Revision as of 02:29, 4 November 2002 editChas zzz brown (talk | contribs)Extended confirmed users805 edits Oops! Didn't see your full comments, Toby; responding to non-anti-counter-examples← Previous edit | Latest revision as of 12:12, 25 October 2024 edit undoLowercase sigmabot III (talk | contribs)Bots, Template editors2,295,503 editsm Archiving 1 discussion(s) to Talk:Group (mathematics)/Archive 8) (bot | ||
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The axiom of closure: | |||
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(Closure) for all a and b in G, a * b belong to G. | |||
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is superfluous, by definition of a ]. It's worth mentioning that closure follows from the definition, though. | |||
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The test of closure in the examples is in fact a test that the described mapping is inded a binary operation. | |||
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Any thoughts before I wade on in and make changes? | |||
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== Closure == | |||
"This was our first example of a non-abelian group, because the operation o here is not commutative as the table shows. " | |||
If the table did show commutativity, would it be symmetrical about the diagonal from top left to bottom right? | |||
TimJ | |||
5 Feb 2002 | |||
Although it is important to mention closure, there are a few things that disturb me about the way the definition of group is currently written. What is an operation, ''before'' the closure axiom is imposed? A function from G × G to some unspecified set? Not only is this a little vague, but it also contradicts the ] page it links to. Also, technically speaking, the sentence defining group is wrong, because it ends before any of the axioms are imposed. | |||
:Yes. The group is abelian if and only if the table is symmetric about the main diagonal. --], 2002 Feb 5 | |||
I would propose the following, which is slightly longer, but more explicit about the role of closure, which really should be separate from the group axioms. This also breaks the definition into more manageable chunks: first understand what a binary operation is, and then understand the definition of group. Also, this would bring this page more in line with other Misplaced Pages pages, such as ]. Finally, there are many modern textbooks at all levels that present the definition along these lines (e.g., Artin, Lang, ...); I would add such references. | |||
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Could someone put up a good description of Sylow's Theorem? | |||
:See ]. | |||
A ] ⋅ on a ] ''G'' is a rule for combining any pair ''a'', ''b'' of elements of ''G'' to form another element of ''G'', denoted {{nowrap|''a'' ⋅ ''b''}}.{{cref|b}} (The property | |||
Also, it'd be nice to see a page dedicated to examples of groups. | |||
"for all ''a'', ''b'' in ''G'', the value {{nowrap|''a'' ⋅ ''b''}} belongs to the ''same'' set ''G''" is called ]; it must be checked if it is not known initially.) | |||
A '''group''' is a set ''G'' equipped with a binary operation ⋅ satisfying the following three additional requirements, known as the ''group axioms'': | |||
Nice exercise: Classify all (isomorphism classes of) groups of order <=60. I'd like to see a page on that. | |||
;Associativity: For all ''a'', ''b'', ''c'' in ''G'', one has (''a'' ⋅ ''b'') ⋅ ''c'' = ''a'' ⋅ (''b'' ⋅ ''c''). | |||
:Do you realise how complicated this is, especially for order 32? Doing order <= 15 might be feasible, however. --], 2002 Feb 22 | |||
;Identity element: There exists an element ''e'' in ''G'' such that, for every ''a'' in ''G'', the equations {{nowrap|1=''e'' ⋅ ''a'' = ''a''}} and {{nowrap|1=''a'' ⋅ ''e'' = ''a''}} hold. Such an element is unique (]), and thus one speaks of ''the'' identity element. | |||
;Inverse element: For each ''a'' in ''G'', there exists an element ''b'' in ''G'' such that {{nowrap|1=''a'' ⋅ ''b'' = ''e''}} and {{nowrap|1=''b'' ⋅ ''a'' = ''e''}}, where ''e'' is the identity element. For each ''a'', the ''b'' is unique (]) and it is commonly denoted ''a''<sup>−1</sup>. | |||
::I started it at ]. ] | |||
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{{cnote|b|Formally, a binary operation on ''G'' is a function {{nowrap|1=''G'' × ''G'' → ''G''}}.}} | |||
It simply is not true that the translation group is "our first example of a ]" (as the article is currently arranged). (<b>Z</b>,+) is also a Lie group; it is simply ''discrete'', or 0 dimensional. 0 dimensional Lie groups (discrete groups) are studied in ordinary group theory rather than Lie theory, but they are still technically Lie groups. Hence the necessity for the adjective "nondiscrete". (If you want to change "nondiscrete" to "nontrivial", then I won't fight that, although I won't advocate it either.) -- ], 2002/04/03 | |||
Is it common to allow 0-dimensional manifolds? What could possibly be gained by that? Every set is a 0-dimensional manifold. In EDM they don't specify what ''n'' is in an ''n''-dimensional manifold, but from their definition of "manifold with boundary" it is clear that they implicitly assume ''n''>0. Furthermore, would you typically find or expect '''Z'''<sub>''p''</sub> in a list of simple Lie groups? | |||
] | |||
I would welcome advice about which defined terms should be bold and which should be italicized; I'm not sure what the convention is. | |||
:Since the upper half plane of <b>R</b><sup>0</sup> is all of <b>R</b><sup>0</sup>, every 0D manifold with boundary is actually a boundaryless manifold. So it is safe to ignore <var>n</var> = 0 in that case. But I certainly hope that EDM allows for <var>n</var> = 1 for manifolds with boundary. In that case, what dimension is the boundary of this manifold with boundary? If you don't believe in 0D manifolds, you'll have to put an annoying "unless <var>n</var> = 1" into your statement of the theorem that the boundary of an <var>n</var>D manifold with boundary is an (<var>n</var>-1)D boundaryless manifold. And that answers your question "What could possibly be gained by that?" -- you gain the rest of the just at night knowing that you don't have to hunt through your theorems for the odd "unless" and "except". This is just one example of my favourite principle in mathematics: Don't ignore the trivial case! The trivial case may seem uninteresting (that's why we call it "trivial"), but if you slight it, then it will come back to haunt you with a thousand paper cuts. | |||
] (]) 02:49, 16 December 2020 (UTC) | |||
:As for lists of simple Lie groups, I wouldn't expect to find <var>Z</var><sub><var>p</var></sub> because the classification of simple discrete groups is part of another subject. (The only things that Lie theorists need to classify are simple ''connected'' Lie groups.) But I certainly wouldn't ignore that other subject when classifying semisimple Lie groups (unless I were only interested in the connected ones, again). For example, the Lorentz group is not connected and can't be decomposed into connected simple Lie groups. But it is a semidirect product of a discrete group and a connected semisimple Lie group. So it can be decomposed into simple Lie groups, where some of these simple Lie groups are discrete and some are connected. (The only Lie group that is both discrete ''and'' connected, of course, is the trivial group, which is too simple to be simple.) Again we see that the trivial dimension cannot be profitably ignored. | |||
