Answer to Question #222101 in Abstract Algebra for Komal

Question #222101
Prove that subring of Noetherian Ring need not be noetherian.
1
Expert's answer
2021-08-11T15:32:07-0400

Let K be a field and consider "S= K[x_1,x_2,...]" be the polynomial ring in infinitely many variables over K. Let R denote the field of fractions of S. R is Noetherian being a field but S is not, because there exists a non terminating strictly increasing chain of ideals of S

"\\langle x_1\\rangle \\sub \\langle x_1,x_2\\rangle \\sub \\langle x_1, x_2, x_3\\rangle \\sub ... \\langle x_1, x_2, ... ,x_n\\rangle \\sub ..."



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