nLab restriction of scalars

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Algebra

Definition
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Definition

Let $f \colon R \to S$ be a homomorphism of algebraic objects such as rings. Let $\cdot_S$ be an action of $S$ on a module $M$ , then

r\cdot_R m \coloneqq f( r )\cdot_S m

defines an action of $R$ on $M$ . This construction extends to a functor

f^\ast \colon SMod \longrightarrow RMod

between categories of modules, sending $\cdot_S$ to $\cdot_R$ . This is called restriction of scalars (along $f$ ).

This functor has a left adjoint functor

f_! \; \coloneqq\; S \otimes_R (-) \;\colon\; RMod \longrightarrow SMod

called extension of scalars, since for an $R$ -module $M$ and an $R$ -module $S$ we have that $M\otimes_R S$ is a well defined tensor product of $R$ modules which becomes an $S$ module by the operation of $S$ on itself in the second factor of the tensor. We have an adjunction $f_! \dashv f^*)$ .

Not only is restriction of scalars a right adjoint, it is also a monadic functor. This can be shown using the monadicity theorem or by direct computation.

Furthermore, not only is restriction scalars a right adjoint, it is also a left adjoint. That is, it has a right adjoint of its own, called coextension of scalars:

f_* \; \coloneqq\; RMod(S, -) \;\colon\; RMod \longrightarrow SMod

Related concepts

extension of scalars $\dashv$ restriction of scalars $\dashv$ coextension of scalars

Last revised on May 12, 2023 at 15:59:36. See the history of this page for a list of all contributions to it.

nLab restriction of scalars

Context

Algebra

Algebraic theories

Algebras and modules

Higher algebras

Model category presentations

Geometry on formal duals of algebras

Theorems

Contents

Definition

Related concepts