Eilenberg–Watts theorem

Template:Short description In mathematics, specifically homological algebra, the Eilenberg–Watts theorem tells when a functor between the categories of modules is given by an application of a tensor product. Precisely, it says that a functor ${\displaystyle F:{𝐌𝐨𝐝}_R\to {𝐌𝐨𝐝}_S}$ is additive, is right-exact and preserves coproducts if and only if it is of the form ${\displaystyle F\simeq -{\otimes }_{R}F(R)}$.^[1]

For a proof, see The theorems of Eilenberg & Watts (Part 1)

Template:Reflist

• Charles E. Watts, Intrinsic characterizations of some additive functors, Proc. Amer. Math. Soc. 11, 1960, 5–8.
• Samuel Eilenberg, Abstract description of some basic functors, J. Indian Math. Soc. (N.S.) 24, 1960, 231–234 (1961).

• Eilenberg-Watts theorem in nLab

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