Grassmannians and Singularities


Abstract in English

Let $X$ be an integral scheme of finite presentation over a field. Let $q$ be a singular closed point of $X$. We prove that there exists an open subset $V$ of $X$ containing $q$ such that $V$ admits a resolution, that is, there exists a smooth scheme $widetilde V$ and a proper birational morphism from $widetilde V$ onto $V$.

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