Let $A$ be a reduced Noetherian ring. I know that $A$ has no embedded primes associated to $(0)$. It seems reasonable that then the same is true for any ideal of $A$, i.e. there are no embedded primes associated to any ideal $I\subset A$. Can you help me to prove this fact?
2026-03-25 11:52:48.1774439568
Embedded primes in reduced rings
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