Why is the Weierstrass Function http://mathworld.wolfram.com/WeierstrassFunction.html
not differentiable?
Yatir
I found an article which made reference
to a paper by Hardy (around 1912) which shows this function to be
non-differentiable for ab> 1. Does anyone have access to his
collected papers? I have one volume of them but it's not in
there.
Andre
I think the result is not true for ab
< = 1 and Hardy or someone established this too.
(1) Yitzhak Katznelson proves the result for large a and b on
page 105 of "Introduction to Harmonic Analysis".
(2) Tom Korner gives a simple proof with bn and
an replaced by factorials in his book "Fourier
Analysis".
The key point in both cases being that the theorem is easier to
prove when the a and b terms are large and small respectively.
Weierstrass originally proved the result with large a and small b
and Hardy + others found the best bounds as Andre points out (I
think).
The proof is technical, Upwards more than Onwards, but the idea
is more or less as follows (at least for Tom's proof).
The first term in the series is a periodic graph. Add on the next
term and this is also periodic, but with higher frequency and
smaller amplitude. It makes the original periodic graph "quiver".
As you add more cos terms on, the graph quivers more and more and
the gradients get higher. That is, the maximum of the derivative
of each partial sum increases without bound rendering the limit
function nowhere differentiable.
I could well supply details (taken from the books) or some
pictures if anyone is still with this. Tom Korner supplied me
with all the information, although I might have made some slips
above regarding the history of the function.
Ian
| a(x)= |
¥ å n=0 | (1/n!)sin[(n!)2 x]=aN(x)+bN(x)+cN(x) |