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I looked at the example 14 and illstrated by picture in example 15 on page 266 and it appear to be the multiple of n  for example z_36 being <2> and <3> are the maximal ideas, the rest of the multiple of 36 are contained in 2 and 3.  I am not sure this is correct but that is what I got from it.
 
I looked at the example 14 and illstrated by picture in example 15 on page 266 and it appear to be the multiple of n  for example z_36 being <2> and <3> are the maximal ideas, the rest of the multiple of 36 are contained in 2 and 3.  I am not sure this is correct but that is what I got from it.
 
-Herr-
 
-Herr-
 +
 +
This is what I got, as well.  I see that the smallest ideals are essentially factors of the other ideals.  The "maximal" part is that they are only "contained" by the main.  At least that's how I think of it.
 +
-Tim F
  
 
Perhaps you choose the prime ones?
 
Perhaps you choose the prime ones?
 
-Josh
 
-Josh

Revision as of 15:16, 28 October 2008

How do you find the maximal ideals?
-Wooi-Chen Ng

I looked at the example 14 and illstrated by picture in example 15 on page 266 and it appear to be the multiple of n for example z_36 being <2> and <3> are the maximal ideas, the rest of the multiple of 36 are contained in 2 and 3. I am not sure this is correct but that is what I got from it. -Herr-

This is what I got, as well. I see that the smallest ideals are essentially factors of the other ideals. The "maximal" part is that they are only "contained" by the main. At least that's how I think of it. -Tim F

Perhaps you choose the prime ones? -Josh

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