The join $\ast$ and the product $\times$ are both important monoidal structures on simplicial sets, but the way they interact is not so simple. For instance, neither distributes over the other. However, I believe there is a comparison map $(A\times B) \ast (C \times D) \to (A \ast C) \times (B \ast D)$, suggesting that they fit together into a duoidal category structure on simplicial sets. Is this in fact the case? If so, has this duoidal category been studied before?
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asked May 8, 2018 at 18:52
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1
I probably should have read more closely. If $C$ is any monoidal category which is also cartesian monoidal, then the combination of the two monoidal structures is duoidal. This is on the nlab page.
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2$\begingroup$ Perhaps more interestingly, it looks like the join actually distributes over the product (yes, not the other way around!) but only colaxly. But on reflection, I think this too is automatic for monoidal categories with finite products. $\endgroup$ Commented May 9, 2018 at 4:37