:I essentially agree, and I have edited the article accordingly. By the way, I have copy-edited the whole section for clarification and for using a simpler wording that is also more common in mathematics. | |||
:About "closure": the term is normally used for the restriction of a binary operation to a subset. Using it as it was done is thus an error. I guess that editors were confused by the usual definition of a subgroup as a nonempty subset on which the group operation and the inverse operation are closed. Using this definition, it is a theorem that a subgroup is a group, and that the groups axioms are thus satisfied. ] (]) 10:44, 16 December 2020 (UTC) | |||
::The above wording of the last two axioms combines an axiom (one sentence) with consequent properties (e.g. uniqueness of the identity element) that is not part of the axiom. It would be good if this separation was made clearer to the reader, since the current presentation does not adequately distinguish for the reader who is not already familiar with the exact axioms. The parts that do not form part of the axiom could be moved to under the listed axioms, for example, or preceded by "This implies that ...". —] 11:33, 4 May 2021 (UTC) | |||
:Nobody working on Lie groups is ignorant of their need for the classification of simple discrete groups. But they're so used to the fact that simple Lie groups come in 2 families (the discrete ones and the connected ones) and the fact that only 1 of those families is classified by their own field of mathematics that they naturally consider only their family to be simplie ''as'' Lie groups. And this is easy to make rigorously true by redefining the term "simple Lie group". Instead of saying that a simple Lie group is a Lie group that has exactly 2 normal subgroups, say that its normal subgroups fall into exactly 2 ''dimensions'', or that its Lie ''algebra'' is simple. (The classification of simple Lie groups, after all, is generally studied on the level of Lie algebras.) | |||
:I'm very tempted to add Closure as one of the four group axioms, as it's already one of the ]. Technically the only difference is the commutativity of the operation, so it doesn't make sense to list closure as an axiom of one but not another. ] (]) 14:20, 29 December 2021 (UTC) | |||
:So to sum up: No, I would not expect to find a discrete group on a list of simple Lie groups. But yes, I would expect to find -- and have found -- semisimple Lie groups in use that have nontrivial discrete normal subgroups, and I would expect the Lie theorists that use them to know and understand this. Lie theorists don't study discrete groups, but they ignore them at their peril, and the latter is true of anyone that would ignore the trivial case. | |||
::Please don't: "closure" is a property of subsets, and there is no subset here. The fact that the result of the operation belongs to the group is a part of the definition of an operation. By the way, I have removed the use of "closure" in ]. ] (]) 15:00, 29 December 2021 (UTC) | |||
:::Thank you, ], for pointing out the discrepancy. I agree with ] that the best solution to the issue you raise is that closure should not be listed an axiom either for group or for abelian group. ] (]) 23:01, 29 December 2021 (UTC) | |||
:Including both left and right identity and inverse is very common mistake. The existence of the left identity and inverse can be proven using the right identity and inverse and vice versa. So it is sufficient to present only one of each in the list of the axioms. Here there are some proves, for example: https://math.stackexchange.com/questions/65239/right-identity-and-right-inverse-in-a-semigroup-imply-it-is-a-group ] (]) 00:06, 20 January 2023 (UTC) | |||
::You are right that some of the axioms could be deduced from the others, but this is not a "mistake". The standard textbooks intentionally require the identity be a two-sided identity and so on, presumably because it is more natural not to favor one side. Therefore we should leave it as is. ] (]) 00:03, 23 January 2023 (UTC) | |||
In a similar vein, I modified the leading sentence to mention that the binary operation is closed (defined on the set). Seeing as the original sentence didn't call it a "binary operation" and instead called it an "operation that combines any two elements to form a third element", I would argue that in order to make this expansion clear and precise, it's required to mention that the domains/codomain are all in the set. So therefore I modified it to "an operation that combines any two elements '''of the set''' to '''produce''' a third element '''of the set'''". ] (]) 06:58, 14 March 2022 (UTC) | |||
:-- ] | |||
== Character table == | |||
:PS: Could change "nondiscrete" to "connected" as well as "nontrivial", assuming that the trivial group is never discussed above the word, but I think that that gets less at what we want to say. Could also put the word in parentheses to indicate its status as a technicality. -- Toby | |||
A major omission is any reference to ]s. These tables used extensively in chemistry: see, for example, "Chemical Applications of Group Theory", F.A. Cotton, 3rd. edn., 1990. ] (]) 08:47, 15 March 2022 (UTC) | |||
I am convinced. Allowing dimension 0 gives a much nicer category of Lie groups. For instance, the kernel of a map between "ordinary" Lie groups may very well end up to be a discrete group. We should probably add this to ]. ] | |||
== Indentation == | |||
:That's probably a better argument than anything that I said. Heh. (Certainly ''related'' to what I said but better expressed.) -- ] | |||
Why are all the main section titles double indented ==title==? They should be single indented as the menu only shows 3 levels of indentation. Currently ====items==== are present in the article, but are not shown on the menu. This will require '''all''' indents to be changed in the text. ] (]) 10:48, 26 March 2022 (UTC) | |||
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:See ]. ] (]) 11:46, 26 March 2022 (UTC)÷ | |||
:The sections of level 4 do not appear in the table of content because of the limit parameter in the template <nowiki>{{TOClimit|limit=3}}</nowiki> that appears at the end of the lead. This is a choice for having a table of content that is not too large. This choice may be discussed, but the table of content is already very large. ] (]) 12:03, 26 March 2022 (UTC) | |||
== Restructuring article? == | |||
The article contained a characterization of GL(''n'','''R''') as consisting of rotations, reflections, dilations of '''R'''<sup>''n''</sup> that keep the origin fixed; SL(''n'','''R''') was likewise explained as the rotations and reflections. I added those originally, then they were removed and readded. But they are indeed wrong. Even SL(2,'''R''') contains lots of transformation different from rotations and reflections. There are skew transformations like ], dilations like ], and combinations of these like ]. ], Thursday, May 23, 2002 | |||
The edits to this ] on ] have been reverted. That was due partially to the misuse of indentation, see ]; but also changes to content must be supported by ], with inline citations. Wish-lists/prayers like <nowiki>{{Cotton&Wilkinson}}</nowiki> are of no use; instead the text book "Advanced Inorganic Chemistry. A Comprehensive Text by Cotton F.A., Wilkinson G. (3rd edition)" can be found and read. If this is to be comprehensible as an article on mathematics, there should be some attempt to reconcile the terminology of physical chemistry with the standard language of theoretical physics and mathematics. In the case of the section "Symmetry"—a brief overview of a general topic—there has so far been no consensus to create separate brand new sections. Here they were sometimes done by copy-pasting content from the section on "Symmetry"; deleting the content, cited to ], ] et al, or to ], was unhelpful; similarly for the citation to Graham Ellis. | |||
