Talk:Clebsch-Gordan coefficients: Difference between revisions
imported>Paul Wormer (→Confusement: new section) |
imported>Jitse Niesen (→Notation of eigenstates: "I see what you mean, yes. In that case, let's leave it as it is, at least until somebody has a better idea.") |
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In the original WP text the ''i'' in ''j''<sub> ''i''</sub> could stand for ''x'', ''y'', or ''z'', or for "particle number" 1 or 2. In some situations this was confusing, so I introduced ''x'', ''y'' and ''z''.--[[User:Paul Wormer|Paul Wormer]] 07:32, 7 October 2007 (CDT) | In the original WP text the ''i'' in ''j''<sub> ''i''</sub> could stand for ''x'', ''y'', or ''z'', or for "particle number" 1 or 2. In some situations this was confusing, so I introduced ''x'', ''y'' and ''z''.--[[User:Paul Wormer|Paul Wormer]] 07:32, 7 October 2007 (CDT) | ||
== Notation of eigenstates == | |||
Is there a difference between the states <math>|(j_1j_2)JM\rangle</math> and <math>|JM\rangle</math>? I guess not, because the latter notation appears in the orthogonality relation | |||
:<math> | |||
\langle J M | J' M' \rangle = \delta_{J\, J'}\delta_{M\,M'} | |||
</math> | |||
without any comment. I find it rather confusing that both notations appear in the definition | |||
:<math> | |||
|(j_1j_2)JM\rangle = \sum_{m_1=-j_1}^{j_1} \sum_{m_2=-j_2}^{j_2} | |||
|j_1m_1\rangle|j_2m_2\rangle \langle j_1m_1j_2m_2|JM\rangle | |||
</math> | |||
for the CG coeffs. -- [[User:Jitse Niesen|Jitse Niesen]] 06:37, 30 July 2008 (CDT) | |||
Incidentally, the book we used when learning quantum mechanics (Quantum Physics by Stephen Gasiorowicz) calls them Wigner coefficients; is it just a strange book or is that name really used or are Wigner coefficients something subtly different? -- [[User:Jitse Niesen|Jitse Niesen]] 06:47, 30 July 2008 (CDT) | |||
And another question: the [http://en.citizendium.org/wiki?title=Clebsch-Gordan_coefficients&action=history edit history] shows that the from-wp flag suddenly disappears. Was this done on purpose? -- [[User:Jitse Niesen|Jitse Niesen]] 07:11, 30 July 2008 (CDT) | |||
:You are right both notations are in this article for the same ket <math>|(j_1j_2)JM\rangle \equiv |JM\rangle</math>. But very often only ''J'' and ''M'' are important and the small ''j'''s aren't. Also in a different context the ket <math>|JM\rangle</math> may have another origin than the coupling of two small ''j''s (e.g., only one ''j'' or more than two ''j''s). | |||
:The CG coefficients are sometimes written as | |||
::<math> | |||
\langle j_1 m_1;j_2m_2| (j_1j_2) JM \rangle | |||
</math> | |||
:but this notation is redundant in that the same two small ''j''s are given twice in one symbol. | |||
:Some authors use indeed the term "Wigner coefficients", which historically is a much better name. But the majority of authors (especially the mathematically oriented authors) use Clebsch-Gordan for all sorts of groups, not just SO(3) and SU(2). | |||
:About the Wiki flag: is it necessary to activate it for any edit? I thought that only the first time would be sufficient, because from the history of the article is then clear that it comes from WP. | |||
:I'm melting away in my study right now, so I won't make any changes to this or any other article until the weather cools down.--[[User:Paul Wormer|Paul Wormer]] 08:27, 30 July 2008 (CDT) | |||
::I made some small changes according to your replies. I'm pretty sure that the Wiki flag should be activated at every edit. This does more than putting a W in the history, it also puts a text at the bottom of the article, saying that parts come from Wikipedia. I couldn't find a clear statement about this, but [[CZ:How to convert Wikipedia articles to Citizendium articles]] says | |||
:::''The "Content is from Wikipedia?" box is for the article as a whole, and not just the current edit.'' | |||
::and the (obsoleted) page [[CZ:The Big Cleanup]] says | |||
:::''Check the "Content is from Wikipedia?" box if any part of the article is sourced from Wikipedia.'' | |||
::Finally, another question. The section on the orthogonality relations start with saying that these are most clearly written down by introducing the`alternative notation <math> \langle J M|j_1 m_1 j_2 m_2\rangle \equiv \langle j_1 m_1 j_2 m_2|J M \rangle </math>. But this is true by definition (using that the coefficients are real). I think stressing such a basic property of bra-ket notation may confuse people and it may be better to delete this sentence. -- [[User:Jitse Niesen|Jitse Niesen]] 10:02, 2 August 2008 (CDT) | |||
:::Jitse, you are right again, but since not too many authors stress that a CG coefficient can be seen as an inner product, this remark has some use. Often (also by Wigner in his book) CG coefficients are introduced as elements of a matrix that, through a similarity transformation, reduces an outer product representation of a group. That is, it decomposes the representation matrices into block-diagonal matrices with irreducible blocks on the diagonal. This matrix is of course unitary since only orthonormal bases come into play. I always liked this inner product (bra-ket) character of the CG coefficient, and convinced my former colleague of the usefulness of this view. My former colleague (Gerrit Groenenboom) is the main author of the WP article. --[[User:Paul Wormer|Paul Wormer]] 10:35, 2 August 2008 (CDT) | |||
