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Hi,

Let R$R$ be commutative regular local ring. Is it true, that for every p \in Spec(R)$\mathfrak p \in \mathrm{Spec}(R)$, there is a p$\mathfrak p$-primary R$R$-regular sequence? I(I.e. an R$R$-regular sequence (x)$\bf x$ such that the ideal (x)$({\bf x})$ is p$\mathfrak p$-primary.

Regards, David)

Hi,

Let R be commutative regular local ring. Is it true, that for every p \in Spec(R), there is a p-primary R-regular sequence? I.e. an R-regular sequence (x) such that the ideal (x) is p-primary.

Regards, David

Let $R$ be commutative regular local ring. Is it true, that for every $\mathfrak p \in \mathrm{Spec}(R)$, there is a $\mathfrak p$-primary $R$-regular sequence? (I.e. an $R$-regular sequence $\bf x$ such that the ideal $({\bf x})$ is $\mathfrak p$-primary.)

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David
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primary regular sequences

Hi,

Let R be commutative regular local ring. Is it true, that for every p \in Spec(R), there is a p-primary R-regular sequence? I.e. an R-regular sequence (x) such that the ideal (x) is p-primary.

Regards, David