Minimal Discrepancy for a Terminal cDV Singularity Is 1

J. Math. Sci. Univ. Tokyo
Vol. 3 (1996), No. 2, Page 445--456.

Markushevich, Dimitri
Minimal Discrepancy for a Terminal cDV Singularity Is 1
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Abstract:
An answer to a question raised by Shokurov on the minimal discrepancy of a terminal singularity of index 1 is given. It is proved that the minimal discrepancy is 1 (it is 2 for a non-singular point and 0 for all other canonical singularities of index 1). A rough classification of terminal singularities of index 1 based on finding certain low degree monomials in their equations, and the toric techniques of weighted blow ups are used. This result has been generalized to terminal singularities of index $r>1$ by Y.Kawamata; his theorem states that the minimal discrepancy is $1/r$.

Mathematics Subject Classification (1991): Primary 14E30; Secondary 14J30
Mathematical Reviews Number: MR1424437

Received: 1995-11-07