Scaling Properties of Long-Range Correlated Noisy Signals
Abstract
The Hurst coefficient H of a stochastic fractal signal is estimated using the function σMA2=1Nmax-nΣi=nNmax [y(i)-yn(i)]2, where yn(i) is defined as 1/n Σk=0n-1 y(i-k), n is the dimension of moving average box and Nmax is the dimension of the stochastic series. The ability to capture scaling properties by σMA2 can be understood by observing that the function Cn(i)= y(i)-yn(i) generates a sequence of random clusters having power-law probability distribution of the amplitude and of the lifetime, with exponents equal to the fractal dimension D of the stochastic series.
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