Monoidal category action

In algebra, an action of a monoidal category S on a category X is a functor

: S × X X {\displaystyle \cdot :S\times X\to X}

such that there are natural isomorphisms s ( t x ) ( s t ) x {\displaystyle s\cdot (t\cdot x)\simeq (s\cdot t)\cdot x} and e x x {\displaystyle e\cdot x\simeq x} and those natural isomorphism satisfy the coherence conditions analogous to those in S.[1] If there is such an action, S is said to act on X.

For example, S acts on itself via the monoid operation ⊗.

Notes

  1. ^ Weibel 2013, Ch. IV, Definition 4.7.

References

  • Weibel, Charles (2013). The K-book: an introduction to algebraic K-theory. Graduate Studies in Math. Vol. 145. American Mathematical Society. ISBN 978-0-8218-9132-2.


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