Dresden 2011 – wissenschaftliches Programm

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SOE: Fachverband Physik sozio-ökonomischer Systeme

SOE 11: Poster Session

SOE 11.12: Poster

Dienstag, 15. März 2011, 18:05–18:45, P2

Universal behavior in the dynamics of finanical markets — •Josef Ludescher¹, Constantino Tsallis^1,2, and Armin Bunde¹ — ¹Institut fur Theoretische Physik, Justus-Liebig-Universitat Giessen, 35392 Giessen, Germany — ²present address: Centro Brasileiro de Pesquisas Fisicas 22290-180 Rio de Janeiro-RJ, Brazil

In financial markets, the central quantity are the relative losses or gains of an asset in a certain fixed period of time. The time evolution of these returns can be characterized by the set of interoccurence times r between losses below a negative threshold Q, in particular by their mean interoccurence time R_Q and their distribution function P_Q(r). Here we consider daily losses in 16 representative financial records (stocks, indices, commodities and exchange rates). We find that in all cases P_Q(r) follows the q-exponential form P_Q(r)=1/(1+(q−1)β_Q r)^1/(q−1) , where β is a monotonously decreasing function for small R_Q and becomes a constant for R_Q>10. A is a normalization constant. The q-value appearing in the exponent of P_Q decreases logarithmically with decreasing R_Q, such that for R_Q → 2, q tends to 1 and thus P_Q(r) becomes a simple exponential. The fact that P_Q does not scale with R_Q is due to the multifractality of financial markets. The analytic form of the distribution allows also to estimate both the functional form of the risk function as well as the value-at-risk, and thus to improve estimation of the financial risk.