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Abstract
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Let
be a
commutative ring with unit. We develop a Hochschild cohomology theory in the category
of linear
functors defined from an essentially small symmetric monoidal category enriched in
-Mod, to
-Mod. The
category
is known to be symmetric monoidal too, so one can consider monoids in
and
modules over these monoids, which allows for the possibility of a Hochschild cohomology
theory. The emphasis of the article is in considering natural
hom constructions
appearing in this context. These
homs, together with the abelian structure of
, lead
to nice definitions and provide effective tools to prove the main properties and results
of the classical Hochschild cohomology theory.
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Keywords
Hochschild cohomology, enriched monoidal categories, linear
functors
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Mathematical Subject Classification
Primary: 18G90, 18M05
Secondary: 18D20
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Milestones
Received: 20 December 2023
Revised: 9 June 2024
Accepted: 2 July 2024
Published: 28 August 2024
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Publishers). |
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