Timeline for Surjectivity of $f\colon\Gamma_Z(M)\rightarrow\bigoplus_{p\in Z\backslash Z'}\Gamma_{pR_p}(M_p)$
Current License: CC BY-SA 3.0
12 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Apr 11, 2014 at 1:08 | history | edited | Karl Schwede | CC BY-SA 3.0 |
latex fixes
|
| Apr 10, 2014 at 20:44 | comment | added | user49402 | $Z$ and $Z'$ are not necessarily closed but both are stable under specialization with respect to Zariski topology. | |
| Apr 10, 2014 at 20:29 | history | edited | user49402 | CC BY-SA 3.0 |
added 323 characters in body
|
| Apr 10, 2014 at 13:22 | comment | added | Karl Schwede | Ok, one more question then. Is $Z$ closed? Is $Z'$ just some subset or is it also closed? | |
| Apr 10, 2014 at 13:20 | history | edited | Karl Schwede | CC BY-SA 3.0 |
added a clarifying statement
|
| Apr 10, 2014 at 6:39 | history | edited | user49402 | CC BY-SA 3.0 |
deleted 1 characters in body
|
| Apr 9, 2014 at 19:26 | comment | added | user49402 | Thank you for editing the text. $Z\subseteq\text{Spec } R$. From being minimal, I mean if $q\subseteq p$ for $p\in Z\backslash Z'$ and $q\in Z$ then $p=q$. | |
| Apr 9, 2014 at 19:11 | history | edited | user49402 | CC BY-SA 3.0 |
added 17 characters in body
|
| Apr 9, 2014 at 18:38 | comment | added | Karl Schwede | I cleaned up a little LaTeX but I'm not quite sure what's going on. Does $Z \subseteq \text{Spec }R$? When you say that elements are minimal in $Z$, what do you mean exactly? | |
| Apr 9, 2014 at 18:35 | history | edited | Karl Schwede | CC BY-SA 3.0 |
fixed latex
|
| Apr 9, 2014 at 17:32 | review | First posts | |||
| Apr 9, 2014 at 17:33 | |||||
| Apr 9, 2014 at 17:16 | history | asked | user49402 | CC BY-SA 3.0 |