Example of a Noetherian domain which is not equidimensional











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A finite dimensional commutative ring $R$ with unity is called equidimensional if all its minimal prime ideals have same dimension (dimension of a prime ideal $mathfrak p$ is defined to be Krull dimension of the ring $R/mathfrak p$) and every maximal ideal has the height same as dimension of the ring.



I want to have an example of a Noetherian domain which is not equidimensional.



Note that $R$ cannot be a finite type $k$ algebra, neither it can be local.



Thank you.










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    "An easy counterexample: consider the polynomial ring B=k[x,y] with coefficients in a field k, let m be a maximal ideal and p a prime ideal of height 1 not contained in m and localize B at the multiplicative subset B∖(m∪p). The ring obtained this way is semi-local, one maximal ideal is generated by m (so has height 2), the other one is generated by p and has height 1."
    – user26857
    Nov 18 at 22:22












  • Btw, people uses to distinguish among the two properties calling a ring equidimensional if it satisfies the first property, and equicodimensional if it satisfies the second property.
    – user26857
    Nov 18 at 22:24












  • @user26857 Ok but this is the definition given in Eisenbud.
    – Rtk427
    Nov 19 at 14:07

















up vote
0
down vote

favorite












A finite dimensional commutative ring $R$ with unity is called equidimensional if all its minimal prime ideals have same dimension (dimension of a prime ideal $mathfrak p$ is defined to be Krull dimension of the ring $R/mathfrak p$) and every maximal ideal has the height same as dimension of the ring.



I want to have an example of a Noetherian domain which is not equidimensional.



Note that $R$ cannot be a finite type $k$ algebra, neither it can be local.



Thank you.










share|cite|improve this question




















  • 1




    "An easy counterexample: consider the polynomial ring B=k[x,y] with coefficients in a field k, let m be a maximal ideal and p a prime ideal of height 1 not contained in m and localize B at the multiplicative subset B∖(m∪p). The ring obtained this way is semi-local, one maximal ideal is generated by m (so has height 2), the other one is generated by p and has height 1."
    – user26857
    Nov 18 at 22:22












  • Btw, people uses to distinguish among the two properties calling a ring equidimensional if it satisfies the first property, and equicodimensional if it satisfies the second property.
    – user26857
    Nov 18 at 22:24












  • @user26857 Ok but this is the definition given in Eisenbud.
    – Rtk427
    Nov 19 at 14:07















up vote
0
down vote

favorite









up vote
0
down vote

favorite











A finite dimensional commutative ring $R$ with unity is called equidimensional if all its minimal prime ideals have same dimension (dimension of a prime ideal $mathfrak p$ is defined to be Krull dimension of the ring $R/mathfrak p$) and every maximal ideal has the height same as dimension of the ring.



I want to have an example of a Noetherian domain which is not equidimensional.



Note that $R$ cannot be a finite type $k$ algebra, neither it can be local.



Thank you.










share|cite|improve this question















A finite dimensional commutative ring $R$ with unity is called equidimensional if all its minimal prime ideals have same dimension (dimension of a prime ideal $mathfrak p$ is defined to be Krull dimension of the ring $R/mathfrak p$) and every maximal ideal has the height same as dimension of the ring.



I want to have an example of a Noetherian domain which is not equidimensional.



Note that $R$ cannot be a finite type $k$ algebra, neither it can be local.



Thank you.







commutative-algebra noetherian integral-domain






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share|cite|improve this question













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edited Nov 18 at 22:13









user26857

39.2k123882




39.2k123882










asked Nov 18 at 8:16









Rtk427

223




223








  • 1




    "An easy counterexample: consider the polynomial ring B=k[x,y] with coefficients in a field k, let m be a maximal ideal and p a prime ideal of height 1 not contained in m and localize B at the multiplicative subset B∖(m∪p). The ring obtained this way is semi-local, one maximal ideal is generated by m (so has height 2), the other one is generated by p and has height 1."
    – user26857
    Nov 18 at 22:22












  • Btw, people uses to distinguish among the two properties calling a ring equidimensional if it satisfies the first property, and equicodimensional if it satisfies the second property.
    – user26857
    Nov 18 at 22:24












  • @user26857 Ok but this is the definition given in Eisenbud.
    – Rtk427
    Nov 19 at 14:07
















  • 1




    "An easy counterexample: consider the polynomial ring B=k[x,y] with coefficients in a field k, let m be a maximal ideal and p a prime ideal of height 1 not contained in m and localize B at the multiplicative subset B∖(m∪p). The ring obtained this way is semi-local, one maximal ideal is generated by m (so has height 2), the other one is generated by p and has height 1."
    – user26857
    Nov 18 at 22:22












  • Btw, people uses to distinguish among the two properties calling a ring equidimensional if it satisfies the first property, and equicodimensional if it satisfies the second property.
    – user26857
    Nov 18 at 22:24












  • @user26857 Ok but this is the definition given in Eisenbud.
    – Rtk427
    Nov 19 at 14:07










1




1




"An easy counterexample: consider the polynomial ring B=k[x,y] with coefficients in a field k, let m be a maximal ideal and p a prime ideal of height 1 not contained in m and localize B at the multiplicative subset B∖(m∪p). The ring obtained this way is semi-local, one maximal ideal is generated by m (so has height 2), the other one is generated by p and has height 1."
– user26857
Nov 18 at 22:22






"An easy counterexample: consider the polynomial ring B=k[x,y] with coefficients in a field k, let m be a maximal ideal and p a prime ideal of height 1 not contained in m and localize B at the multiplicative subset B∖(m∪p). The ring obtained this way is semi-local, one maximal ideal is generated by m (so has height 2), the other one is generated by p and has height 1."
– user26857
Nov 18 at 22:22














Btw, people uses to distinguish among the two properties calling a ring equidimensional if it satisfies the first property, and equicodimensional if it satisfies the second property.
– user26857
Nov 18 at 22:24






Btw, people uses to distinguish among the two properties calling a ring equidimensional if it satisfies the first property, and equicodimensional if it satisfies the second property.
– user26857
Nov 18 at 22:24














@user26857 Ok but this is the definition given in Eisenbud.
– Rtk427
Nov 19 at 14:07






@user26857 Ok but this is the definition given in Eisenbud.
– Rtk427
Nov 19 at 14:07

















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