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Long-term memory is ubiquitous in nature and has important consequences for the occurrence of natural hazards, but its detection often is complicated by the short length of the considered records and additive white noise in the data. Here we study synthetic Gaussian distributed records x₈ of length N that consist of a long-term correlated component (1-a) y₈ characterized by a correlation exponent, 00) =B₀s^-, and E₀=2{B₀/ (2-) (1-) }N^-+O (N^-1). The finite-size parameter E₀ also occurs in related quantities, for example, in the variance ₍^2 (s) of the local mean in time windows of length s: ₍^2 (s) =_^2 (s) -E₀/ (1-E₀). For purely long-term correlated data B₀ (2-) (1-) /2 yielding E₀N^-, and thus C₍ (s) = (2-) (1-) 2s^--N^-/1-N^- and ₍^2 (s) =s^--N^-/1-N^-. We show how to estimate E₀ and C_ (s) from a given data set and thus how to obtain accurately the exponent and the amount of white noise a.
Lennartz et al. (Fri,) studied this question.