Magmal characterisations of cocartesian categories
Abstract
We present a survey of characterisations of cocartesian categories in terms of monoidal categories - and, more generally, magmal categories - satisfying additional properties. In particular, we show that the following are equivalent for a unital magmal category ( M, ), sharpening several classical characterisations. * ( M, ) is cocartesian monoidal. * Every object of M admits the structure of a unital magma with respect to , such that every morphism is a homomorphism, and a single compatibility condition holds between the magma structures and . * The tensor product functor M × M M admits a right adjoint.
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