Talk:Quadratic form

Latest comment:1 year agoby Anita5192 in topicSubsequent identical terms

Quadratic forms defined by a non-symmetric matrix

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Why my contribution was deleted without any attempt of consensus?

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You are not encouraging new editors.

DIFF:http://en.wikipedia.org/w/index.php?title=Quadratic_form&action=historysubmit&diff=328339698&oldid=327825192

Arcfrk: if you find it "unhelpful/confusing", why didn't you ask first for a better solution. We can clarify or expand the remark. It is a sufficiently relevant fact.

What if a revert your change arbitrarily as you did? Wikipedia can't work that way.

Sorry for my bad english.

Francisco Albani(talk)01:32, 29 November 2009 (UTC)Reply

I would certainly prefer to see this discussed atsymmetric bilinear form.It is clearer to understand the relationship between general and symmetric bilinear forms as one step, with the remark that the semi-sum symmetrization depends on being able to divide by 2 in the field; and then the relationship between symmetric bilinear forms and quadratic forms as another step. If you can divide by 2 freely there is no problem; but that is not always the case in this subject.Charles Matthews(talk)09:25, 29 November 2009 (UTC)Reply
This discussion clears up my confusion about the earlier statement, "there is a one to one correspondence between quadratic forms and symmetric matrices that determine them."
The article assumes the matrices are symmetric, without offering a reason. This should be fixed.Comfr(talk)18:14, 29 June 2022 (UTC)Reply
I have added some clarification. If some other assertion is confusing, you have to be more precise in the localization of the assertion in the article.D.Lazard(talk)18:26, 29 June 2022 (UTC)Reply

non-singular or non-degenerate quadratic form

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I don't think non-singular is defined correctly for the quadratic form.Orthogonal_groupdefines the orthogonal group to be linear transformations that preserve some non-singular quadratic form. So I assume this is what's called a non-degenerate quadratic form in the literature I've read. Here's how I've seen it before:

Well, sinceq(x) =b(x,x), the restriction of the quadratic formqto the kernel ofbis identically zero. So the only way for kerbto be anisotropic is if it only contains zero vector, i.e. kerb= 0. Do you have a reference? Does it have anything to do with characteristic 2 or modules over a ring? In both cases, the definitions of the associate bilinear form and of "non-degenerate" need to be modified.Arcfrk(talk)03:51, 13 April 2010 (UTC)Reply

Unfortunately q(x)=b(x,x) only when char!=2. In characteristic 2 there is a difference. In fact there are bilinear forms in characteristic 2 that are not the associated bilinear form to any quadratic form:)—Precedingunsignedcomment added by98.30.181.0(talk)15:51, 16 April 2010 (UTC)Reply

Sorry thought I was signed in above. Is my comment—Precedingunsignedcomment added bySomethingcompletelydifferent(talkcontribs)15:55, 16 April 2010 (UTC)Reply

Well, since you agree that it's a characteristic 2 issue, why don't you write a section dedicated to char 2 case, as you previously indicated you wanted to? It is certainly needed for the completeness of coverage! Think it through and give all the necessary definitions and theorems. In the meantime, please, do not insert definitions/statements inconsistent with the rest of the text. All of the present section is dealing with characteristic NOT 2, as prominently displayed just a short while before. In particular, the term "associate bilinear form" has a precise meaning,q(x)=b(x,x), and your way of phrasing the definition of nonsingular simply does not work in this context.Arcfrk(talk)06:02, 24 April 2010 (UTC)Reply

"intentional" space

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Arcrfk, you insist on keeping a space at the beginning of a line to set the following in typewriter text: "Let us assume that the characteristic of K is different from 2." If you feel strongly that it should be set in its own text box, fine, but there is no reason to set it in typewriter text. It is completely nonstandard within Wikipedia. I don't see why it can't just be its own line without anything special to set it off, but setting it typewriter text is just wrong.—Ben FrantzDale(talk)14:15, 22 October 2010 (UTC)Reply

geometric meaning

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Can someone related the quadratic form to geometric meaning. when it is positive definite, it is ellipsoid? what condition corresponds to hyperboloid (elliptic or parabolic) or paraboloid???

Suppose the equation is,then it seems that

if the matrix can be turned into a diagonal matrix, then it is an ellipsoid or a hyperboloid. If all the eigen values are non negative, then it is an ellipsoid, if some eigen values are negative, then it is a hyperboloid. If the matrix can not be turned into a diagonal one, then it is a paraboloid (either elliptic or hyperbolic). If all the eigen values are non negative, then it is elliptic, if some eigen values are negative, then it is hyperbolic).

