Failure of the semi log canonical Abundance for compact K\"ahler threefolds

Abstract

In this article we show that the semi log canonical abundance for compact K\"ahler varieties fails in dimension 3. More specifically we construct a counterexample of a compact K\"ahler (irreducible) slc threefold (X, 0) such that KX is nef and ( X, K X+ D)=0, where μ:( X, D) X is the normalization morphism, but KX is not semiample. On the other hand, we show that if we start with a compact K\"ahler semi-dlt pair, then the abundance does hold, i.e., if (X, ) is a compact K\"ahler sdlt pair of dimension 3 such that KX+ is nef, then it is semiample. We also show that if (X, ) is a compact K\"ahler slc pair of dimension 3, KX+ is nef, and (X'i, 'i+D'i)>0 for all i, where μ:(X'i, 'i+D'i) (X,) is the normalization, then KX+ is semiample.