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R is regular local rings of Krull dimension 2.Can we find anyany ideal of height 2 different from m?
Maybe it is sotoo easy but iI want to know that: If R$R$ is regular local ringsring of Krull dimension 2$2$ and m$m$ is the maximal ideal of R$R$. It(It means that height m$m$ is 2$2$). Can we find any ideal of height 2$2$ different from m$m$?
R is regular local rings of Krull dimension 2.Can we find any ideal of height 2 different from m?
Maybe it is so easy but i want to know that: If R is regular local rings of Krull dimension 2 and m is the maximal ideal of R. It means that height m is 2. Can we find any ideal of height 2 different from m?
R is regular local rings of Krull dimension 2.Can we find any ideal of height 2 different from m?
Maybe it is too easy but I want to know that: If $R$ is regular local ring of Krull dimension $2$ and $m$ is the maximal ideal of $R$. (It means that height $m$ is $2$). Can we find any ideal of height $2$ different from $m$?
R is regular local rings of Krull dimension 2.Can we find any ideal of height 2 different from m?
Maybe it is so easy but i want to know that: If R is regular local rings of Krull dimension 2 and m is the maximal ideal of R. It means that height m is 2. Can we find any ideal of height 2 different from m?
