Moduli spaces of semiorthogonal decompositions in families

Abstract

To a smooth and proper morphism X U with quasicompact semiseparated target we associate a sheaf in the \'etale topology, which takes an affine U-scheme V to the set of V-linear semiorthogonal decompositions (of fixed length) of the category PerfXV. We use Artin's criterion to prove that, when U is excellent, this is in fact an algebraic space which is moreover \'etale (though in general non-quasicompact and non-separated) over U. We moreover generalise the construction of the sheaf to families of geometric noncommutative schemes in the sense of Orlov. We also define a subfunctor classifying nontrivial semiorthogonal decompositions, and conjecture it is an open and closed subspace. Along the way, we prove that for a smooth and proper family of schemes, a semiorthogonal decomposition of the bounded derived category of coherent sheaves of a fibre uniquely deforms over an \'etale neighbourhood of the point.