• Title of article

    Linearization effect in multifractal analysis: Insights from the Random Energy Model

  • Author/Authors

    Angeletti، نويسنده , , Florian and Mézard، نويسنده , , Marc and Bertin، نويسنده , , Eric and Abry، نويسنده , , Patrice، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2011
  • Pages
    9
  • From page
    1245
  • To page
    1253
  • Abstract
    The analysis of the linearization effect in multifractal analysis, and hence of the estimation of moments for multifractal processes, is revisited borrowing concepts from the statistical physics of disordered systems, notably from the analysis of the so-called Random Energy Model. Considering a standard multifractal process (compound Poisson motion), chosen as a simple representative example, we show the following: (i) the existence of a critical order q ∗ beyond which moments, though finite, cannot be estimated through empirical averages, irrespective of the sample size of the observation; (ii) multifractal exponents necessarily behave linearly in q , for q > q ∗ . Tailoring the analysis conducted for the Random Energy Model to that of Compound Poisson motion, we provide explicative and quantitative predictions for the values of q ∗ and for the slope controlling the linear behavior of the multifractal exponents. These quantities are shown to be related only to the definition of the multifractal process and not to depend on the sample size of the observation. Monte Carlo simulations, conducted over a large number of large sample size realizations of compound Poisson motion, comfort and extend these analyses.
  • Keywords
    random energy model , Truncated moments , Moment dominant contributions , multifractal analysis , Compound Poisson motion , Linearization effect
  • Journal title
    Physica D Nonlinear Phenomena
  • Serial Year
    2011
  • Journal title
    Physica D Nonlinear Phenomena
  • Record number

    1729884