Moishezon Spaces and Projectivity Criteria

Abstract

We show that a smooth Moishezon space Y is non-projective if and only if it contains a rational curve such that -[C] ∈ NE(Y). More generally, this holds if Y has Q-factorial, log terminal singularities. We derive this as a consequence of our main technical result: that we can run the relative minimal model program when the base is a normal algebraic space Y of finite type over a field of characteristic 0. As a second application, we show that every log canonical pair (Y, ), where Y is an algebraic space of finite type over a field of characteristic 0 admits a dlt modification that is projective over Y.