Talk:Primary ideal

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I know the proof that

if the radical of Q is maximal, then Q is primary.

I don't have the reference to confirm this, so I'm putting it for now. (Otherwise, I will forget.) -- Taku (talk) 00:10, 23 February 2009 (UTC)Reply

The link to primal is incorrect, it point to algebraic geometry definition of primal, which is out of context. —Preceding unsigned comment added by 85.250.203.213 (talk) 06:45, 30 May 2010 (UTC)Reply

Why bother with radical?

Latest comment: 5 years ago2 comments2 people in discussion

Is it the case that for every primary ideal I, if xy is in I, either x^2 or y^2 is? This is clearly the case for primary ideals in Z. 130.132.173.59 (talk) 15:15, 12 September 2018 (UTC)Reply

Your proposition is trivially false for ${\displaystyle x=X}$  and ${\displaystyle y=Y}$  for the primary ideal ${\displaystyle (X^{3},Y^{3},XY)}$  in the ring ${\displaystyle \mathbb {Q} [X,Y]}$ . Rschwieb (talk) 16:53, 12 September 2018 (UTC)Reply