nLab opposite (infinity,1)-category

Redirected from "opposite-(∞,1)-category".

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Idea

For $C$ an (∞,1)-category regard it in its incarnation as a ∞-groupoid-enriched category. Then its opposite is the $(\infty,1)$ -category $C^{op}$ with the same objects and with hom-objects given by

C^{op}(X,Y) := C(Y,X)

with the obvious composition law.

With $C$ incarnated as a quasi-category, the simplicial set $C^{op}$ is that obtained by reversing the order of all the face and degeneracy maps. See opposite quasi-category.

The operation extends to an automorphic (∞,1)-functor

op : (\infty,1)Cat \to (\infty,1)Cat

from (∞,1)Cat to itself. Up to equivalence, this is the only nontrivial such automorphism. For more on this see (∞,1)Cat.

Last revised on September 4, 2024 at 10:01:39. See the history of this page for a list of all contributions to it.