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Recall the notion of a unitary pre-tabular allegory. Bicategories of relations are equivalent, but this has yet to be shown rigorously, as far as I’m aware.
Let be a unitary pre-tabular allegory.
Lemma
If and are maps, then
Proof
Let . Then and , by the modular law and the fact that projections tabulate top elements. So if and only if it is a map.
For the unit inequality, we have
The second equality follows from distributivity , which is an equality because .
Revision on October 31, 2012 at 03:21:13 by
Finn Lawler?.
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