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Missed rename of Precat to WildCat #1200

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Merged
mortberg merged 3 commits into from
Nov 24, 2025
Merged

Missed rename of Precat to WildCat #1200

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52c12b3
Missed rename of Precat to WildCat
anshwad10 Feb 28, 2025
4e80cd2
Update SmashProducts.agda
anshwad10 Feb 28, 2025
0a4da42
Merge branch 'agda:master' into monoidal-wildcat
anshwad10 May 25, 2025
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4 changes: 2 additions & 2 deletions Cubical/Papers/SmashProducts.agda
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Expand Up @@ -41,10 +41,10 @@ open WCat2 using (PointedCat)
open WCat3 using (isMonoidalWildCat)

-- Definition 4 (Symmetric Monoidal wild categories)
open WCat3 using (SymmetricMonoidalPrecat)
open WCat3 using (isSymmetricWildCat)

--- 2.2 Smash Products
-- Definition 5 (Smash products -- note: defined as a coproduct in the
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@felixwellen felixwellen Mar 2, 2025

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We should leave Axel's formulation as it is - note that he uses a pushout to construct a coproduct in pointed types.

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@anshwad10 anshwad10 Mar 2, 2025

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but calling it a coproduct doesn't make sense - the smash product is a coproduct neither in the (wild) category of types nor in pointed types. I am pretty sure calling it a coproduct was a typo/mistake

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@felixwellen felixwellen Mar 2, 2025

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Ah, ok - I didn't read carefully enough. But since it is a collection of results from a paper (and it could be that he wanted to point out that it is a definition where a coproduct is used), let's better check with @aljungstrom.

-- Definition 5 (Smash products -- note: defined as a pushout in the
-- library. E.g. the ⟨ x , y ⟩ constructor here is simply
-- inr(x,y). Also note that pushₗ and pushᵣ are inverted with this
-- definition.)
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4 changes: 2 additions & 2 deletions Cubical/WildCat/BraidedSymmetricMonoidal.agda
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Expand Up @@ -104,6 +104,6 @@ module _ (M : WildCat ℓ ℓ') where
hexagon : HexagonType₁ isMonoidal Braid
symBraiding : isSymmetricBraiding isMonoidal Braid

SymmetricMonoidalPrecat : (ℓ ℓ' : Level) → Type (ℓ-suc (ℓ-max ℓ ℓ'))
SymmetricMonoidalPrecat ℓ ℓ' =
SymmetricMonoidalWildCat : (ℓ ℓ' : Level) → Type (ℓ-suc (ℓ-max ℓ ℓ'))
SymmetricMonoidalWildCat ℓ ℓ' =
Σ[ C ∈ WildCat ℓ ℓ' ] isSymmetricWildCat C