Derived Equivalence induced by n-tilting modules
Abstract
Let TR be a right n-tilting module over an arbitrary associative ring R. In this paper we prove that there exists a n-tilting module T'R equivalent to TR which induces a derived equivalence between the unbounded derived category (R) and a triangulated subcategory E of ((T')) equivalent to the quotient category of ((T')) modulo the kernel of the total left derived functor - LS'T'. In case TR is a classical n-tilting module, we get again the Cline-Parshall-Scott and Happel's results.
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