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| 2023-02-02 04:31:37 +0200 | commented question | Jordan form and simultaneous diagonalization More informations is available at https://ask.sagemath.org/question/65752/who-is-the-encoder-of-jordan_form-in-sagemath |
| 2023-02-02 04:29:30 +0200 | commented question | Jordan form and simultaneous diagonalization More informations are available at https://ask.sagemath.org/question/65752/who-is-the-encoder-of-jordan_form-in-sagemath |
| 2023-02-02 04:29:22 +0200 | commented question | Jordan form and simultaneous diagonalization More informations are available in https://ask.sagemath.org/question/65752/who-is-the-encoder-of-jordan_form-in-sagemath |
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| 2023-01-06 02:47:06 +0200 | marked best answer | Who is the encoder of jordan_form in SageMath? One month ago, the following question involving the function jordan_form was posted https://ask.sagemath.org/question/653... but it got no answer. Answering this question requires to know how the function jordan_form was encoded, so it may be more relevant to ask directly the one who encoded this function in SageMath. Who is it? |
| 2023-01-05 11:03:30 +0200 | commented answer | Who is the encoder of jordan_form in SageMath? Next, should I choose a relevant contributor and send him/her an email? |
| 2023-01-05 08:14:01 +0200 | edited question | Who is the encoder of jordan_form in SageMath? Who is the encoder of jordan_form in SageMath? One month ago, the following question involving the function jordan_form |
| 2023-01-05 08:13:38 +0200 | edited question | Who is the encoder of jordan_form in SageMath? Who is the encoder of jordan_form in SageMath? One month ago, the following question involving the function jordan_form |
| 2023-01-05 08:11:34 +0200 | asked a question | Who is the encoder of jordan_form in SageMath? Who is the encoder of jordan_form in SageMath? One month ago, the following question involving the function jordan_form |
| 2022-12-12 09:35:41 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $m$ be a block diagonal matrix $diag(b_1, \dot |
| 2022-12-11 11:41:39 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $m$ be a block diagonal matrix $diag(b_1, \dot |
| 2022-12-11 11:40:21 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $m$ be a block diagonal matrix $diag(b_1, \dot |
| 2022-12-11 11:32:00 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $m$ be a block diagonal matrix $diag(b_1, \dot |
| 2022-12-11 11:29:40 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $m$ be a block diagonal matrix $diag(b_1, \dot |
| 2022-12-11 11:27:01 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $m$ be a block diagonal matrix $diag(b_1, \dot |
| 2022-12-11 11:20:53 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $m$ be a block diagonal matrix $diag(b_1, \dot |
| 2022-12-11 11:19:35 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $m$ be a block diagonal matrix $diag(b_1, \dot |
| 2022-12-11 11:12:04 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $M$ be a block diagonal matrix $diag(B_1, \dot |
| 2022-12-11 11:07:14 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $M$ be a block diagonal matrix $diag(B_1, \dot |
| 2022-12-11 11:02:29 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $M$ be a block diagonal matrix $diag(B_1, \dot |
| 2022-12-11 10:48:55 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $M$ be a block diagonal matrix $diag(B_1, \dot |
| 2022-12-11 10:45:37 +0200 | edited question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $M$ be a block diagonal matrix $diag(B_1, \dot |
| 2022-12-11 10:08:28 +0200 | asked a question | Jordan form and simultaneous diagonalization How does SageMath compute the Jordan form of a block diagonal matrix? Let $M$ be a block diagonal matrix $diag(B_1, \dot |
| 2022-12-11 10:08:27 +0200 | asked a question | How does SageMath compute the Jordan form of a block diagonal matrix? How does SageMath compute the Jordan form of a block diagonal matrix? Let $M$ be a block diagonal matrix $diag(B_1, \dot |
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| 2022-11-02 19:03:04 +0200 | commented answer | Groebner basis step by step @jane No, I did not. |
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| 2022-06-16 18:42:37 +0200 | commented answer | All the solutions of a polynomial system over a finite ring Not so much I think, but "just" 144x144x72x3=4478976. It may be more relevant to write all the solutions into a single f |
| 2022-06-16 18:42:06 +0200 | commented answer | All the solutions of a polynomial system over a finite ring Not so much I think, but "just" $14414472*3=4478976$. It may be more relevant to write all the solutions into a single f |
| 2022-06-16 18:41:36 +0200 | commented answer | All the solutions of a polynomial system over a finite ring Not so much I think, but "just" 14414472*3=4478976. It may be more relevant to write all the solutions into a single for |
| 2022-06-16 09:12:31 +0200 | commented answer | All the solutions of a polynomial system over a finite ring I have a problem: the computation is not finishing (or too long) for the quite similar system G=[t0, t1, t2, t3, t4 + 24 |
| 2022-06-15 17:45:26 +0200 | commented answer | All the solutions of a polynomial system over a finite ring There is something called abc, see line 21 in your Sagecell link: if not isinstance(R,sage.rings.abc.IntegerModRing) |
| 2022-06-15 17:41:12 +0200 | commented answer | All the solutions of a polynomial system over a finite ring There is something called abc, one line is: if not isinstance(R,sage.rings.abc.IntegerModRing): |
| 2022-06-15 17:41:00 +0200 | commented answer | All the solutions of a polynomial system over a finite ring There is something called abc, one line is: if not isinstance(R,sage.rings.abc.IntegerModRing): |
| 2022-06-15 17:40:42 +0200 | commented answer | All the solutions of a polynomial system over a finite ring There is something called abc, one line is if not isinstance(R,sage.rings.abc.IntegerModRing): |
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.