I put them back because I thought that I saw the error — you didn't specify that the origin was fixed, so affine transformations were included. | |||
Of course, the errors were more extensive, so I've now gone over everything more carefully. | |||
What we have now should be correct; I hope that you like it. | |||
— ], Thursday, May 23, 2002 | |||
As far as groups are concerned, ] and ] are often first encountered in undergraduate courses on finite groups and angular momentum in quantum mechanics (see e.g. the treatment by ]). Separate new sections at the moment seem to be ], with no ]. It unbalances the article. The new image without citations is unhelpful. | |||
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The edits today to the article are a combination of vandalism, incompetence and ]: why delete references to physicists or ]; why delete images from the section on "Symmetry"; why favour chemistry above physics? Here are diffs of recent problematic edits, including today's. ] (]) 14:12, 26 March 2022 (UTC) | |||
], you say that there are elements of SO(<var>n</var>) that are not rotations. Did you have an example in mind? I'm 100% certain that this is wrong, and I checked with 2 other mathematical physicists (] and if you want credentials), who agree that I am not having an acid flashback or something. (Heck, it's even called the "rotation group" — which would make a nice name for an article on it.) I'm not sure that I like the description of GL(<var>n</var>) yet, and I'll think about that some more, but in any case, surely we can agree that the rotation group consists precisely of rotations? — ], Tuesday, May 28, 2002 | |||
:I think this is overly harsh. You were right to revert the changes, but that's because we should be conservative with FAs. But there were not CIR-level problems with the changes proposed. If this was not FA quality, I'd say this is what we should expect from the BRD cycle. Additionally, I think there is a problem with the article that I rasied during the FA process that it does not make enough of the applications outside mathematics. While the concept might fundamentally be a mathematical one, its most exciting applications lie in chemistry and physics and the article should not assume that the interest of the reader primarily comes from mathematics. — ] <small>]</small> 14:19, 26 March 2022 (UTC) | |||
:::It was in an unacceptable state, given the last diff. In physics, the group-theoretic approach to quantum mechanics and ] can be traced back to Weyl, Heisenberg, Schrödinger, Wigner, von Neumann, M.H. Stone, Dirac, Bargmann and Harish-Chandra (cf Wiener's 1933 Cambridge book or Mackey's Chicago and Oxford lecture notes). Specific examples of character tables are undue here, compared to the character formulas of Frobenius, Schur and Weyl (which have been widely applied in theoretical physics and mathematics). Charles Stewart is completely correct that the section can be improved, but that should be done in an incremental way. ] is encyclopedic and explained clearly on the tables in mathematics, physics and chemistry (230 cases); mathematically, ] covers the 32 ]s. It describes the ] from a mathematical standpoint; and is explained in standard text books on chemistry & group theory (e.g. "Chemical Applications of Group Theory", ]). ] (]) 16:43, 26 March 2022 (UTC) | |||
:::*I'll note that, independently of Petergans's motives for changing the history section, we have failed to have any women in that section in the the maths FA where there would be least tokenism in avoiding that failing. Noether's contributions are as worthy of mention as anyone in the last three sentences of the penultimate paragraph, which currently reads: "As of the 20th century, groups gained wide recognition by the pioneering work of Ferdinand Georg Frobenius and William Burnside, who worked on representation theory of finite groups, Richard Brauer's modular representation theory and Issai Schur's papers. The theory of Lie groups, and more generally locally compact groups was studied by Hermann Weyl, Élie Cartan and many others. Its algebraic counterpart, the theory of algebraic groups, was first shaped by Claude Chevalley (from the late 1930s) and later by the work of Armand Borel and Jacques Tits.". — ] <small>]</small> 18:47, 26 March 2022 (UTC) | |||
::::* Ah, ]. The finite generation of invariants of finite groups goes back to Felix Klein ("Lectures on the Icosahedron"), David Hilbert and Emmy Noether (1916). Her short, elementary and constructive proof is presented in Weyl's "The Classical Groups, Their Invariants and Representations" (Pages 275–276, 2nd edition). I don't believe it can be found on wikipedia. OTOH {{noping|R.e.b.}} gave Hilbert's non-constructive proof using the averaging or Reynolds operator. ] (]) 20:42, 26 March 2022 (UTC) | |||
::The reversion is very disappointing. The uses of group theory in chemistry are extensive and were properly documented with references to relevant books. Symmetry in molecules is an essential part of the undergraduate curriculum in chemistry. For example ] cannot be taught without reference to symmetry operations. The designations of many point groups are illustrated at ], which is why the original diagrams were removed. The example of vibrations in methane illustrated the importance of group theory in relation to spectroscopy. For these reasons, I split the original section, without changing anything in the general part, and amplifying the chemical applications, albeit very briefly. The reversion should be undone so that the new material can be properly discussed, if needed. ] (]) 15:13, 26 March 2022 (UTC) | |||
::*While it's natural to be disappointed when changes you've put substantial work into are rejected, my impression is that you lack experience of FA-quality editing. That's OK - little of post-high-school science is FA quality on WP - and I think the impulse behind your changes are OK, but you need to accept that getting agreement to changes to the article will be harder than you are used to. If you still think that you want to invest the time in achieving structural changes to the article, I recommend you put in some time and familiarise yourself with the changes that were made to the article over the last year, which has seen quite a big change in the degree of conformance with the style guide due to the push to get the article to FA level. — ] <small>]</small> 18:23, 26 March 2022 (UTC) | |||
::I agree with all of Charles Stewart's comments. Since article is FA, before making such edits it is good to discuss on talk page first. ] (]) 15:25, 26 March 2022 (UTC) | |||
OK, so be it. This means that, for people like me, the article is sub-standard and should never have been promoted to FA. I've checked with a number of chemistry texts (University level) and they all have something about symmetry; most include or discuss applications that depend on the use of point group character tables. The applications don't belong in the same place as the theory (as is the case at present). For me, that means that this discussion is now closed. ] (]) 20:11, 26 March 2022 (UTC) | |||
== Groups as categories == | |||
