Talk:Autonomous system (mathematics)

Prime symbol polysemy
If I've understood this correctly, in Properties, y_0' means a value of the variable y which is not necessarily the same as y_0, whereas in Solution techniques: Second order, x' means the derivative of x. Would it be worth using distinct symbols, or at least adding some parenthetical disambiguation to Properties? Dependent Variable (talk) 22:09, 15 January 2011 (UTC)

Solution techniques
All of the solution techniques involve trying to get t = something, when the aim of solving something like $$\dot{x} = f(x)$$ is to obtain a solution x(t), as t is the independent variable. Cases like $$x'' = f(x)$$ cover huge areas of physics but the aim isn't to find out the time given f(x). In a few cases, like someone falling under gravity and experiencing atmospheric drag you end up finding an expression t = F(x) such that you can invert it to get $$x = F^{-1}(t)$$, which is the solution. However, unless I'm missing something I don't see how saying the solution is to write the independent variable equal some (possibly horrible) expression is correct phrasing. — Preceding unsigned comment added by 193.35.132.25 (talk) 01:12, 10 July 2011 (UTC)

Bad Picture
The Poincare diagram picture is inaccurate. The diagrams for repeated eigenvalues (the delta = 0 curves) should have the solution curves tangent to the eigendirections. — Preceding unsigned comment added by 50.33.30.170 (talk) 23:16, 25 March 2022 (UTC)