Generating systems, generalized Thomsen collections and derived categories of toric varieties

Abstract

Bondal claims that for a smooth toric variety X, its bounded derived category of coherent sheaves Dcb(X) is generated by the Thomsen collection T(X) of line bundles obtained as direct summands of the pushforward of OX along a Frobenius map with sufficiently divisible degree. The claim is confirmed recently. In this article, we consider a generalized Thomsen collection of line bundles T(X,D) with a Q-divisor D as an auxiliary input, which recovers Thomsen's oringinal collection by setting D=0. We introduce the notion of a generating system and prove a theorem on the generation of OX using many line bundles arising from the generating system. As an application, we verify Bondal's claim for some toric varieties, using a different argument from existing works.