The example I had in mind is reflection at the origin in '''R'''<sup>4</sup>: ]. Or can that be interpreted as a rotation somehow? I don't even know what a rotation is :-) ], Tuesday, May 28, 2002 | |||
I feel that the "category" point of view is missing : a group <math>G</math> can be seen as a category <math>A_G</math> with 1 objeect (call it <math>a</math>) where elements <math>g \in G</math> corresponds to isomorphisms <math>f_g : a \to a</math>, and so that composition goes well. The reason why I didn't do the changes myself is that I don't know where to put it, or if it could only be a redirection to the (quite scarce) examples from ], in which case I would try and extend these. ] (]) 14:47, 1 November 2022 (UTC) | |||
When I talked to John, he remarked "How obvious it is depends on how you define a rotation. I define it as an element of SU(<var>n</var>).". Your matrix has infinitesimal generator (say) <var>a</var> := ]; we can transform <b>R</b><sup>4</sup> continuously (even smoothly — analytically if you get right down to it ^_^) along the path <var>t</var> → exp(<var>t</var>a); at each stage, globally and infinitesimally, we preserve lengths and angles; at <var>t</var> = π, we reach your matrix. (Of course, there are all kinds of curvier paths that we could take, but I think that this is a minimal geodesic, so it must ^_^ be best.) This seems intuitively like a rotation to me. (And this talk of preserving lengths and angles isn't entirely begging the question — we get orientation preserving for free. The same thing shows why only the proper orthochronous part of SO(3,1) is the Lorentz group of rotations on Minkowski spacetime.) I don't know whether or not this cuts it as an intuitive argument, but I'm still certain that both mathematicians and physicists would count your matrix as a rotation — and who besides them ever thinks about rotations in <b>R</b><sup>4</sup> anyway? -- ], Friday, June 7, 2002 | |||
:Good idea! I tried to implement your suggestion, by adding it to the discussion of groupoids in the Generalizations section. ] (]) 18:42, 1 November 2022 (UTC) | |||
== Identity and also inverse elements must be part of set == | |||
I like this notion of rotation. I had some muddy image in mind where you stake a line through the space and then rotate around that line, but this is a lot cleaner. I will officially give up my resistance to the term "rotation" and retract everything I said before. ], Friday, June 7, 2002 | |||
Note to 100.36.106.199 who removed (2 days ago) my words "the set contains an identity element" and returned to the previous wording "an identity element exists": The point is that it is not sufficient for an identity element to exist; it must be part of the set or else the set does not constitute a group. | |||
: Ah, but in 4D a rotation is about a ''plane''... :) BTW, has anyone written about ]? He does great vulgarization of maths in comic book form, his book on topology (which covers Klein bottles & Boy's surface etc) has a preface which recommends readers have a packet of aspirins & a glass of water to hand... same applies here I think ;) ] | |||
Consider the first example: the integers under addition. If we consider the set without the identity element zero: ..., -3, -2, -1, +1, +2, +3, +4, ... then we have a set which is NOT a group. Zero still exists but it has to be included in the group. | |||
And in 2D, a rotation is about a ''point''. | |||
Also, in 4D, a rotation need not be about a single plane (Axel's −1 is an example of such) but may instead be around a sort of linear combination of planes. | |||
This is related to the fact that not every 2form in 4D can be factored as a wedge product of 1forms. | |||
As for requiring parallelism in wording for identity element and inverse elements, I actually agree that the wording should be parallel. So I will now make it parallel by adding that the inverse elements also must be part of the group (although you said you hoped not). Again for the integers under addition: the set 0, +1, +2, +3, +4, ... is NOT a group without the negative integers. The fact that they exist is not sufficient. ] (]) 02:01, 10 July 2023 (UTC) | |||
In general, the direction of the "axis" of a rotation in <var>n</var>D can be described by an (<var>n</var>−2)form, specified up to a scalar multiple. | |||
This (<var>n</var>−2)form is another way of looking at the infinitesimal generator of a rotation. | |||
You can see how the infinitesimal generator that I gave for Axel's rotation is a linear combination of 2 blocks, which correrspond to 2 factorable 2-forms and hence 2 planes. | |||
The rotation is about both of those planes simultaneously. | |||
-- ], Sunday, June 9, 2002 | |||
:Your example is incoherent: the object you have presented is not a set with an operation on it (because what is -1 + 1?). Assuming you had not made this error, you would be wrong that an identity exists: the operation is defined (only) on the set, things outside the set cannot be combined using the operation with things in the set and so in particular they cannot be an identity or an inverse. --] (]) 13:49, 10 July 2023 (UTC) | |||
So it is true that any element of SO(n) is a product of rotations about n-2 dimensional hyperplanes? ] | |||
:I mean, it is true that students first learning abstract algebra suffer from the confusion that you are expressing here. But I think it is instructive that the first time you made the change, you did not even notice that the same argument applies to inverses as to the identity. That's because the meaning is not actually ambiguous or otherwise problematic. --] (]) 13:52, 10 July 2023 (UTC) | |||
:Having said all that: the revised wording seems fine. --] (]) 13:54, 10 July 2023 (UTC) | |||
== Undefined terms and notational elements == | |||
I'm pretty sure that that's true. | |||
If it isn't, then the analogy between axes of rotation and 2forms doesn't work like I think that it does (but perhaps that's exactly what you're getting at). | |||
I can check it out if you want. | |||
— ], Tuesday, June 11, 2002 | |||
The statements about injective homomorphisms use several notational elements that have not been introduced previously and that will not be intuitive to a general reader: <math>\stackrel{\sim}{\to}</math>, <math>\hookrightarrow</math>, and <math>\ker \phi</math>. | |||
I'm not trying to get at anything, just trying to learn. I believe it is true myself, using the real version of the spectral theorem, which says that to every element A of SO(n) there's an orthogonal S such that SAS<sup>t</sup> is a matrix with blocks of the form ] (and a couple of ones) on the main diagonal. The blocks probably correspond to the hyperplane rotations. ], Tuesday, June 11, 2002 | |||
The latter also appears in the Presentations section, along with reference to the free group | |||
That sounds about right to me. | |||
— ], Tuesday, June 11, 2002 | |||
== What is the fundamental group of a plane minus a point? == | |||
---- | |||
"The fundamental group of a plane minus a point (bold) consists of loops around the missing point. This group is isomorphic to the integers." | |||
I know very little about groups that I didn't learn from this page... but... the integers are a set, not a group, right? So "isomorphic to the integers" is a vague way of saying "isomorphic to some group that has the integers as the underyling set"? <!-- Template:Unsigned IP --><small class="autosigned">— Preceding ] comment added by ] (]) 08:21, 3 October 2023 (UTC)</small> <!--Autosigned by SineBot--> | |||
:In this case, the relevant group is the integers under the addition operation. –] ] 17:24, 3 October 2023 (UTC) | |||
