Exceptional cycles in triangular matrix algebras
Abstract
An exceptional cycle in a triangulated category with Serre functor is a generalization of a spherical object. Suppose that A and B are Gorenstein algebras, given a perfect exceptional n-cycle E* in Kb(A- proj) and a perfect exceptional m-cycle F* in Kb(B- proj), we construct an A-B-bimodule N, and prove the product E* F* is an exceptional (n+m-1)-cycle in Kb(- proj), where =pmatrixA & N\\ 0 & B pmatrix. Using this construction, one gets many new exceptional cycles which is unknown before for certain class of algebras.
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