We establish decidability for the infinitely many axiomatic extensions of the commutative Full Lambek logic with weakening FLew (i.e. IMALLW) that have a cut-free hypersequent proof calculus (specifically: every analytic structural rule extension). Decidability for the corresponding extensions of its contraction counterpart FLec was established recently but their computational complexity was left unanswered. In the second part of this paper, we introduce just enough on length functions for well-quasi-orderings and the fast-growing complexity classes to obtain complexity upper bounds for both the weakening and contraction extensions. A specific instance of this result yields the first complexity bound for the prominent fuzzy logic MTL (monoidal t-norm based logic) providing an answer to a long-standing open problem.
翻译:我们确定通货兰贝克通货逻辑的无限多非理性扩展的可变性,其衰弱的FLew(即IMALLW)具有截断性超后序校验微积分(具体地说:每个分析结构规则延伸),其收缩对应方FLec的相应扩展的可变性最近才确立,但其计算复杂性却未被解答。在本文第二部分,我们引入了足够长的长的功能,用于测序和快速增长的复杂等级,以获得减弱和收缩扩展的复杂上限。这一结果的具体实例产生了突出的烟雾逻辑MTL(以分子为基的逻辑)的第一复杂度,为长期未解决的问题提供了答案。
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