universe, defined in § Herbrand universe, and the term denotations, defined in § Herbrand structure, the Herbrand base completes the interpretation by denoting the relation symbols.

Definition

A Herbrand base is the set of all ground atoms whose argument terms are elements of the Herbrand universe.

Examples

For a binary relation symbol R, we get with the terms from above:

{R(c, c), R(fc, c), R(c, fc), R(fc, fc), R(ffc, c), ...}

See also

Notes

  1. "Herbrand Semantics".

References

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