Polarized pairs, log minimal models, and Zariski decompositions (Q2926249)

The authors show that if \((X,B)\) is a projective log canonical pair such that \(K_X+B\) is pseudo-effective and birationally has a Nakayama-Zariski decomposition with nef positive part, then \((X,B)\) has a log minimal model. They also show that if \((X,B)\) is a projective log canonical pair such that \(K_X+B\) is big, then \((X,B)\) has a log minimal model if and only if \(K_X+B\) birationally has a Fujita-Zariski decomposition if and only if \(K_X+B\) birationally has a Cutkosky-Kawamata-Moriwaki-Zariski decomposition. Recall that a Fujita-Zariski decomposition (resp. a Cutkosky-Kawamata-Moriwaki-Zariski decomposition) of a \(\mathbb R\)-Cartier divisor \(D\) on \(X\) is an expression of the form \(D=P+N\) such that \(P\) is nef and \(N\geq 0\) and if \(f:W\to X\) is a birational morphism and \(f^*D=P'+N'\) where \(P'\) is nef and \(N'\geq 0\), then \(P'\leq f^*P\) (resp. \(H^0(X,\lfloor mP\rfloor )\to H^0(X,\lfloor mD\rfloor )\) is an isomorphism for all \(m\in \mathbb N\)).