Abel Cavaşi

A welcome from Sputnik

Latest comment: 18 years ago2 comments2 people in discussion

Hi, Abel Cavaşi, Welcome to Wikipedia!  

Hello, bonjour, salut, privyet, konichiwa, shalom, hola, salve, sala'am, bonjourno, and hi! I'm Sputnik. I noticed that you were new and/or have yet to receive any messages so I just thought I'd pop in to say "hello". We're glad to have you in our community! I hope you like this place — I sure do — and want to stay. Wikipedia can be a little intimidating at first, since it's so big but we won't bite so Be Bold and get what you know down in microchips! If you do make a mistake, that's fine, we'll assume good faith and just correct you: it'll take a few seconds maximum! I hope you enjoy editing here and being a Wikipedian! Though we all make goofy mistakes, here is what Wikipedia is not. If you have any questions or concerns, don't hesitate to see the help pages or add a question to the village pump. The Community Portal can also be very useful. If you want to play around with your new Wiki skills the Sandbox is for you. Here are a few links to get you started:

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Happy Wiki-ing!

- СПУТНИК^{ССС Р} 22:04, 20 February 2006 (UTC)Reply

Welcome!

Hello, Abel Cavaşi, and welcome to Wikipedia! Thank you for your contributions. I hope you like the place and decide to stay. Here are a few good links for newcomers:

• The five pillars of Wikipedia
• How to edit a page
• Help pages
• Tutorial
• How to write a great article
• Manual of Style

I hope you enjoy editing here and being a Wikipedian! Please sign your name on talk pages using four tildes (~~~~); this will automatically produce your name and the date. If you need help, check out Wikipedia:Questions, ask me on my talk page, or place {{helpme}} on your talk page and someone will show up shortly to answer your questions. Again, welcome!  --Portnadler 17:48, 21 April 2006 (UTC)Reply

On minor edits

Latest comment: 16 years ago7 comments1 person in discussion

Hello, and welcome to Wikipedia! Please note that a number of your recent edits have been reverted because they were mathematically incorrect, and moreover labeled as minor edits. Please see Help:Minor_edit for details about what a minor edit actually is. Cheers, Silly rabbit (talk) 05:46, 25 December 2007 (UTC)Reply

The helix, at least as it is conventionally understood, has constant curvature and torsion. It is not merely the ratio which is constant. An easy way to see this is to realize that a doubly infinite helix is acted upon transitively by a 1-parameter family of Euclidean transformations (the corkscrew motion which carries the Euclidean space along the helix). Since curvature and torsion are Euclidean invariants of the curve they must therefore be constant, since we can get from any one point to any other by means of a corkscrew transformation. Silly rabbit (talk) 14:05, 25 December 2007 (UTC)Reply

Indeed, if κ and τ are constant, then obviously their ratio is constant. I did not know about Lancret's theorem. Still, the articles were correct as stated before, with the stronger statement, that the curvature and torsion are constant. Silly rabbit (talk) 18:55, 25 December 2007 (UTC)Reply

Lancret's theorem (apparently) holds for helices of variable radius. If you check the article Helix, and Frenet-Serret formulas, the helices under consideration have constant radius. Silly rabbit (talk) 19:10, 25 December 2007 (UTC)Reply

Yes, it is necessary and sufficient that the curvature and torsion be constant for a space curve to be a helix. Period. End of discussion. If you believe otherwise, then there is nothing more to say. There may be a theorem which states something else, but that would need to be checked. Anyway, I do know what a helix is, and you appear to be inserting misleading information into articles without providing references. I call you on it, and now you have the audacity to insult me. Please note that I wrote most of the current article on the Frenet-Serret formulas, and I think I have a fairly good reputation on Wikipedia as an expert in geometry. Silly rabbit (talk) 01:38, 26 December 2007 (UTC)Reply

I'm saying that I don't believe Lancret's theorem as stated. The mathworld reference is not enough, since they seem to provide no further references on the theorem. Furthermore, the theorem cannot possibly be true as stated, by the fundamental theorem of space curves. For any pair of functions κ>0 and τ there is a curve with curvature κ and torsion τ. Any two curves with the same curvature and torsion are congruent under a proper Euclidean motion. Now, consider the pair of function κ = e^t, τ = e^t. There is a curve with curvature κ and torsion τ. Lancret's theorem asserts that the curve is a helix. However, it cannot possibly be by the argument I have already given. The curvature and torsion of a helix are constant because they must remain invariant under a one-parameter family of Euclidean transformations preserving the curve: the corkscrew motion. Now, why don't you go and find another reference about Lancret's theorem. I suspect it may involve affine invariants of helices, and so be out of place in an article such as Frenet-Serret formulas which deals with the Euclidean invariants.

Now, I am puzzled that you would say that the torsion and curvature of a helix are not constant. This is a well known result to be found in essentially any calculus book. See also the second volume of Spivak's Comprehensive Introduction to Differential Geometry. The converse, that any curve with constant curvature and torsion is a helix, is also a standard fact and there are various ways of seeing it. For instance, given a constant κ and τ, there is a helix with these as the curvature and torsion; specifically the parametric curve

${\displaystyle {\frac {1}{\kappa ^{2}+\tau ^{2}}}\langle \kappa \cos t,\kappa \sin t,\tau t\rangle .}$ 

So, I have now provided a more-or-less complete proof that a curve is a helix if and only if it has constant curvature and torsion. I have also given you very thorough reasons for rejecting Lancret's theorem. If you believe that I am still mistaken, then please provide some corroborating references. Otherwise, I don't have anything further to say about it. Silly rabbit (talk) 16:06, 26 December 2007 (UTC)Reply

The definition of helix you are using does not agree with the one given in the Wikipedia article Helix. This is what I meant when I said that on Wikipedia, helices are of constant radius. I note that the Mathworld definition agrees with Wikipedia's, as does that in most standard books. Of course, if you use a different definition, then you are going to have different results. But you do need to be forthcoming about what you mean. Silly rabbit (talk) 21:36, 26 December 2007 (UTC)Reply

AfD nomination of Overacceleration

Latest comment: 16 years ago2 comments2 people in discussion

 

An editor has nominated Overacceleration, an article on which you have worked or that you created, for deletion. We appreciate your contributions, but the nominator doesn't believe that the article satisfies Wikipedia's criteria for inclusion and has explained why in his/her nomination (see also "What Wikipedia is not").

Your opinions on whether the article meets inclusion criteria and what should be done with the article are welcome; please participate in the discussion by adding your comments at Wikipedia:Articles for deletion/Overacceleration and please be sure to sign your comments with four tildes (~~~~).

You may also edit the article during the discussion to improve it but should not remove the articles for deletion template from the top of the article; such removal will not end the deletion debate. Thank you. BJBot (talk) 21:14, 26 January 2008 (UTC)Reply

Hi. I am the editor who nominated it, because I don't think the word is used in the sense you give; rather than rate of change of acceleration, it is normally used to mean too much acceleration or more specifically acceleration exceeding some preset limit so as to trigger an "overacceleration sensor" and do something like setting off an airbag. If you have a source for your definition, please comment in the deletion discussion. Regards, JohnCD (talk) 21:21, 26 January 2008 (UTC)Reply