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Finite generation of the log canonical ring in dimension four

arXiv:0803.1691 · doi:10.1215/0023608X-2010-010

Abstract

We treat two different topics on the log minimal model program, especially for four-dimensional log canonical pairs. (a) Finite generation of the log canonical ring in dimension four. (b) Abundance theorem for irregular fourfolds. We obtain (a) as a direct consequence of the existence of four-dimensional log minimal models by using Fukuda's theorem on the four-dimensional log abundance conjecture. We can prove (b) only by using traditional arguments. More precisely, we prove the abundance conjecture for irregular $(n+1)$-folds on the assumption that the minimal model conjecture and the abundance conjecture hold in dimension $\leq n$.

14 pages; v2: completely revised and expanded version, v3: Section 5 in v2 was removed because it contained a conceptual mistake