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Dense morphisms of monads.

Karazeris, Panagis; Velebil, Jiří — 2007

Theory and Applications of Categories [electronic only]

A duality between infinitary varieties and algebraic theories

Jiří Adámek; Václav Koubek; Jiří Velebil — 2000

Commentationes Mathematicae Universitatis Carolinae

A duality between $λ$ -ary varieties and $λ$ -ary algebraic theories is proved as a direct generalization of the finitary case studied by the first author, F.W. Lawvere and J. Rosick’y. We also prove that for every uncountable cardinal $λ$ , whenever $λ$ -small products commute with $𝒟$ -colimits in $Set$ , then $𝒟$ must be a $λ$ -filtered category. We nevertheless introduce the concept of $λ$ -sifted colimits so that morphisms between $λ$ -ary varieties (defined to be $λ$ -ary, regular right adjoints) are precisely the functors...

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Dense morphisms of monads.

Simultaneously reflective and coreflective subcategories of presheaves.

A duality between infinitary varieties and algebraic theories