This page has gone back and forth multiple times on the reformatting of "Examples and counterexamples". Some thoughts: | |||
: The given quote could be considered incorrect: the ] consists of loops and the fundamental group crucially consists of ''equivalence classes'' of loops. The main text avoids this by saying that "elements of the fundamental group are represented by loops" which is perfectly correct but maybe overly evasive or obscure for most readers. Also, the loops don't have to go around the missing point - they just have to avoid it. | |||
: There's also the problem that the blue and orange curves in the image don't show two elements of the fundamental group: they show two different (free homotopy classes of) maps from the circle into the space. A loop representing the fundamental group has (although usually only implicitly) a fixed base point, and these two loops obviously have no common base point. So the picture is not quite illustrative of the fundamental group, even though any reader already familiar with the concepts can easily see what it's trying to communicate. | |||
: Being fully precise would obviously not be desirable in the context of the page, but perhaps a talented writer could find a way to rephrase the paragraph and image/image caption in a way that remains concise and readable but is also fully accurate. (I'm not talented enough.) Maybe it would help to move the paragraph to its own subsection "algebraic topology" or "fundamental group". ] (]) 19:31, 3 October 2023 (UTC) | |||
::Looking at this picture, I agree it's weird. We probably instead want something like the pictures in {{slink|Winding_number#Intuitive_description}}. –] ] 19:37, 3 October 2023 (UTC) | |||
::@] I tried rewriting the explanation here. Is that any clearer? –] ] 22:13, 3 October 2023 (UTC) | |||
== One can show that == | |||
First, mathematically speaking, the integers, under multiplication, is not a "counterexample" of a group; it is simply not an example of a group. (Nor is the set of all long-haired dogs a "counterexample" of a group). So we could change that to "Examples (and non-examples)". But that seems silly; we don't generally ''explicitly'' provide "non-examples" as part of other articles in the Misplaced Pages World of Mathematics, except in passing. | |||
@]: I removed the bold text from "...assuming associativity and the existence of a left identity and a left inverse for each element , '''one can show that''' every left inverse is also a right inverse of the same element as follows.", which you reverted with the comment "It must be clear that a proof is behind the assetrion". I do not understand the need for including "one can show that". Of course it has been shown. That is the reason we know it is true. Is there a way it could be true without having been shown to be true? ] (]) 13:20, 26 May 2024 (UTC) | |||
:This is simply not true. It's always important to provide examples of what something is ''not'' as well as what something ''is''. I've written a lot of material on various kinds of topological spaces (you can find most of them linked from ]), and I always include nonexamples, as Axel can attest. I agree with you that "counterexample" is not the right word, however. | |||
:This is true, but it is not an evidence. See your talk page. ] (]) 13:26, 26 May 2024 (UTC) | |||
::Sheepish withdrawl of previous statement; but although I agree that we want to have "non-examples" from a pedagogical view, I find the terminology a bit clumsy here. One thing I note by looking through the examples that you cite is that, although we can talk about non-normal spaces and non-paracompact spaces, etc., we don't talk about topological non-spaces; similarly, although we talk about abelian groups and non-abelian groups, solvalable and non-solvable groups, etc., we don't talk about non-groups. | |||
== Error in examples: division over reals has quasi-group structure despite no closure. == | |||
::Personally, I find it better to think about an example of something that is ''not'' a group (in this case in the context of integers), then it is to think of a ''non''-example of a group, or a counterexample of a group. | |||
In the final section of the article (Generalizations) there is a table on operations over different sets. Division under the reals is listed as closed but the group structure is given as "quasi-group" despite the table above clearly stating that closure is necessary for a quasi-group structure. Perhaps it could be made more clear what is meant by the table. | |||
::All this aside, I think the whole article looks much, much better now - and if you still feel strongly, feel free to change it back to "examples and non-examples"; I've made my last edit on ''that'' topic. Cheers ] 02:29 Nov 4, 2002 (UTC) | |||
Edit: After looking over the table a bit more there are a few confusing things about it. It is not explained why something is "N/A". I found myself double checking many things as I am not a group theorist. | |||
Secondly, some of these examples (Symmetry in particular) are quite long and wordy; and others (free group) are described in separate articles and at any rate are somewhat unsuitable as part of an introduction; if you don't know that the reals form a group under addition, you're unlikely to grasp the concept of a free group as an "example" of a group. | |||
] (]) 21:11, 24 October 2024 (UTC) | |||
:You definitely have a point here. The article as it stands is unwieldy, and this is part of the reason. We should have some simple examples and nonexamples in the article to reinforce the definition, then move the rest to ] or some such thing. | |||
Thirdly, I think that, as an introduction to group concepts (which really are fundamental!), we want the article to give give the reader the following information: | |||
* A good general feeling of what constitutes a group | |||
* Enough examples to show that groups are indeed "fundamental" in the sense that an understanding of them progvides insight into many other mathematical structures. | |||
* Some feeling of the historical development of group theory. | |||
* Applications of group theory with links to more info. | |||
* Some fundamental properties of groups that act as a launch pad to link to other info. | |||
* groups as a subset of abstract algebra as a subset of homological algebra as a subset of category theory (generalizations) | |||
:Some of this belongs on ], but you have some good ideas. The page definitely needs to be redesigned. | |||
Right now, it seems like the formatting issue of proceeding with a series of examples, with everything else thrown in at the end, is keeping the article from being as useful as it could be; at the minimum, I'm changing "Examples and Counterexamples" to "Examples". Any thoughts? ] 20:51 Nov 2, 2002 (UTC) | |||
:— ] 15:13 Nov 3, 2002 (UTC) | |||
How about if we move (most of) the examples out of the way and put them on ]? ] 21:59 Nov 2, 2002 (UTC) |
Latest revision as of 12:12, 25 October 2024
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Closure
Although it is important to mention closure, there are a few things that disturb me about the way the definition of group is currently written. What is an operation, before the closure axiom is imposed? A function from G × G to some unspecified set? Not only is this a little vague, but it also contradicts the binary operation page it links to. Also, technically speaking, the sentence defining group is wrong, because it ends before any of the axioms are imposed.
