Timeline for In $\mathbb{C}[x,y]$: If $\langle u,v \rangle$ is a maximal ideal, then $\langle u-\lambda,v-\mu \rangle$ is a maximal ideal?
Current License: CC BY-SA 4.0
12 events
| when toggle format | what | by | license | comment | |
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| Jul 19, 2020 at 22:05 | history | edited | Mohan | CC BY-SA 4.0 |
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| Jul 19, 2020 at 19:30 | history | rollback | Zach Teitler |
Rollback to Revision 2
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| Jul 19, 2020 at 19:29 | comment | added | Zach Teitler | Oh. I simplified away a property that the OP asked for because I wasn't paying close enough attention. | |
| Jul 19, 2020 at 19:23 | comment | added | Mohan | @ZachTeitler I knew this, but I wrote the slightly more complicated one only because the OP wanted the degrees to be at least two . | |
| Jul 19, 2020 at 19:02 | comment | added | Zach Teitler | I simplified the example a little bit, I hope you don't mind. | |
| Jul 19, 2020 at 19:01 | history | edited | Zach Teitler | CC BY-SA 4.0 |
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| Jul 19, 2020 at 17:04 | comment | added | Mohan | @ZachTeitler I tried editing, in particular to get the last term after $=$ to come before `and so ..', but for some reason it went back to this form, no idea why. | |
| Jul 19, 2020 at 16:12 | comment | added | Zach Teitler | Isn't $(y+b-a,v-b) = (y+b-a, x-b+(a-b)p(x))$? I think there should be a $-b$, but of course it doesn't matter for the conclusion. | |
| Jul 19, 2020 at 15:38 | history | edited | Mohan | CC BY-SA 4.0 |
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| Jul 19, 2020 at 15:12 | comment | added | user237522 | Thank you very much! | |
| Jul 19, 2020 at 15:10 | vote | accept | user237522 | ||
| Jul 19, 2020 at 14:35 | history | answered | Mohan | CC BY-SA 4.0 |