Non-normal purely log terminal centres in characteristic $p \geq 3$

Fabio Bernasconi

Non-normal purely log terminal centres in characteristic p ≥ 3

Abstract

In this note we show, building on a recent work of Totaro, that for every prime number p ≥ 3 there exists a purely log terminal pair (Z,S) of dimension 2p+2 whose plt centre S is not normal.

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