I would propose the following, which is slightly longer, but more explicit about the role of closure, which really should be separate from the group axioms. This also breaks the definition into more manageable chunks: first understand what a binary operation is, and then understand the definition of group. Also, this would bring this page more in line with other Misplaced Pages pages, such as ring. Finally, there are many modern textbooks at all levels that present the definition along these lines (e.g., Artin, Lang, ...); I would add such references.
A binary operation ⋅ on a set G is a rule for combining any pair a, b of elements of G to form another element of G, denoted a ⋅ b. (The property "for all a, b in G, the value a ⋅ b belongs to the same set G" is called closure; it must be checked if it is not known initially.)
A group is a set G equipped with a binary operation ⋅ satisfying the following three additional requirements, known as the group axioms:
- Associativity
- For all a, b, c in G, one has (a ⋅ b) ⋅ c = a ⋅ (b ⋅ c).
- Identity element
- There exists an element e in G such that, for every a in G, the equations e ⋅ a = a and a ⋅ e = a hold. Such an element is unique (see below), and thus one speaks of the identity element.
- Inverse element
- For each a in G, there exists an element b in G such that a ⋅ b = e and b ⋅ a = e, where e is the identity element. For each a, the b is unique (see below) and it is commonly denoted a.
b: Formally, a binary operation on G is a function G × G → G.
I would welcome advice about which defined terms should be bold and which should be italicized; I'm not sure what the convention is.
Ebony Jackson (talk) 02:49, 16 December 2020 (UTC)
- I essentially agree, and I have edited the article accordingly. By the way, I have copy-edited the whole section for clarification and for using a simpler wording that is also more common in mathematics.
- About "closure": the term is normally used for the restriction of a binary operation to a subset. Using it as it was done is thus an error. I guess that editors were confused by the usual definition of a subgroup as a nonempty subset on which the group operation and the inverse operation are closed. Using this definition, it is a theorem that a subgroup is a group, and that the groups axioms are thus satisfied. D.Lazard (talk) 10:44, 16 December 2020 (UTC)
- The above wording of the last two axioms combines an axiom (one sentence) with consequent properties (e.g. uniqueness of the identity element) that is not part of the axiom. It would be good if this separation was made clearer to the reader, since the current presentation does not adequately distinguish for the reader who is not already familiar with the exact axioms. The parts that do not form part of the axiom could be moved to under the listed axioms, for example, or preceded by "This implies that ...". —Quondum 11:33, 4 May 2021 (UTC)
- I'm very tempted to add Closure as one of the four group axioms, as it's already one of the "abelian group axioms". Technically the only difference is the commutativity of the operation, so it doesn't make sense to list closure as an axiom of one but not another. IBugOne (talk) 14:20, 29 December 2021 (UTC)
- Please don't: "closure" is a property of subsets, and there is no subset here. The fact that the result of the operation belongs to the group is a part of the definition of an operation. By the way, I have removed the use of "closure" in abelian group#Definition. D.Lazard (talk) 15:00, 29 December 2021 (UTC)
- Thank you, IBugOne, for pointing out the discrepancy. I agree with D.Lazard that the best solution to the issue you raise is that closure should not be listed an axiom either for group or for abelian group. Ebony Jackson (talk) 23:01, 29 December 2021 (UTC)
- Please don't: "closure" is a property of subsets, and there is no subset here. The fact that the result of the operation belongs to the group is a part of the definition of an operation. By the way, I have removed the use of "closure" in abelian group#Definition. D.Lazard (talk) 15:00, 29 December 2021 (UTC)
- Including both left and right identity and inverse is very common mistake. The existence of the left identity and inverse can be proven using the right identity and inverse and vice versa. So it is sufficient to present only one of each in the list of the axioms. Here there are some proves, for example: https://math.stackexchange.com/questions/65239/right-identity-and-right-inverse-in-a-semigroup-imply-it-is-a-group Andrewsk (talk) 00:06, 20 January 2023 (UTC)
- You are right that some of the axioms could be deduced from the others, but this is not a "mistake". The standard textbooks intentionally require the identity be a two-sided identity and so on, presumably because it is more natural not to favor one side. Therefore we should leave it as is. Ebony Jackson (talk) 00:03, 23 January 2023 (UTC)
In a similar vein, I modified the leading sentence to mention that the binary operation is closed (defined on the set). Seeing as the original sentence didn't call it a "binary operation" and instead called it an "operation that combines any two elements to form a third element", I would argue that in order to make this expansion clear and precise, it's required to mention that the domains/codomain are all in the set. So therefore I modified it to "an operation that combines any two elements of the set to produce a third element of the set". Quohx (talk) 06:58, 14 March 2022 (UTC)
Character table
A major omission is any reference to character tables. These tables used extensively in chemistry: see, for example, "Chemical Applications of Group Theory", F.A. Cotton, 3rd. edn., 1990. Petergans (talk) 08:47, 15 March 2022 (UTC)
Indentation
Why are all the main section titles double indented ==title==? They should be single indented as the menu only shows 3 levels of indentation. Currently ====items==== are present in the article, but are not shown on the menu. This will require all indents to be changed in the text. Petergans (talk) 10:48, 26 March 2022 (UTC)
- See Help:Section#Creation and numbering of sections. D.Lazard (talk) 11:46, 26 March 2022 (UTC)÷
- The sections of level 4 do not appear in the table of content because of the limit parameter in the template {{TOClimit|limit=3}} that appears at the end of the lead. This is a choice for having a table of content that is not too large. This choice may be discussed, but the table of content is already very large. D.Lazard (talk) 12:03, 26 March 2022 (UTC)
Restructuring article?
