Multifractal Formalism for Functions Part I: Results Valid For All Functions

Selfsimilar functions can be written as the superposition of similar structures, at different scales, generated by a function g. Their expressions look like wavelet decompositions. In the case where g is regular, the multifractal formalism has been proved for the corresponding selfsimilar function,

The frequency response function for structural intensity is a ratio of intensity at a response point to input power at an excitation point. At a zero frequency value, this function represents a ratio of time-averaged intensity at the receiving point to time-averaged power input at the source point,

Let X be a set and ~ a family of real-valued functions (not necessarily bounded) on X. We denote by/zsX the space X endowed with the weak uniformity generated by ~, and by ~(#~-X) the collection of uniformly contipuous functions ~' o the real line ~. In this note we study necessary and sufficient c