The two-valued weak model of the first order logic with generalized quantifier Q is generalized to be valued in complete weak complemented lattices.For finite linearly-ordered weak complemented lattice, the omitting type theorem is proved.
英
美
- 将带广义量词Q的一阶逻辑的二值弱模型推广到取值于完备弱可补格上,对有限的线性序弱可补格证明了省略型定理。