CatDat

Implication Details

Assumptions: disjoint finite coproductsregular-subobject-trivial

Conclusions: trivial

Proof: For any object XX, the unique morphism !:0X! : 0 \to X is a regular monomorphism, as the equalizer of the two coprojections XXXX \rightrightarrows X \sqcup X. Therefore, it is an isomorphism.

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