Detecting and creating oscillations using multifractal methods

By comparing the Hausdorff multifractal spectrum with the large deviations spectrum of a given continuous function f, we find sufficient conditions ensuring that f possesses oscillating singularities. Using a similar approach, we study the nonlinear wavelet threshold operator which associates with any function f = ∑_j ∑_k d_j,k ψ _j,k ∈ L ²(?) the function series f^t whose wavelet coefficients are d ^t _j,k = d_j,k 1 , for some fixed real number γ > 0. This operator creates a context propitious to have oscillating singularities. As a consequence, we prove that the series f^t may have a multifractal spectrum with a support larger than the one of f . We exhibit an example of function f ∈ L ²(?) such that the associated thresholded function series f^t effectively possesses oscillating singularities which were not present in the initial function f . This series f^t is a typical example of function with homogeneous non‐concave multifractal spectrum and which does not satisfy the classical multifractal formalisms. (© 2006 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)