A trichotomy for the autoequivalence groups on smooth projective surfaces
Abstract
We study autoequivalence groups of the derived categories on smooth projective surfaces, and show a trichotomy of types according to the maximal dimension of Fourier--Mukai kernels for autoequivalences. This number is 2, 3 or 4, and we also pose a conjecture on the description of autoequivalence groups if it is 2, and prove it in some special cases.
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