Is associated graded algebra $mathrm{gr}(k[x_1, ldots, x_n]/I)$ isomorphic as a vector space to $k[x_1,...












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Let $A=k[x_1, ldots, x_n]$ be the polynomial ring generated by $x_1, ldots, x_n$. Let $I$ be an ideal of $k[x_1, ldots, x_n]$ (it is possible that $I$ is not homogeneous).



The algebra $A$ is a graded algebra: $A = oplus_{i ge 0} A_i$, where $A_i$ consists of degree $i$ homogeneous polynomials.



The algebra $A/I=k[x_1, ldots, x_n]/I$ is a filtered algebra with the filtration $F_i(A/I) = (F_i(A)+I)/I$, where $F_i(A)=oplus_{j le i} A_j$.




Is associated graded algebra $$mathrm{gr}(k[x_1, ldots, x_n]/I)=mathrm{gr}(A/I)=oplus_{i ge 0} F_i(A)/(F_{i-1}(A) + F_i(A) cap I)$$ isomorphic as a vector space to $k[x_1, ldots, x_n]/I$?




Thank you very much.










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    Let $A=k[x_1, ldots, x_n]$ be the polynomial ring generated by $x_1, ldots, x_n$. Let $I$ be an ideal of $k[x_1, ldots, x_n]$ (it is possible that $I$ is not homogeneous).



    The algebra $A$ is a graded algebra: $A = oplus_{i ge 0} A_i$, where $A_i$ consists of degree $i$ homogeneous polynomials.



    The algebra $A/I=k[x_1, ldots, x_n]/I$ is a filtered algebra with the filtration $F_i(A/I) = (F_i(A)+I)/I$, where $F_i(A)=oplus_{j le i} A_j$.




    Is associated graded algebra $$mathrm{gr}(k[x_1, ldots, x_n]/I)=mathrm{gr}(A/I)=oplus_{i ge 0} F_i(A)/(F_{i-1}(A) + F_i(A) cap I)$$ isomorphic as a vector space to $k[x_1, ldots, x_n]/I$?




    Thank you very much.










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      Let $A=k[x_1, ldots, x_n]$ be the polynomial ring generated by $x_1, ldots, x_n$. Let $I$ be an ideal of $k[x_1, ldots, x_n]$ (it is possible that $I$ is not homogeneous).



      The algebra $A$ is a graded algebra: $A = oplus_{i ge 0} A_i$, where $A_i$ consists of degree $i$ homogeneous polynomials.



      The algebra $A/I=k[x_1, ldots, x_n]/I$ is a filtered algebra with the filtration $F_i(A/I) = (F_i(A)+I)/I$, where $F_i(A)=oplus_{j le i} A_j$.




      Is associated graded algebra $$mathrm{gr}(k[x_1, ldots, x_n]/I)=mathrm{gr}(A/I)=oplus_{i ge 0} F_i(A)/(F_{i-1}(A) + F_i(A) cap I)$$ isomorphic as a vector space to $k[x_1, ldots, x_n]/I$?




      Thank you very much.










      share|cite|improve this question















      Let $A=k[x_1, ldots, x_n]$ be the polynomial ring generated by $x_1, ldots, x_n$. Let $I$ be an ideal of $k[x_1, ldots, x_n]$ (it is possible that $I$ is not homogeneous).



      The algebra $A$ is a graded algebra: $A = oplus_{i ge 0} A_i$, where $A_i$ consists of degree $i$ homogeneous polynomials.



      The algebra $A/I=k[x_1, ldots, x_n]/I$ is a filtered algebra with the filtration $F_i(A/I) = (F_i(A)+I)/I$, where $F_i(A)=oplus_{j le i} A_j$.




      Is associated graded algebra $$mathrm{gr}(k[x_1, ldots, x_n]/I)=mathrm{gr}(A/I)=oplus_{i ge 0} F_i(A)/(F_{i-1}(A) + F_i(A) cap I)$$ isomorphic as a vector space to $k[x_1, ldots, x_n]/I$?




      Thank you very much.







      abstract-algebra commutative-algebra






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      edited Dec 1 at 10:22









      user26857

      39.2k123882




      39.2k123882










      asked Nov 29 at 13:58









      LJR

      6,55641649




      6,55641649






















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          Yes.



          Observe that $mathrm{gr}(A/I)$ is also a filtered algebra, with $F_i(mathrm{gr}(A/I)) = oplus_{i=0}^r~mathrm{gr}(A/I)_i$.



          Further observe that $$dim F_i(mathrm{gr}(A/I) = sum_{i=0}^r dim mathrm{gr}(A/I)_i = sum_{i=0}^r (dim F_i(A/I) - dim F_{i-1}(A/I)) = dim F_i(A/I).$$



          Therefore $mathrm{gr}(A/I)$ is isomorphic to $A/I$ as a vector space.






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            Yes.



            Observe that $mathrm{gr}(A/I)$ is also a filtered algebra, with $F_i(mathrm{gr}(A/I)) = oplus_{i=0}^r~mathrm{gr}(A/I)_i$.



            Further observe that $$dim F_i(mathrm{gr}(A/I) = sum_{i=0}^r dim mathrm{gr}(A/I)_i = sum_{i=0}^r (dim F_i(A/I) - dim F_{i-1}(A/I)) = dim F_i(A/I).$$



            Therefore $mathrm{gr}(A/I)$ is isomorphic to $A/I$ as a vector space.






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              Yes.



              Observe that $mathrm{gr}(A/I)$ is also a filtered algebra, with $F_i(mathrm{gr}(A/I)) = oplus_{i=0}^r~mathrm{gr}(A/I)_i$.



              Further observe that $$dim F_i(mathrm{gr}(A/I) = sum_{i=0}^r dim mathrm{gr}(A/I)_i = sum_{i=0}^r (dim F_i(A/I) - dim F_{i-1}(A/I)) = dim F_i(A/I).$$



              Therefore $mathrm{gr}(A/I)$ is isomorphic to $A/I$ as a vector space.






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                Yes.



                Observe that $mathrm{gr}(A/I)$ is also a filtered algebra, with $F_i(mathrm{gr}(A/I)) = oplus_{i=0}^r~mathrm{gr}(A/I)_i$.



                Further observe that $$dim F_i(mathrm{gr}(A/I) = sum_{i=0}^r dim mathrm{gr}(A/I)_i = sum_{i=0}^r (dim F_i(A/I) - dim F_{i-1}(A/I)) = dim F_i(A/I).$$



                Therefore $mathrm{gr}(A/I)$ is isomorphic to $A/I$ as a vector space.






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                Yes.



                Observe that $mathrm{gr}(A/I)$ is also a filtered algebra, with $F_i(mathrm{gr}(A/I)) = oplus_{i=0}^r~mathrm{gr}(A/I)_i$.



                Further observe that $$dim F_i(mathrm{gr}(A/I) = sum_{i=0}^r dim mathrm{gr}(A/I)_i = sum_{i=0}^r (dim F_i(A/I) - dim F_{i-1}(A/I)) = dim F_i(A/I).$$



                Therefore $mathrm{gr}(A/I)$ is isomorphic to $A/I$ as a vector space.







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                edited Dec 1 at 10:24









                user26857

                39.2k123882




                39.2k123882










                answered Nov 29 at 15:53









                Christopher

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                6,42711628






























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