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引用次数: 0
摘要
在这项工作中,我们研究了积分残差链,并解决了一些与研究残差格的品种中的汞齐性质有关的开放问题,或者等价于研究子结构逻辑中的演绎插值性质的开放问题。更确切地说,我们发现了一个由 2 能有限交换积分链构成的 V 形,它在残差链中不存在混汞(amalgam),也不存在一汞(one-amalgam);作为最相关的结果,这意味着下列品种不存在混汞属性:半线性交换(积分)残差格、MTL-代数、非累加和伪补全的 MTL-代数,以及它们的 n 严格大于 1 的所有 n 能子品种。这些结果导致相应的结构逻辑的演绎内插性失效。
Algebraic structure theory and interpolation failures in semilinear logics
In this work we study integral residuated chains, and we solve some open
problems related to the study of the amalgamation property in varieties of
residuated lattices, or equivalently, about the deductive interpolation
property in substructural logics. More precisely, we find a V-formation
consisting of 2-potent finite commutative integral chains that does not have an
amalgam, nor a one-amalgam, in residuated chains; as most relevant
consequences, this entails that the following varieties do not have the
amalgamation property: semilinear commutative (integral) residuated lattices,
MTL-algebras, involutive and pseudocomplemented MTL-algebras, and all of their
n-potent subvarieties for n strictly larger than 1. These results entail the
failure of the deductive interpolation property for the corresponding
substructural logics.