Every double category with iso-strong finite products has an underlying cartesian bicategory, via transposition of natural transformations and adjunctions extending companions and conjoints.
Comparing composites of left and right derived functors
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abstract
We introduce a new categorical framework for studying derived functors, and in particular for comparing composites of left and right derived functors. Our central observation is that model categories are the objects of a double category whose vertical and horizontal arrows are left and right Quillen functors, respectively, and that passage to derived functors is functorial at the level of this double category. The theory of conjunctions and mates in double categories, which generalizes the theory of adjunctions and mates in 2-categories, then gives us canonical ways to compare composites of left and right derived functors. We give a number of sample applications, most of which are improvements of existing proofs in the literature.
fields
math.CT 1years
2024 1verdicts
UNVERDICTED 1representative citing papers
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Transposing cartesian and other structure in double categories
Every double category with iso-strong finite products has an underlying cartesian bicategory, via transposition of natural transformations and adjunctions extending companions and conjoints.