On the Derived Invariance of Cohomology Theories for Coalgebras
We study the derived invariance of the cohomology theories Hoch*, H* and HC* associated with coalgebras over a field. We prove a theorem characterizing derived equivalences. As particular cases, it describes the two following situations: (1) f: C → D a quasi-isomorphism of differential graded coalge...
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Formato: | JOUR |
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Acceso en línea: | http://hdl.handle.net/20.500.12110/paper_1386923X_v6_n3_p303_Farinati |
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Sumario: | We study the derived invariance of the cohomology theories Hoch*, H* and HC* associated with coalgebras over a field. We prove a theorem characterizing derived equivalences. As particular cases, it describes the two following situations: (1) f: C → D a quasi-isomorphism of differential graded coalgebras, (2) the existence of a 'cotilting' bicomodule CTD In these two cases we construct a derived-Morita equivalence context, and consequently we obtain isomorphisms Hoch*(C) ≅ Hoch*(D) and H*(C) ≅ H*(D). Moreover, when we have a coassociative map inducing an isomorphism H*(C) ≅ H* (D) (for example, when there is a quasi-isomorphism f: C → D), we prove that HC*(C) ≅ HC*(D). |
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