The edits to this featured article on mathematics have been reverted. That was due partially to the misuse of indentation, see WP:CIR; but also changes to content must be supported by reliable sources, with inline citations. Wish-lists/prayers like {{Cotton&Wilkinson}} are of no use; instead the text book "Advanced Inorganic Chemistry. A Comprehensive Text by Cotton F.A., Wilkinson G. (3rd edition)" can be found and read. If this is to be comprehensible as an article on mathematics, there should be some attempt to reconcile the terminology of physical chemistry with the standard language of theoretical physics and mathematics. In the case of the section "Symmetry"—a brief overview of a general topic—there has so far been no consensus to create separate brand new sections. Here they were sometimes done by copy-pasting content from the section on "Symmetry"; deleting the content, cited to Conway, Thurston et al, or to Weyl, was unhelpful; similarly for the citation to Graham Ellis.
As far as groups are concerned, representation theory and character theory are often first encountered in undergraduate courses on finite groups and angular momentum in quantum mechanics (see e.g. the treatment by Jean-Pierre Serre). Separate new sections at the moment seem to be WP:UNDUE, with no WP:consensus. It unbalances the article. The new image without citations is unhelpful.
The edits today to the article are a combination of vandalism, incompetence and POV pushing: why delete references to physicists or Hermann Weyl; why delete images from the section on "Symmetry"; why favour chemistry above physics? Here are diffs of recent problematic edits, including today's. Mathsci (talk) 14:12, 26 March 2022 (UTC)
- I think this is overly harsh. You were right to revert the changes, but that's because we should be conservative with FAs. But there were not CIR-level problems with the changes proposed. If this was not FA quality, I'd say this is what we should expect from the BRD cycle. Additionally, I think there is a problem with the article that I rasied during the FA process that it does not make enough of the applications outside mathematics. While the concept might fundamentally be a mathematical one, its most exciting applications lie in chemistry and physics and the article should not assume that the interest of the reader primarily comes from mathematics. — Charles Stewart (talk) 14:19, 26 March 2022 (UTC)
- It was in an unacceptable state, given the last diff. In physics, the group-theoretic approach to quantum mechanics and representation theory can be traced back to Weyl, Heisenberg, Schrödinger, Wigner, von Neumann, M.H. Stone, Dirac, Bargmann and Harish-Chandra (cf Wiener's 1933 Cambridge book or Mackey's Chicago and Oxford lecture notes). Specific examples of character tables are undue here, compared to the character formulas of Frobenius, Schur and Weyl (which have been widely applied in theoretical physics and mathematics). Charles Stewart is completely correct that the section can be improved, but that should be done in an incremental way. Space group is encyclopedic and explained clearly on the tables in mathematics, physics and chemistry (230 cases); mathematically, Point groups in three dimensions#Finite isometry groups covers the 32 crystallographic point groups. It describes the crystallographic restriction theorem from a mathematical standpoint; and is explained in standard text books on chemistry & group theory (e.g. "Chemical Applications of Group Theory", F. Albert Cotton). Mathsci (talk) 16:43, 26 March 2022 (UTC)
- I'll note that, independently of Petergans's motives for changing the history section, we have failed to have any women in that section in the the maths FA where there would be least tokenism in avoiding that failing. Noether's contributions are as worthy of mention as anyone in the last three sentences of the penultimate paragraph, which currently reads: "As of the 20th century, groups gained wide recognition by the pioneering work of Ferdinand Georg Frobenius and William Burnside, who worked on representation theory of finite groups, Richard Brauer's modular representation theory and Issai Schur's papers. The theory of Lie groups, and more generally locally compact groups was studied by Hermann Weyl, Élie Cartan and many others. Its algebraic counterpart, the theory of algebraic groups, was first shaped by Claude Chevalley (from the late 1930s) and later by the work of Armand Borel and Jacques Tits.". — Charles Stewart (talk) 18:47, 26 March 2022 (UTC)
- Ah, invariant theory. The finite generation of invariants of finite groups goes back to Felix Klein ("Lectures on the Icosahedron"), David Hilbert and Emmy Noether (1916). Her short, elementary and constructive proof is presented in Weyl's "The Classical Groups, Their Invariants and Representations" (Pages 275–276, 2nd edition). I don't believe it can be found on wikipedia. OTOH R.e.b. gave Hilbert's non-constructive proof using the averaging or Reynolds operator. Mathsci (talk) 20:42, 26 March 2022 (UTC)
- It was in an unacceptable state, given the last diff. In physics, the group-theoretic approach to quantum mechanics and representation theory can be traced back to Weyl, Heisenberg, Schrödinger, Wigner, von Neumann, M.H. Stone, Dirac, Bargmann and Harish-Chandra (cf Wiener's 1933 Cambridge book or Mackey's Chicago and Oxford lecture notes). Specific examples of character tables are undue here, compared to the character formulas of Frobenius, Schur and Weyl (which have been widely applied in theoretical physics and mathematics). Charles Stewart is completely correct that the section can be improved, but that should be done in an incremental way. Space group is encyclopedic and explained clearly on the tables in mathematics, physics and chemistry (230 cases); mathematically, Point groups in three dimensions#Finite isometry groups covers the 32 crystallographic point groups. It describes the crystallographic restriction theorem from a mathematical standpoint; and is explained in standard text books on chemistry & group theory (e.g. "Chemical Applications of Group Theory", F. Albert Cotton). Mathsci (talk) 16:43, 26 March 2022 (UTC)
- The reversion is very disappointing. The uses of group theory in chemistry are extensive and were properly documented with references to relevant books. Symmetry in molecules is an essential part of the undergraduate curriculum in chemistry. For example chirality cannot be taught without reference to symmetry operations. The designations of many point groups are illustrated at Molecular symmetry#Common point groups, which is why the original diagrams were removed. The example of vibrations in methane illustrated the importance of group theory in relation to spectroscopy. For these reasons, I split the original section, without changing anything in the general part, and amplifying the chemical applications, albeit very briefly. The reversion should be undone so that the new material can be properly discussed, if needed. Petergans (talk) 15:13, 26 March 2022 (UTC)
- While it's natural to be disappointed when changes you've put substantial work into are rejected, my impression is that you lack experience of FA-quality editing. That's OK - little of post-high-school science is FA quality on WP - and I think the impulse behind your changes are OK, but you need to accept that getting agreement to changes to the article will be harder than you are used to. If you still think that you want to invest the time in achieving structural changes to the article, I recommend you put in some time and familiarise yourself with the changes that were made to the article over the last year, which has seen quite a big change in the degree of conformance with the style guide due to the push to get the article to FA level. — Charles Stewart (talk) 18:23, 26 March 2022 (UTC)
- I agree with all of Charles Stewart's comments. Since article is FA, before making such edits it is good to discuss on talk page first. Gumshoe2 (talk) 15:25, 26 March 2022 (UTC)
OK, so be it. This means that, for people like me, the article is sub-standard and should never have been promoted to FA. I've checked with a number of chemistry texts (University level) and they all have something about symmetry; most include or discuss applications that depend on the use of point group character tables. The applications don't belong in the same place as the theory (as is the case at present). For me, that means that this discussion is now closed. Petergans (talk) 20:11, 26 March 2022 (UTC)
Groups as categories
I feel that the "category" point of view is missing : a group can be seen as a category with 1 objeect (call it ) where elements corresponds to isomorphisms , and so that composition goes well. The reason why I didn't do the changes myself is that I don't know where to put it, or if it could only be a redirection to the (quite scarce) examples from Category, in which case I would try and extend these. GLenPLonk (talk) 14:47, 1 November 2022 (UTC)
- Good idea! I tried to implement your suggestion, by adding it to the discussion of groupoids in the Generalizations section. Ebony Jackson (talk) 18:42, 1 November 2022 (UTC)
Identity and also inverse elements must be part of set
Note to 100.36.106.199 who removed (2 days ago) my words "the set contains an identity element" and returned to the previous wording "an identity element exists": The point is that it is not sufficient for an identity element to exist; it must be part of the set or else the set does not constitute a group.
