Variation of singular K\"ahler-Einstein metrics: Kodaira dimension zero

Abstract

We study several questions involving relative Ricci-flat K\"ahler metrics for families of log Calabi-Yau manifolds. Our main result states that if p:(X,B) Y is a K\"ahler fiber space such that (Xy, B|Xy) is generically klt, KX/Y+B is relatively trivial and p*(m(KX/Y+B)) is Hermitian flat for some suitable integer m, then p is locally trivial. Motivated by questions in birational geometry, we investigate the regularity of the relative singular Ricci-flat K\"ahler metric corresponding to a family p:(X,B) Y of klt pairs (Xy,By) such that (KXy+By)=0. Finally, we disprove a folkore conjecture by exhibiting a one-dimensional family of elliptic curves whose relative (Ricci-) flat metric is not semipositive.