Tensor Enriched Categorical Generalization of the Eilenberg-Watts Theorem
Abstract
Let b, b' be commutative monoids in a B\'enabou cosmos. Motivated by six-functor formalisms in algebraic geometry, we prove that the category of commutative monoids over b b' is equivalent to the category of cocontinuous lax monoidal enriched functors between the monoidal enriched categories of right modules over b, b'.
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