Let R be a commutative ring (with identity) and let R <mi mathvariant="bold">A

gledanju0

gledanju0

Answered question

2022-06-19

Let R be a commutative ring (with identity) and let R A l g denote the category of R-algebras.
Is there a suitable notation for the full subcategory of commutative R-algebras?
I would like to know this in order to classify the polynomial ring R [ S ] - where S is a set - as an object of category ? free over set S.
In the special case R = Z the notation C R i n g will do, since rings can be recognized as Z-algebras. But what in the general case?

Answer & Explanation

Layla Love

Layla Love

Beginner2022-06-20Added 29 answers

I've seen the notation C A l g R in many places. I prefer C A l g ( R ) in order to stress the functoriality. This is also used in Yves Diers' work. Many papers restrict to commutative rings and algebras in the first place and therefore just write A l g R (which might be confusing - but this is just a local notation).
More generally, if C is a symmetric monoidal category, then I've seen C A l g ( C ), C M o n ( C ) and C o m m ( C ) for the category of commutative algebras in C. For C = M o d ( R ) one often abbreviates ? ( M o d ( R ) ) with ? ( R ), so that you would write C A l g ( R ) or C o m m ( R ) for the category of commutative R-algebras.
As for the font, instead of C A l g of course you can also write C A l g or C A l g . This is not standard (as for module categories).

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