Talk:Volterra's function

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I tried the external link http://www.macalester.edu/~bressoud/talks/Volterra-4.pdf today, but it was broken. 152.3.25.70 (talk) 18:15, 13 April 2009 (UTC)[reply]

The second to last paragraph:

Volterra's function is differentiable everywhere just as f(x) (defined above) is. The derivative V ′(x) is discontinuous at the endpoints of every interval removed in the construction of the SVC, but the function is differentiable at these points with value 0. Furthermore, in any neighbourhood of such a point there are points where V ′(x) takes values 1 and −1. It follows that it is not possible, for every ε > 0, to find a partition of the real line such that |V ′(x₂) − V ′(x₁)| < ε on every interval [x₁, x₂] of the partition. Therefore, the derivative V ′(x) is not Riemann integrable.

is wrong. For one thing, the derivative V'(x) is discontinuous not just at the endpoints of every interval removed in the SVC construction, but actually on the entire Smith-Volterra-Cantor set. This is extremely important. It follows from Lebesgue's criterion for Riemann integrability that the derivative V' is not Riemann integrable. Furthermore, in the conclusion,

It follows that it is not possible, for every ε > 0, to find a partition of the real line such that |V ′(x2) − V ′(x1)| < ε on every interval [x1, x2] of the partition. Therefore, the derivative V ′(x) is not Riemann integrable.

is completely false. The first sentence is wrong, since one can choose a partition so that V'(x)=0 for every x which is the endpoint of an interval in the partition (the partition {0,1} comes to mind). I'm not quite sure what the author meant - the closest thing I can guess is something like the definition of uniform continuity? In any case, the second sentence doesn't follow from the first (or even a modified version of it), since continuity is not required for Riemann integrability. For instance, if you take the function

${\displaystyle f(x)={\begin{cases}0,&x<0,\\1,&x\geq 0,\end{cases}}}$

then in any partition of [-1,1], there will always be a subinterval in which the function takes both zero and one as values. However, the function is Riemann integrable, since the difference between the upper and lower Riemann sums is simply the width of that subinterval, which can be made arbitrarily small.

In fact, nowhere in the given explanation does it refer to or make use of that fact that the SVC has positive measure (which is the entire point behind the construction of the SVC). If one repeated the construction of Volterra's function with the ordinary measure 0 Cantor set instead of the SVC, one would get a function whose derivative IS Riemann integrable (again, by Lebesgue's criterion for Riemann integrability). The article should point this out.

I intend to correct the mistake at some point, but maybe someone else will get to it first. In any case, when I do, I figured this more detailed explanation will serve as a useful addition to the (necessarily short) edit summary.

--skeptical scientist (talk) 23:57, 25 January 2011 (UTC)[reply]

I fixed the errors, although the resulting section is still fairly short and may be hard to follow for some. It's basically a list of properties of V which together form a sort of a proof sketch that V has a non-integrable derivative. This is probably great from the standpoint of a bright reader who knows a fair amount of real analysis and measure theory. However, it is probably hard to follow for someone who is just learning about things like Riemann integrability and Lebesgue measure, so could do with more fleshing out. However, it at least now has the virtue of being true, so I'll leave any fleshing out to be done to some other contributor. skeptical scientist (talk) 03:01, 26 January 2011 (UTC)[reply]

In musing what would really help this article be more understandable, I think pictures are the key. If someone with some good graphing software could generate images of f, f₁, f₂, and V, I think that would really go a long way towards helping people understand the construction (which, as is, is probably fairly hard to follow for someone who doesn't already have some idea what is going on). I'd do it myself, but I don't really know a good program to use. skeptical scientist (talk) 03:39, 26 January 2011 (UTC)[reply]