Jackzhp(talk)14:55, 13 February 2011 (UTC)Reply

"Jacobi's Theorem

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This article mentions "Jacobi's Theorem" under "Real Quadratic Forms" but doesn't link that to anywhere and when I search for jacobi's theorem in wikipedia, I don't see a disambiguation link for this use of the term.

Bill Smith(talk)19:17, 20 January 2013 (UTC)Reply

It refers to this sentence a few lines earlier:
A fundamental theorem due to Jacobi asserts that q can be brought to a diagonal form
Deltahedron(talk)19:49, 20 January 2013 (UTC)Reply

Citations

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I was not sure this article really must have additional citations. I think it was basic stuff from the authors point of view and not especially dubious at any points. But I admit I am new to this topic so that can be factored into my opinion. Further I would like to mention that over dependence on citations can be meaningless. For example, you can find a million citations that support significant man caused global warming but that may actually be negative evidence. Pardon the political reference and substitute any example where citations may not be accurate. However if there is something truly dubious here let's get to that issue. §— Precedingunsignedcomment added byBerrtus(talkcontribs)08:23, 15 April 2013 (UTC)Reply

Whilelending credibility to the correctness of informationis an important function of citations, that's actually secondary to the more fundamental use:showing the reader where the information appears.This is just an encyclopedia, so its role is to act as a reference to reputable sources (sometimes despite the sources' correctness or incorrectness.) In any case, having a citation to a good reference is invaluable to a reader who wants to learn more. Having the "needs more citations" flag doesn't always have to be interpreted as a black eye! I think in this case, the contents of the article is OK: however, it looks like someone wished they had some more detailed pointers to where they could continue reading:)Rschwieb(talk)13:47, 15 April 2013 (UTC)Reply
I have added various items as a Further Reading section.Deltahedron(talk)16:51, 15 April 2013 (UTC)Reply

What is a "form"?

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Isformbeing used here to refer to a particular arrangement of something else, as in an ice cube is water in a frozen and cubic form? Or isforma thing in its own right, as in a form for shaping concrete? Or???Gwideman(talk)09:15, 22 February 2021 (UTC)Reply

@Gwideman:Aforminlinear algebrarefers to a scalar-valued function of vectors, usually linear or quadratic, and always ahomogeneous polynomial.Further questions should be asked atWP:RDMA.--Jasper Deng(talk)09:32, 22 February 2021 (UTC)Reply
Why should questions about the wording of this page be directed toWP:RDMA?Gwideman(talk)14:18, 22 February 2021 (UTC)Reply
However, the previous first sentence may be confusing for some readers, and I have edited it perWP:LEASTfor linking to the general definition (form (mathematics)).D.Lazard(talk)09:46, 22 February 2021 (UTC)Reply
That's a helpful improvement. So hereformis unrelated to theformin sentences like "a polynomial written in factored form".Gwideman(talk)14:16, 22 February 2021 (UTC)Reply
Yes, in this sentence, "form" is a term ofmathematical jargonthat must be viewed as a synonym of "shape".D.Lazard(talk)16:34, 22 February 2021 (UTC)Reply

Generalization?

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In the generalization section, it asserts that for any quadratic form, there exists an R-bilinear form b: M × M → R such that q(v) is the associated quadratic form.

Is this correct, for an arbitrary module M? I can only see how to do it when M is projective. It would be nice to have a citation.

Hasire(talk)23:29, 22 July 2021 (UTC)Reply

Quadratic spaces

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Why introducing the map Q? What does it tell more than q does? Apparently Q=q.Madyno(talk)10:40, 20 November 2022 (UTC)Reply

I have rewritten the beginning of the section for clarifying that. Also, the section is called now§ Quadratic space.D.Lazard(talk)15:06, 20 November 2022 (UTC)Reply
I don't understand. The quadratic formis the same type of function as;both accept as their arguments an element of.Ifthe elements ofare the n-tuples,which has nothing to do with the standard basis. Then a value ofis.Madyno(talk)17:21, 28 November 2022 (UTC)Reply

Subsequent identical terms

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@Anita5192Hi, in the sentence:

The study of particular quadratic forms, in particular the question of whether a given integer can be the value of a quadratic form over the integers

There exists two subsequent "particular" terms. This is not grammatically wrong, but it is better that one of them become "specially". Thanks,Hooman Mallahzadeh(talk)14:42, 22 March 2023 (UTC)Reply

FixedAnita5192(talk)14:52, 22 March 2023 (UTC)Reply