Let R be an integral domain. a) Show that if R is normal, then so is S-1R for any multiplicatively closed set S. b) Show that if the localization Rm at every maximal ideal m C R is normal, 7. then R is normal. c) Show that the localization R, at an element a is isomorphic to the ring R[T]/(aT – 1), and interpret this statement geometrically. Is the assump- tion that R be an integral domain crucial for this statement?

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part b andc solution

7.
Let R be an integral domain.
a) Show that if R is normal, then so is S-'R for any multiplicatively closed
set S.
b) Show that if the localization Rm at every maximal ideal m C R is normal,
then R is normal.
c) Show that the localization R. at an element a is isomorphic to the ring
R[T]/(aT – 1), and interpret this statement geometrically. Is the assump-
tion that R be an integral domain crucial for this statement?
Transcribed Image Text:7. Let R be an integral domain. a) Show that if R is normal, then so is S-'R for any multiplicatively closed set S. b) Show that if the localization Rm at every maximal ideal m C R is normal, then R is normal. c) Show that the localization R. at an element a is isomorphic to the ring R[T]/(aT – 1), and interpret this statement geometrically. Is the assump- tion that R be an integral domain crucial for this statement?
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