Counting divisorial contractions with centre a cAn-singularity
Abstract
First, we simplify the existing classification due to Kawakita and Yamamoto of 3-dimensional divisorial contractions with centre a cAn-singularity, also called compound An singularity. Next, we describe the global algebraic divisorial contractions corresponding to a given local analytic equivalence class of divisorial contractions with centre a point. Finally, we consider divisorial contractions of discrepancy at least 2 to a fixed variety with centre a cAn-singularity. We show that if there exists one such divisorial contraction, then there exist uncountably many such divisorial contractions.
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