On the birational isotriviality of the Albanese morphism of a log Calabi-Yau pair with a torus action

Abstract

Let (X,) be a projective, log canonical, K-trivial pair over the complex numbers. Let Z be a minimal log canonical center of (X,) and suppose that there exists a torus T⊂eqAut(X) preserving and such that =codimX Z. Then we show that two general fibers of the Albanese morphism albX are birationally equivalent. In particular, the pathological example of a projective, log canonical, K-trivial variety whose Albanese morphism is not generically birationally isotrivial, recently constructed by Bernasconi, Filipazzi, Patakfalvi and Tsakanikas, can be avoided under the additional hypothesis that there exists a torus of large enough dimension in the automorphism group of the given pair.