Abstract:
At the talk on October 5th the abundance conjecture for a canonical divisor on
minimal models was reduced to coincidence of the numerical dimension and the
Kodaira dimension for the divisor.
Following Kawamata's paper (2013), I will show that if the numerical dimension
for a pair $(X,K_X+B)$ is zero, then the Kodaira dimension for the pair is zero.
Here $X$ is a smooth projective variety, and the pair $(X,K_X+B)$ has log-canonical singularities. Thus, the solution of the problem is given in terms
of the log-resolutions of minimal models.
The proof is based on the paper by Simpson (1993).
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