:::PS I looked at the WP history, and have to qualify: Gerrit Groenenboom is one of the main authors.--[[User:Paul Wormer|Paul Wormer]] 10:47, 2 August 2008 (CDT) | |||
::::I see what you mean, yes. In that case, let's leave it as it is, at least until somebody has a better idea. -- [[User:Jitse Niesen|Jitse Niesen]] 06:23, 3 August 2008 (CDT) |
Latest revision as of 05:23, 3 August 2008
From Wikipedia, I changed the lead, added equation for explicit expression (plus discussion) and one special case.--Paul Wormer 03:45, 22 August 2007 (CDT)
Confusement
In the original WP text the i in j i could stand for x, y, or z, or for "particle number" 1 or 2. In some situations this was confusing, so I introduced x, y and z.--Paul Wormer 07:32, 7 October 2007 (CDT)
Notation of eigenstates
Is there a difference between the states and ? I guess not, because the latter notation appears in the orthogonality relation
without any comment. I find it rather confusing that both notations appear in the definition
for the CG coeffs. -- Jitse Niesen 06:37, 30 July 2008 (CDT)
Incidentally, the book we used when learning quantum mechanics (Quantum Physics by Stephen Gasiorowicz) calls them Wigner coefficients; is it just a strange book or is that name really used or are Wigner coefficients something subtly different? -- Jitse Niesen 06:47, 30 July 2008 (CDT)
And another question: the edit history shows that the from-wp flag suddenly disappears. Was this done on purpose? -- Jitse Niesen 07:11, 30 July 2008 (CDT)
- You are right both notations are in this article for the same ket . But very often only J and M are important and the small j's aren't. Also in a different context the ket may have another origin than the coupling of two small js (e.g., only one j or more than two js).
- The CG coefficients are sometimes written as
- but this notation is redundant in that the same two small js are given twice in one symbol.
- Some authors use indeed the term "Wigner coefficients", which historically is a much better name. But the majority of authors (especially the mathematically oriented authors) use Clebsch-Gordan for all sorts of groups, not just SO(3) and SU(2).
- About the Wiki flag: is it necessary to activate it for any edit? I thought that only the first time would be sufficient, because from the history of the article is then clear that it comes from WP.
- I'm melting away in my study right now, so I won't make any changes to this or any other article until the weather cools down.--Paul Wormer 08:27, 30 July 2008 (CDT)
- I made some small changes according to your replies. I'm pretty sure that the Wiki flag should be activated at every edit. This does more than putting a W in the history, it also puts a text at the bottom of the article, saying that parts come from Wikipedia. I couldn't find a clear statement about this, but CZ:How to convert Wikipedia articles to Citizendium articles says
- The "Content is from Wikipedia?" box is for the article as a whole, and not just the current edit.
- and the (obsoleted) page CZ:The Big Cleanup says
- Check the "Content is from Wikipedia?" box if any part of the article is sourced from Wikipedia.
- I made some small changes according to your replies. I'm pretty sure that the Wiki flag should be activated at every edit. This does more than putting a W in the history, it also puts a text at the bottom of the article, saying that parts come from Wikipedia. I couldn't find a clear statement about this, but CZ:How to convert Wikipedia articles to Citizendium articles says
- Finally, another question. The section on the orthogonality relations start with saying that these are most clearly written down by introducing the`alternative notation . But this is true by definition (using that the coefficients are real). I think stressing such a basic property of bra-ket notation may confuse people and it may be better to delete this sentence. -- Jitse Niesen 10:02, 2 August 2008 (CDT)
- Jitse, you are right again, but since not too many authors stress that a CG coefficient can be seen as an inner product, this remark has some use. Often (also by Wigner in his book) CG coefficients are introduced as elements of a matrix that, through a similarity transformation, reduces an outer product representation of a group. That is, it decomposes the representation matrices into block-diagonal matrices with irreducible blocks on the diagonal. This matrix is of course unitary since only orthonormal bases come into play. I always liked this inner product (bra-ket) character of the CG coefficient, and convinced my former colleague of the usefulness of this view. My former colleague (Gerrit Groenenboom) is the main author of the WP article. --Paul Wormer 10:35, 2 August 2008 (CDT)
- PS I looked at the WP history, and have to qualify: Gerrit Groenenboom is one of the main authors.--Paul Wormer 10:47, 2 August 2008 (CDT)
- Finally, another question. The section on the orthogonality relations start with saying that these are most clearly written down by introducing the`alternative notation . But this is true by definition (using that the coefficients are real). I think stressing such a basic property of bra-ket notation may confuse people and it may be better to delete this sentence. -- Jitse Niesen 10:02, 2 August 2008 (CDT)
- I see what you mean, yes. In that case, let's leave it as it is, at least until somebody has a better idea. -- Jitse Niesen 06:23, 3 August 2008 (CDT)
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