Abstract
Let $X$ be a $3$-dimensional terminal singularity of index $\geq 2$. We study projective birational morphisms $\varphi : Y \to X$ such that the exceptional divisor of $\varphi$ consists of all prime divisors with discrepancies $< 1$ (resp.\ $\leq 1$) over $X$.
Citation
Takayuki Hayakawa. "A remark on partial resolutions of $3$-dimensional terminal singularities." Nagoya Math. J. 178 117 - 127, 2005.
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