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Typical Borel measures on satisfy a multifractal formalism
In this article, we prove that in the Baire category sense, measures
supported by the unit cube of typically satisfy a multifractal
formalism. To achieve this, we compute explicitly the multifractal spectrum of
such typical measures . This spectrum appears to be linear with slope 1,
starting from 0 at exponent 0, ending at dimension at exponent , and it
indeed coincides with the Legendre transform of the -spectrum associated
with typical measures .Comment: 17 pages. To appear in Nonlinearit
Renewal of singularity sets of statistically self-similar measures
This paper investigates new properties concerning the multifractal structure
of a class of statistically self-similar measures. These measures include the
well-known Mandelbrot multiplicative cascades, sometimes called independent
random cascades. We evaluate the scale at which the multifractal structure of
these measures becomes discernible. The value of this scale is obtained through
what we call the growth speed in H\"older singularity sets of a Borel measure.
This growth speed yields new information on the multifractal behavior of the
rescaled copies involved in the structure of statistically self-similar
measures. Our results are useful to understand the multifractal nature of
various heterogeneous jump processes
Multifractal analysis of complex random cascades
We achieve the multifractal analysis of a class of complex valued
statistically self-similar continuous functions. For we use multifractal
formalisms associated with pointwise oscillation exponents of all orders. Our
study exhibits new phenomena in multifractal analysis of continuous functions.
In particular, we find examples of statistically self-similar such functions
obeying the multifractal formalism and for which the support of the singularity
spectrum is the whole interval .Comment: 37 pages, 8 figure
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