English

Increment definitions for scale dependent analysis of stochastic data

Data Analysis, Statistics and Probability 2009-11-10 v2 Disordered Systems and Neural Networks

Abstract

It is common for scale-dependent analysis of stochastic data to use the increment Δ(t,r)=ξ(t+r)ξ(t)\Delta(t,r) = \xi(t+r) - \xi(t) of a data set ξ(t)\xi(t) as a stochastic measure, where rr denotes the scale. For joint statistics of Δ(t,r)\Delta(t,r) and Δ(t,r)\Delta(t,r') the question how to nest the increments on different scales r,rr,r' is investigated. Here we show that in some cases spurious correlations between scales can be introduced by the common left-justified definition. The consequences for a Markov process are discussed. These spurious correlations can be avoided by an appropriate nesting of increments. We demonstrate this effect for different data sets and show how it can be detected and quantified. The problem allows to propose a unique method to distinguish between experimental data generated by a noiselike or a Langevin-like random-walk process, respectively.

Cite

@article{arxiv.physics/0404021,
  title  = {Increment definitions for scale dependent analysis of stochastic data},
  author = {Matthias Waechter and Alexei Kouzmitchev and Joachim Peinke},
  journal= {arXiv preprint arXiv:physics/0404021},
  year   = {2009}
}

Comments

Argumentation rearranged as in published version