2013
DOI: 10.1209/0295-5075/103/58003
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Non-stationarity in financial time series: Generic features and tail behavior

Abstract: Financial markets are prominent examples for highly non-stationary systems. Sample averaged observables such as variances and correlation coefficients strongly depend on the time window in which they are evaluated. This implies severe limitations for approaches in the spirit of standard equilibrium statistical mechanics and thermodynamics. Nevertheless, we show that there are similar generic features which we uncover in the empirical return distributions for whole markets. We explain our findings by setting up… Show more

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Cited by 50 publications
(107 citation statements)
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“…(4) and for the financial data in Ref. [16], the superposition of the amplitudes, in the present case the returns, drives the multivariate distribution towards a Gaussian, provided that the covariances are sufficiently constant. Second, as observed in Ref.…”
Section: Deformed Ensemble and Return Distributionmentioning
confidence: 89%
See 3 more Smart Citations
“…(4) and for the financial data in Ref. [16], the superposition of the amplitudes, in the present case the returns, drives the multivariate distribution towards a Gaussian, provided that the covariances are sufficiently constant. Second, as observed in Ref.…”
Section: Deformed Ensemble and Return Distributionmentioning
confidence: 89%
“…II C. Here, we derive the approach for the general case, for sake of illustration, the reader is referred to Ref. [16] and Sec. III…”
Section: Constructing a Proper Random Matrix Ensemblementioning
confidence: 99%
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“…Standard correlation measures like the Pearson correlation coefficient and the cross-correlation function require stationary data in order to provide reliable results, which is a requirement that is hard to fulfill in many real-world situations (the financial and physiological data are the negative examples here [1][2][3][4][5][6][7][8][9][10]). (By stationarity we mean stability of the probability distribution functions of the data over time; from this perspective nonstationarity can be produced both by the long-range autocorrelations and by the pdf's heavy tails that make any signal length effectively insufficient.)…”
Section: Introductionmentioning
confidence: 99%