Doctrines are categorical structures very apt to study logics of different nature within a unified environment: the 2-category Dtn of doctrines. Modal interior operators are characterised as particular adjoints in the 2-category Dtn. We show that they can be constructed from comonads in Dtn as well as from adjunctions in it, and the two constructions compare. Finally we show the amount of information lost in the passage from a comonad, or from an adjunction, to the modal interior operator. The basis for the present work is provided by some seminal work of John Power.
翻译:理论是绝对的结构,非常适合在统一的环境下研究不同性质的逻辑:理论的2类Dtn, 模式内操作者被定性为2类Dtn中的特殊连接。我们表明,它们可以用Dtn Comonad以及其中的附加材料来建构,并且比较了两个构造。最后,我们显示了从一个comonad或者从一个连接到一个模式内操作者之间失去的信息数量。目前工作的基础由John Power的一些开创性工作提供。
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