The set of toric minimal log discrepancies

Florin Ambro

Displaying similar documents to “The set of toric minimal log discrepancies”

On numerically effective log canonical divisors.

Fukuda, Shigetaka (2002)

International Journal of Mathematics and Mathematical Sciences

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Approximation of the dilogarithm function.

Hassani, Mehdi (2007)

JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]

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Almost sure convergence for the maximum and the sum of nonstationary Gaussian sequences. (Almost sure convergence for the maximum and the sum of nonstationary guassian sequences.)

Zhao, Shengli, Peng, Zuoxiang, Wu, Songlin (2010)

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Some results on convergence rates for probabilities of moderate deviations for sums of random variables.

Li, Deli, Wang, Xiangchen, Rao, M.Bhaskara (1992)

International Journal of Mathematics and Mathematical Sciences

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On log canonical divisors that are log quasi-numerically positive

Shigetaka Fukuda (2004)

Open Mathematics

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Let (X Δ) be a four-dimensional log variety that is projective over the field of complex numbers. Assume that (X, Δ) is not Kawamata log terminal (klt) but divisorial log terminal (dlt). First we introduce the notion of “log quasi-numerically positive”, by relaxing that of “numerically positive”. Next we prove that, if the log canonical divisorK X+Δ is log quasi-numerically positive on (X, Δ) then it is semi-ample.