On the Ext-computability of Serre quotient categories
Mohamed Barakat and Markus Lange-Hegermann,Dec 2014
To develop a constructive description of Ext in categories of coherent sheaves over certain schemes, we establish a binatural isomorphism between the Ext-groups in Serre quotient categories A/C and a direct limit of Ext-groups in the ambient Abelian category A. For Ext1 the isomorphism follows if the thick subcategory C⊂A is localizing. For the higher extension groups we need further assumptions on C. With these categories in mind we cannot assume A/C to have enough projectives or injectives and therefore use Yoneda's description of Ext.
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@misc{2365,
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author | = | {Barakat, Mohamed and Lange-Hegermann, Markus}, |
title | = | {On the Ext-computability of Serre quotient categories}, |
howpublished | = | {}, |
month | = | {Dec}, |
year | = | {2014}, |
note | = | {}, |