Ordet hittades på dessa språk:
Definitioner
Substantiv
- the state or condition of being complete
- (logic) The property of a logical theory that whenever a wff is valid then it must also be a theorem. Symbolically, letting T represent a theory within logic L, this can be represented as the property that whenever T \vDash φ is true, then T \vdash φ must also be true, for any wff φ of logic L.
Exempel
- THEOREM 37°. (Gödel's completeness theorem 1930.) In the predicate calculus H: (a) If \vDash F [or even if \aleph_0-\vDash F], then \vdash F. If E_1, . . . , E_k \vDash F [or even if E_1, . . . , E_k \ \aleph_0-\vDash F], then E_1, . . . , E_k \vdash F. (b) [...]
Böjningsformer