In mathematical logic, a ground term of a formal system is a term that does not contain any variables. Similarly, a ground formula is a formula that does not contain any variables.
In first-order logic with identity with constant symbols and , the sentence is a ground formula. A ground expression is a ground term or ground formula.
Examples
editConsider the following expressions in first order logic over a signature containing the constant symbols and for the numbers 0 and 1, respectively, a unary function symbol for the successor function and a binary function symbol for addition.
- are ground terms;
- are ground terms;
- are ground terms;
- and are terms, but not ground terms;
- and are ground formulae.
Formal definitions
editWhat follows is a formal definition for first-order languages. Let a first-order language be given, with the set of constant symbols, the set of functional operators, and the set of predicate symbols.
Ground term
editA ground term is a term that contains no variables. Ground terms may be defined by logical recursion (formula-recursion):
- Elements of are ground terms;
- If is an -ary function symbol and are ground terms, then is a ground term.
- Every ground term can be given by a finite application of the above two rules (there are no other ground terms; in particular, predicates cannot be ground terms).
Roughly speaking, the Herbrand universe is the set of all ground terms.
Ground atom
editA ground predicate, ground atom or ground literal is an atomic formula all of whose argument terms are ground terms.
If is an -ary predicate symbol and are ground terms, then is a ground predicate or ground atom.
Roughly speaking, the Herbrand base is the set of all ground atoms,[1] while a Herbrand interpretation assigns a truth value to each ground atom in the base.
Ground formula
editA ground formula or ground clause is a formula without variables.
Ground formulas may be defined by syntactic recursion as follows:
- A ground atom is a ground formula.
- If and are ground formulas, then , , and are ground formulas.
Ground formulas are a particular kind of closed formulas.
See also
edit- Open formula – Formula that contains at least one free variable
- Sentence (mathematical logic) – In mathematical logic, a well-formed formula with no free variables
References
edit- ^ Alex Sakharov. "Ground Atom". MathWorld. Retrieved October 20, 2022.
- Dalal, M. (2000), "Logic-based computer programming paradigms", in Rosen, K.H.; Michaels, J.G. (eds.), Handbook of discrete and combinatorial mathematics, p. 68
- Hodges, Wilfrid (1997), A shorter model theory, Cambridge University Press, ISBN 978-0-521-58713-6
- First-Order Logic: Syntax and Semantics