A bound of the number of weighted blow-ups to compute the minimal log discrepancy for smooth 3-folds

SHIHOKO ISHII
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Abstract

We study a pair consisting of a smooth 3-fold defined over an algebraically closed field and a “general” ${\Bbb R}$ -ideal. We show that the minimal log discrepancy (“mld” for short) of every such a pair is computed by a prime divisor obtained by at most two weighted blow-ups. This bound is regarded as a weighted blow-up version of Mustaţă–Nakamura’s conjecture. We also show that if the mld of such a pair is not less than 1, then it is computed by at most one weighted blow-up. As a consequence, ACC of mld holds for such pairs.
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计算光滑 3 折叠最小对数差异的加权炸裂次数约束
我们研究了由定义在代数闭域上的光滑 3 折叠和 "一般"${\Bbb R}$ -ideal组成的一对。我们证明,每个这样的对的最小对数差异(简称 "mld")都是由最多两次加权炸开得到的素除数计算出来的。这一约束被视为穆斯塔法-中村猜想的加权炸毁版本。我们还证明,如果这一对的 mld 不小于 1,那么它最多通过一次加权炸毁来计算。因此,mld 的 ACC 对此类棋对成立。
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来源期刊
CiteScore
1.70
自引率
0.00%
发文量
39
审稿时长
6-12 weeks
期刊介绍: Papers which advance knowledge of mathematics, either pure or applied, will be considered by the Editorial Committee. The work must be original and not submitted to another journal.
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