Generators vs. classical generators in derived categories of curves
Abstract
This is mostly an expository note about an example communicated to the author by Aise Johan de Jong. In a triangulated category T an object G is said to be a classical generator when the smallest triangulated subcategory containing G coincides with the whole T, and it is said to be a generator when the orthogonal complement to G in T is zero, i.e., when any non-zero object of T admits a non-zero map from a shift of G. Any classical generator is a generator, but not vice versa. We discuss a simple algebro-geometric example of a non-classical generator in the derived category of coherent sheaves on any smooth proper curve of genus g ≥ 2. We also overview what is known and what is not known, in general, about generators and classical generators on curves.
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