通过Coend微积分打开图表

Mario Rom'an
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引用次数: 17

摘要

一元范畴中的态射通常被解释为过程,并用图形表示为方框。在实践中,我们面临的问题是如何解释非方形方框在一元范畴中应该代表什么,更重要的是,它们应该如何组成。这种情况的例子包括透镜或学习者。我们提出了这些非方框的描述,我们称之为开图,使用一元双范畴的pro函子。然后可以使用图形端点演算来推理开图及其组成。
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Open Diagrams via Coend Calculus
Morphisms in a monoidal category are usually interpreted as processes, and graphically depicted as square boxes. In practice, we are faced with the problem of interpreting what non-square boxes ought to represent in terms of the monoidal category and, more importantly, how should they be composed. Examples of this situation include lenses or learners. We propose a description of these non-square boxes, which we call open diagrams, using the monoidal bicategory of profunctors. A graphical coend calculus can then be used to reason about open diagrams and their compositions.
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