English

Small deviations in lognormal Mandelbrot cascades

Probability 2013-06-17 v1

Abstract

We study small deviations in Mandelbrot cascades and some related models. Denoting by YY the total mass variable of a Mandelbrot cascade generated by WW, we show that if loglog1/P(Wx)γloglog1/x\log \log 1/P(W \leq x) \sim \gamma \log \log 1/x as x0x \to 0 with γ>1\gamma > 1, then the Laplace transform of YY satisfies loglog1/\EetYγloglogt\log \log 1/\E e^{-t Y} \sim \gamma \log \log t as tt \to \infty. As an application, this gives new estimates for \Prob(Yx)\Prob(Y \leq x) for small x>0x > 0. As another application of our methods, we prove a similar result for a variable arising as a total mass of a lognormal \star-scale invariant multiplicative chaos measure.

Cite

@article{arxiv.1306.3448,
  title  = {Small deviations in lognormal Mandelbrot cascades},
  author = {Miika Nikula},
  journal= {arXiv preprint arXiv:1306.3448},
  year   = {2013}
}

Comments

13 pages

R2 v1 2026-06-22T00:34:02.426Z