Tensor product: Difference between revisions
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imported>Giovanni Antonio DiMatteo |
imported>Giovanni Antonio DiMatteo |
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==Functoriality== | ==Functoriality== | ||
The functor <math>-\otimes_R M</math> is right-exact from the category of (right) <math>R-modules</math> to the category of <math>R</math>-modules. | |||
The derived functors <math>Tor^n_R(-,-)</math>. | |||
==Tensor products in linear algebra== | ==Tensor products in linear algebra== |
Revision as of 17:12, 12 December 2007
The tensor product is a bifunctor in the category of modules over a fixed ring . In the subcategory of algebras over , the tensor product is just the cofibered product over .
Definition
The tensor product of two -modules and , denoted by , is an -module satisfying the universal property
Functoriality
The functor is right-exact from the category of (right) to the category of -modules.
The derived functors .