正则逻辑的弦图(扩展抽象)

Brendan Fong, David I. Spivak
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引用次数: 5

摘要

规则逻辑可以看作是规则范畴的内部语言,但逻辑本身一般不给予范畴处理。本文从集合T上的自由正则范畴FRg(T)的角度理解了正则逻辑的句法和证明规则。从这个角度来看,正则理论是从合适的2范畴上下文——FRg(T)中关系的2范畴——到偏序集的2范畴的某些一元2函子。这样的函子将该上下文中的一组公式按推导顺序赋值给每个上下文。我们把这样的2函子称为正则微积分,因为它自然地产生了乔伊亚尔和斯特街精神中的图形弦图微积分。我们将证明每一个自然范畴都有一个相关的正则演算,反过来,从每一个正则演算可以构造一个正则范畴。
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String Diagrams for Regular Logic (Extended Abstract)
Regular logic can be regarded as the internal language of regular categories, but the logic itself is generally not given a categorical treatment. In this paper, we understand the syntax and proof rules of regular logic in terms of the free regular category FRg(T) on a set T. From this point of view, regular theories are certain monoidal 2-functors from a suitable 2-category of contexts -- the 2-category of relations in FRg(T) -- to that of posets. Such functors assign to each context the set of formulas in that context, ordered by entailment. We refer to such a 2-functor as a regular calculus because it naturally gives rise to a graphical string diagram calculus in the spirit of Joyal and Street. We shall show that every natural category has an associated regular calculus, and conversely from every regular calculus one can construct a regular category.
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