Holder Exponent Multifractal at Daisy Cornelia blog

Holder Exponent Multifractal. We can define the holder exponent¨ h q(t) as a measure of regularity if there is a polynomial p of degree less than a such that jx(t) p(t t 0)j cjt t. We present a robust method of estimating an effective hölder exponent locally at an arbitrary resolution. The holder exponent of¨ x at t is defined as: Multifractal analysis provides a measure for¨ these regularity fluctuations by means of the multifractal. (4) it characterizes the local regularity of x at t in the sense that the. The multifractal analysis is a tool to calculate fractal properties as well as scaling behavior of the structural response excited by an. X 2 c ↵( )} 0. The method is motivated by the.

Top panel. Multifractal analysis for the PDC light curve of the
from www.researchgate.net

The method is motivated by the. (4) it characterizes the local regularity of x at t in the sense that the. The multifractal analysis is a tool to calculate fractal properties as well as scaling behavior of the structural response excited by an. The holder exponent of¨ x at t is defined as: Multifractal analysis provides a measure for¨ these regularity fluctuations by means of the multifractal. We can define the holder exponent¨ h q(t) as a measure of regularity if there is a polynomial p of degree less than a such that jx(t) p(t t 0)j cjt t. We present a robust method of estimating an effective hölder exponent locally at an arbitrary resolution. X 2 c ↵( )} 0.

Top panel. Multifractal analysis for the PDC light curve of the

Holder Exponent Multifractal X 2 c ↵( )} 0. Multifractal analysis provides a measure for¨ these regularity fluctuations by means of the multifractal. We can define the holder exponent¨ h q(t) as a measure of regularity if there is a polynomial p of degree less than a such that jx(t) p(t t 0)j cjt t. The holder exponent of¨ x at t is defined as: The multifractal analysis is a tool to calculate fractal properties as well as scaling behavior of the structural response excited by an. (4) it characterizes the local regularity of x at t in the sense that the. We present a robust method of estimating an effective hölder exponent locally at an arbitrary resolution. X 2 c ↵( )} 0. The method is motivated by the.

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