Stability manifolds of Kuznetsov components of prime Fano threefolds
Abstract
Let X be a cubic threefold, quartic double solid or Gushel--Mukai threefold, and Ku(X)⊂ Db(X) be its Kuznetsov component. We show that a stability condition σ on Ku(X) is Serre-invariant if and only if its homological dimension is at most 2. As a corollary, we prove that all Serre-invariant stability conditions on Ku(X) form a contractible connected component of the stability manifold.
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