Tensor product: Difference between revisions

Revision as of 18:27, 9 December 2007

The tensor product is a bifunctor in the category of modules over a fixed ring $R$ . In the subcategory of algebras over $R$ , the tensor product is just the cofibered product over $R$ .

Definition

The tensor product of two $R$ -modules $M$ and $M'$ , denoted by $M\otimes _{R}M'$ , is an $R-module$ $T$ satisfying the universal property

Functoriality

Tensor products in linear algebra

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 ==Definition==
-The ''tensor product'' of two <math>R</math>-modules <math>M</math> and <math>M'</math>, denoted by <math>M\tensor_R M'</math>, is an <math>R-module</math> <math>T</math> satisfying the universal property
+The ''tensor product'' of two <math>R</math>-modules <math>M</math> and <math>M'</math>, denoted by <math>M\otimes_R M'</math>, is an <math>R-module</math> <math>T</math> satisfying the universal property
 ==Functoriality==

Tensor product: Difference between revisions

Revision as of 18:27, 9 December 2007

Definition

Functoriality

Tensor products in linear algebra

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