Talk:Ordinary differential equation

Latest comment: 1 year ago by PrimeBOT in topic India Education Program course assignment


Wiki Education Foundation-supported course assignment

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  This article was the subject of a Wiki Education Foundation-supported course assignment, between 28 August 2021 and 10 December 2021. Further details are available on the course page. Student editor(s): Madelynrahman.

Above undated message substituted from Template:Dashboard.wikiedu.org assignment by PrimeBOT (talk) 05:48, 17 January 2022 (UTC)Reply

Removal of content

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I deleted the section Linear equations rather than wasting time cleaning it up, since everything is covered in far more detial and in better presentation in the main article Linear differential equation.

Furthermore the subsections within that section: Fundamental systems for homogeneous equations with constant coefficients and General Case, had zero references and were not exactly easy for a reader to follow anyway... they are no more. F = q(E+v×B) ⇄ ∑ici 09:34, 31 May 2012 (UTC)Reply

There was a link to the section Linear ordinary differential equations in the article Stiff equation. I just now updated the link to point to the section Reduction of order instead, as this section describes not only the reduction of order but also the vector representation of such a system. Please consider leaving the existing section in place so that the vector representation will still be described in a convenient place. If the vector representation is deleted, it should be moved somewhere and documented in the talk pages for its source and destination pages. — Anita5192 (talk) 17:48, 31 May 2012 (UTC)Reply
Of course I'll leave that section alone - thats relavent! My only implications were that the theory of linear equations should be kept in the other article (which is also in bad shape in places.....), rather than repeating too much here. Thank you for feedback - appreciated. =) F = q(E+v×B) ⇄ ∑ici 23:27, 31 May 2012 (UTC)Reply

Global uniqueness and maximum domain of solution

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It would be nice to have a counter-example with domain ℝ\{x_0 + 1/y_0}, that satisfies the initial condition, but has a different definition on the other interval. Soulpa7ch (talk) 18:49, 17 September 2012 (UTC)Reply

Error!

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f(x, y) = y^2 is *not* Lipschitz continuous. Please rectify or make clear (that you mean "locally Lipschitz"). — Preceding unsigned comment added by 2607:4000:200:12:21A:92FF:FE83:373 (talk) 23:24, 21 January 2013 (UTC)Reply

Argument of function belongs in numerator

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In the Background section, I moved the argument of x(t) back into the numerator of the derivative because that is where it commonly is placed in textbooks. See, e.g., Simmons, George F. Differential Equations with Applications and Historical Notes. p.123. — Anita5192 (talk) 20:32, 6 November 2014 (UTC)Reply

Proposed merge with Strang splitting

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seems to be one of the possible solutions Shrikanthv (talk) 10:53, 3 December 2014 (UTC)Reply

Operator splitting is used for dimensional splitting of Partial differential equations as well, which has (almost 😉) nothing to do with ODEs. Merging strang splitting here thus doesn't make sense. I'd support merging strang splitting into a general article on splitting methods though. -- Pberndt (talk) 08:54, 19 April 2016 (UTC)Reply

More rigor in the definitions of th order ODEs

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In the definition of an  th order linear ODE  , all the article says is that the   and   are continuous. It doesn't even say   at the end of the equation. I think we should give the domains and codomains of all the functions in the equation, i.e. we should say that   are continuous and   is   times differentiable (from which it follows from the equation that   is actually   times continuously differentiable).

In the definition of a general  th order ODE (implicit form   and explicit form  ), the article says even less. Again there is no  , and it doesn't say that   should be   times differentiable. The most problematic part however is that nothing at all is said about  . In the implicit case, its domain and codomain are given by   where  , and in the explicit case it is   where  .

In the same way that we demand that   are continuous in the definition of a linear ODE, are there any agreed upon assumptions on   in the definition of a general ODE? Later in the article in the 'Local existence and uniqueness theorem simplified' section, when talking about the first order system   (where yet again all the terms are not fully explained, or even made clear that they are vector quantities), it says that we should have   and   continuous in some vicinity of the initial condition in order to guarantee the existence and uniqueness of a solution. Is there a similar result which applies to the general  th order ODE   or  ? (I could probably figure it out by converting them into first order systems and reverse engineering, but I'll see what you guys say first).

So in summary, 1) do you guys think that we should modify the definitions of linear and general ODEs by explaining all the terms in the equations more fully, and 2) are there agreed upon assumptions on   in the literature in the definition of a general (implicit and explicit)  th order ODE? At the moment, having   being identically   for an implicit  th order ODE satisfies the definition given in the article. — Preceding unsigned comment added by Joel Brennan (talkcontribs) 14:56, 21 April 2018 (UTC)Reply

I agree with your first point, although for the sake of compactness I would include the assumptions valid for all the definitions in advance rather than in every definition. I'm sorry that I cannot answer to your second point. I also think that, after the general definition it would not be correct saying "There are further classifications". It could be said "general definitions for particular types of differential equations". However, i find it redundant and in some cases wrong what is presented. For instance, the type "homogeneous" refers only to linear equations so it is misleading this presentation. I would perhaps delete all this and just say that there are different particular types of equations, and provide the links to the correspondent articles, which I think are ok. What do you think? Conjugado (talk) 19:11, 2 January 2019 (UTC)Reply

Software section

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The software section doesn't actually include ODE solver software, but instead links to languages which have submodules that can solve ODEs. I tried to improve the software section by linking directly to one of the more popular submodules, DifferentialEquations.jl solvers, but MrOllie keeps deleting the reference. Should this section instead be renamed to "Languages with ODE Solver Software"? If that's the case, languages like Python, R, etc. should probably be removed, since their ODE solvers are wrappers for the C++ and Fortran implementations of methods like dopri5, dop853, and lsode. — Preceding unsigned comment added by 71.232.17.207 (talk) 12:26, 18 October 2019 (UTC)Reply

The section should include only entries with some demonstrated notability in the form of a preexisting Wikipedia article. See WP:WTAF - MrOllie (talk) 12:28, 18 October 2019 (UTC)Reply
So notability of an ODE solver is not defined in terms of users, Github metrics, citing articles, etc., but instead in terms of whether there's a preexisting Wikipedia article? It's fine if it's consistent, but that seems like an odd criteria. — Preceding unsigned comment added by 71.232.17.207 (talk) 13:08, 18 October 2019 (UTC)Reply

India Education Program course assignment

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  This article was the subject of an educational assignment supported by Wikipedia Ambassadors through the India Education Program.

The above message was substituted from {{IEP assignment}} by PrimeBOT (talk) on 19:51, 1 February 2023 (UTC)Reply