The Rouquier Dimension of Quasi-Affine Schemes

Abstract

We prove that for X a regular quasi-affine scheme of dimension d, OX is a d-step generator of Dbcoh(X), establishing Orlov's conjecture in this case. We prove something weaker in the projective case. The main techniques are a spectral sequence argument borrowed from topology and the converse ghost lemma, both suitably adapted to work in this setting. Along the way we prove that on a regular scheme X of dimension d < ∞ any composition of d+1 morphisms of Dbcoh(X) which are zero on cohomology sheaves is zero.