Difference between revisions of "Morita equivalence"
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− | A Morita equivalence is an equivalence between [[algebras]]. Given a ring <math>R</math>, two <math>R</math>-algebras are defined to be Morita equivalent if their module categories are equivalent as <math>R</math>-linear categories. | + | [[Image:under-construction.png|50px|left]] |
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+ | A Morita equivalence is an equivalence between [[algebra|algebras]]. Given a ring <math>R</math>, two <math>R</math>-algebras are defined to be Morita equivalent if their module categories are equivalent as <math>R</math>-linear categories. | ||
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+ | [[Morita invariants|This page contains a list of invariants preserved under Morita equivalence]]. |
Latest revision as of 17:11, 3 January 2019
A Morita equivalence is an equivalence between algebras. Given a ring [math]R[/math], two [math]R[/math]-algebras are defined to be Morita equivalent if their module categories are equivalent as [math]R[/math]-linear categories.
This page contains a list of invariants preserved under Morita equivalence.