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| 2021-08-25 14:20:30 +0200 | edited question | Compute minimal number of generators of subring Compute minimal number of generators of subring Hi all, Given a polynomial ring $R = k[x_1,...,x_n]$ over a field $k$ ( |
| 2021-08-25 14:20:10 +0200 | edited question | Compute minimal number of generators of subring Compute minimal number of generators of subring Hi all, Given a polynomial ring $R = k[x_1,...,x_n]$ over a field $k$ ( |
| 2021-08-25 00:06:08 +0200 | commented question | Compute minimal number of generators of subring That sounds excellent! If you post that (preferably with 1 simple example) I will accept it :-) (Btw, the ideal $I$ wil |
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| 2021-08-24 22:05:17 +0200 | edited question | Compute minimal number of generators of subring Compute minimal number of generators of subring Hi all, Given a polynomial ring $R = k[x_1,...,x_n]$ over a field $k$ a |
| 2021-08-24 22:05:00 +0200 | commented question | Compute minimal number of generators of subring That sounds excellent! If you post that (preferably with 1 simple example) I will accept it :-) (Btw, the ideal $I$ wil |
| 2021-08-24 21:47:43 +0200 | commented question | Compute minimal number of generators of subring That sounds excellent! If you post that (preferably with 1 simple example) I will accept it :-) |
| 2021-08-24 19:05:03 +0200 | commented question | Compute minimal number of generators of subring Thanks!! Can you please explain how it works, since it looks like A is constructed as an ideal? Here's a suggested algo |
| 2021-08-24 19:04:43 +0200 | commented question | Compute minimal number of generators of subring Thanks!! Can you please explain how it works, since it looks like A is constructed as an ideal? Here's a suggested algo |
| 2021-08-24 17:14:21 +0200 | commented question | Compute minimal number of generators of subring Huh I guess so! I don't know Singular syntax - does it work over a base field like QQ? E.g. does sagbiReduce(x4y+(5/2)x6 |
| 2021-08-24 16:57:46 +0200 | commented question | Compute minimal number of generators of subring Huh I guess so! I don't know Singular syntax - does it work over a base field like QQ? E.g. does sagbiReduce(x4y+(5/2)x6 |
| 2021-08-24 00:30:42 +0200 | edited question | Compute minimal number of generators of subring Compute minimal number of generators of subring Hi all, Given a polynomial ring $R = k[x_1,...,x_n]$ over a field $k$ a |
| 2021-08-24 00:30:04 +0200 | edited question | Compute minimal number of generators of subring Compute minimal number of generators of subring Hi all, Given a polynomial ring $R = k[x_1,...,x_n]$ over a field $k$ a |
| 2021-08-24 00:18:16 +0200 | commented answer | Compute minimal number of generators of subring Thanks but it is not the ideal generators that I'm looking for! (Downvote wasn't me btw) |
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| 2021-08-23 15:19:17 +0200 | edited question | Compute minimal number of generators of subring Compute minimal number of generators of subring Hi all, Given a polynomial ring $R = k[x_1,...,x_n]$ over a field $k$ a |
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| 2021-08-23 15:11:08 +0200 | edited question | Compute minimal number of generators of subring Compute minimal number of generators of subring Hi all, Given a polynomial ring $R = k[x_1,...,x_n]$ over a field $k$ a |
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| 2021-08-23 13:28:55 +0200 | asked a question | Compute minimal number of generators of subring Compute minimal number of generators of subring Hi all, Given a polynomial ring $R = k[x_1,...,x_n]$ over a field $k$ a |
Copyright Sage, 2010. Some rights reserved under creative commons license. Content on this site is licensed under a Creative Commons Attribution Share Alike 3.0 license.