Consider the first example: the integers under addition. If we consider the set without the identity element zero: ..., -3, -2, -1, +1, +2, +3, +4, ... then we have a set which is NOT a group. Zero still exists but it has to be included in the group.
As for requiring parallelism in wording for identity element and inverse elements, I actually agree that the wording should be parallel. So I will now make it parallel by adding that the inverse elements also must be part of the group (although you said you hoped not). Again for the integers under addition: the set 0, +1, +2, +3, +4, ... is NOT a group without the negative integers. The fact that they exist is not sufficient. Dirac66 (talk) 02:01, 10 July 2023 (UTC)
- Your example is incoherent: the object you have presented is not a set with an operation on it (because what is -1 + 1?). Assuming you had not made this error, you would be wrong that an identity exists: the operation is defined (only) on the set, things outside the set cannot be combined using the operation with things in the set and so in particular they cannot be an identity or an inverse. --100.36.106.199 (talk) 13:49, 10 July 2023 (UTC)
- I mean, it is true that students first learning abstract algebra suffer from the confusion that you are expressing here. But I think it is instructive that the first time you made the change, you did not even notice that the same argument applies to inverses as to the identity. That's because the meaning is not actually ambiguous or otherwise problematic. --100.36.106.199 (talk) 13:52, 10 July 2023 (UTC)
- Having said all that: the revised wording seems fine. --100.36.106.199 (talk) 13:54, 10 July 2023 (UTC)
Undefined terms and notational elements
The statements about injective homomorphisms use several notational elements that have not been introduced previously and that will not be intuitive to a general reader: , , and .
The latter also appears in the Presentations section, along with reference to the free group
What is the fundamental group of a plane minus a point?
"The fundamental group of a plane minus a point (bold) consists of loops around the missing point. This group is isomorphic to the integers." I know very little about groups that I didn't learn from this page... but... the integers are a set, not a group, right? So "isomorphic to the integers" is a vague way of saying "isomorphic to some group that has the integers as the underyling set"? — Preceding unsigned comment added by 2404:4408:6A6E:7000:E48B:A59:8E82:2FCF (talk) 08:21, 3 October 2023 (UTC)
- In this case, the relevant group is the integers under the addition operation. –jacobolus (t) 17:24, 3 October 2023 (UTC)
- The given quote could be considered incorrect: the loop space consists of loops and the fundamental group crucially consists of equivalence classes of loops. The main text avoids this by saying that "elements of the fundamental group are represented by loops" which is perfectly correct but maybe overly evasive or obscure for most readers. Also, the loops don't have to go around the missing point - they just have to avoid it.
- There's also the problem that the blue and orange curves in the image don't show two elements of the fundamental group: they show two different (free homotopy classes of) maps from the circle into the space. A loop representing the fundamental group has (although usually only implicitly) a fixed base point, and these two loops obviously have no common base point. So the picture is not quite illustrative of the fundamental group, even though any reader already familiar with the concepts can easily see what it's trying to communicate.
- Being fully precise would obviously not be desirable in the context of the page, but perhaps a talented writer could find a way to rephrase the paragraph and image/image caption in a way that remains concise and readable but is also fully accurate. (I'm not talented enough.) Maybe it would help to move the paragraph to its own subsection "algebraic topology" or "fundamental group". Gumshoe2 (talk) 19:31, 3 October 2023 (UTC)
- Looking at this picture, I agree it's weird. We probably instead want something like the pictures in Winding number § Intuitive description. –jacobolus (t) 19:37, 3 October 2023 (UTC)
- @Gumshoe2 I tried rewriting the explanation here. Is that any clearer? –jacobolus (t) 22:13, 3 October 2023 (UTC)
One can show that
@D.Lazard: I removed the bold text from "...assuming associativity and the existence of a left identity and a left inverse for each element , one can show that every left inverse is also a right inverse of the same element as follows.", which you reverted with the comment "It must be clear that a proof is behind the assetrion". I do not understand the need for including "one can show that". Of course it has been shown. That is the reason we know it is true. Is there a way it could be true without having been shown to be true? Nuretok (talk) 13:20, 26 May 2024 (UTC)
- This is true, but it is not an evidence. See your talk page. D.Lazard (talk) 13:26, 26 May 2024 (UTC)
Error in examples: division over reals has quasi-group structure despite no closure.
In the final section of the article (Generalizations) there is a table on operations over different sets. Division under the reals is listed as closed but the group structure is given as "quasi-group" despite the table above clearly stating that closure is necessary for a quasi-group structure. Perhaps it could be made more clear what is meant by the table.
Edit: After looking over the table a bit more there are a few confusing things about it. It is not explained why something is "N/A". I found myself double checking many things as I am not a group theorist. Nathalene (talk) 21:11, 24 October 2024 (UTC)
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