Monoidal adjunction: Difference between revisions

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A monoidal adjunction is an adjunction in mathematics between monoidal categories which respects the monoidal structure.^[1][2][3]

Suppose that ${\displaystyle (𝒞,\otimes ,I)}$ and ${\displaystyle (𝒟,\bullet ,J)}$ are two monoidal categories. A monoidal adjunction between two lax monoidal functors

${\displaystyle (F,m):(𝒞,\otimes ,I)\to (𝒟,\bullet ,J)}$ and ${\displaystyle (G,n):(𝒟,\bullet ,J)\to (𝒞,\otimes ,I)}$

is an adjunction ${\displaystyle (F,G,\eta ,\epsilon )}$ between the underlying functors, such that the natural transformations

${\displaystyle \eta :1_{𝒞}\Rightarrow G\circ F}$ and ${\displaystyle \epsilon :F\circ G\Rightarrow 1_{𝒟}}$

are monoidal natural transformations.

Suppose that

${\displaystyle (F,m):(𝒞,\otimes ,I)\to (𝒟,\bullet ,J)}$

is a lax monoidal functor such that the underlying functor ${\displaystyle F:𝒞\to 𝒟}$ has a right adjoint ${\displaystyle G:𝒟\to 𝒞}$. This adjunction lifts to a monoidal adjunction ${\displaystyle (F,m)}$⊣${\displaystyle (G,n)}$ if and only if the lax monoidal functor ${\displaystyle (F,m)}$ is strong.

• Every monoidal adjunction ${\displaystyle (F,m)}$⊣${\displaystyle (G,n)}$ defines a monoidal monad ${\displaystyle G\circ F}$.

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