On Grauert-Riemenschneider vanishing for Cohen-Macaulay schemes of klt type
Abstract
Given a Cohen-Macaulay scheme of klt type X and a resolution π Y X, we show that R1π*ωY=0. We deduce that if dim(X)=3, then X satisfies Grauert-Riemenschneider vanishing and therefore has rational singularities. We also obtain that in arbitrary dimension, if X is of finite type over a perfect field of characteristic p>0, then X has Qp-rational singularities.
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