Question

Is there a known connection between Weierstrass' function

$W_\alpha (x) = \sum_{n=0}^\infty b^{- n \alpha} \cos(b^n x)$

and Brownian motion? Specifically, when $\alpha = 1/2$, the Weierstrass function has same Holder continuity peoperties that Brownain sample paths do. Some crude Matlab experiments seem to suggest this function has linear quadratic variation for low values of $b$, too.

The expression reminds me a little of the Karhunen-loeve expansion of Brownian motion, but I don't see how the two might relate.

Many thanks.

Answer 1

Some quick Googling brought me to this paper. The idea is to take the coefficients in the summation to be suitable independent random variables according to a suggestion of Mandelbrot. I can't actually access the paper right now so I can't say if the authors were able to include the case of standard Brownian motion in their results.

``Convergence of the Weierstrass-Mandelbrot process to Fractional Brownian Motion'' Murad Taqqu and Vladas Pipiras. Fractals. 8 (2000) 369-384.

Answer 2

You might find this account useful. In particular, see the end of Section 1, page 7, and the end of Section 4.