146 ACTA WASAENSIACont, R. (2001). Empirical properties of asset returns: stylized facts and statisticalissues. Quantitative Finance 1:2, 223—236.Cont, R. & J.-P. Bouchaud (2000). Herd behavior and aggregate fluctuations in financialmarkets. Macroeconomic Dynamics 4, 170—196.Cootner, P. F. (1964). The Random Character of Stock Market Prices. MIT Press,Cambridge, Massachusetts.Crato, N. & P. J. de Lima (1994). Long-range dependence in the conditional varianceof stock returns. Economics Letters 45, 281—285.Cross, F. (1973). The behavior of stock prices on fridays and mondays. FinancialAnalysts Journal 1973:6, 67—69.Cutler, D. M., J. M. Poterba & L. H. Summers (1989). What moves stock prices?Journal of Portfolio Management 1989:1, 67—69.Das, S. R. & R. Uppal (2004). Systemic risk and international portfolio choice. Journalof Finance 59:6, 2809—2834.Davis, E. P. (2003). Institutional investors, financial market efficiency and financialstability. Discusssion Paper PI-0303, The Pensions Institute, University of London.Davis, E. P. & B. Steil (2001). Institutional Investors. MIT Press, Cambridge, Massachusetts.Davis, J. L., E. F. Fama & K. R. French (2000). Characteristics, covariances, andaverage returns: 1929 to 1997. Journal of Finance 55:1, 389—406.Day, R. H. & W. Huang (1990). Bulls, bears and market sheep. Journal of EconomicBehavior and Organization 14, 299—329.De Bondt, W. F. M. & R. Thaler (1985). Does the stock market overreact? Journalof Finance 40:3, 793—805.de Haan, L., S. I. Resnick, H. Rootzen & C. G. de Vries (1989). Extremal behaviour ofsolutions to a stochastic difference equation with applications to ARCH processes.Stochastic Processes and their Applications 32, 213—224.
ACTA WASAENSIA 147Degiannakis, S. & E. Xekalaki (2004). Autoregressive conditional heteroscedasticity(ARCH) models: A review. Qualitative Technology and Quantitative Management1:2, 271—324.DeGrauwe, P., H. Dewachter & M. Embrechts (1993). Exchange Rate Theory: ChaoticModels of the Foreign Exchange Market. Blackwell, Oxford.Delbaen, F. & W. Schachermayer (1994). A general version of the fundamental theoremof asset pricing. Mathematische Annalen 300, 463—520.DeLong, J. B., A. Shleifer, L. H. Summers & R. J. Waldman (1990). Noise trader riskin financial markets. JournalofPoliticalEconomy98, 703—738.Diebold, F. X. (1988). Empirical Modeling of Exchange Rate Dynamics, volume 303 ofLecture Notes in Economics and Mathematical Systems. Springer, Berlin.Diebold, F. X. & A. Inoue (2001). Long memory and regime switching. Journal ofEconometrics 105, 131—159.Ding, Z. & C. W. Granger (1996). Modeling volatility persistence of speculative returns:A new approach. Journal of Econometrics 73, 185—215.Ding, Z., C. W. Granger & R. F. Engle (1993). A long memory property of stockmarket returns and a new model. Journal of Empirical Finance 1, 83—106.Drost, F. C. & T. E. Nijman (1993). Temporal aggregation of Garch processes. Econometrica61:4, 909—927.Duffee, G. R. (1995). Stock return and volatility: A firm-level analysis. Journal ofFinancial Economics 37, 399—420.DuMouchel, W. H. (1973). Stable distributions in statistical inference: 1. symmetricstable distributions compared to other symmetric long-tailed distributions. Journalof the American Statistical Association 68:342, 469—477.Easley, D. & M. O’Hara (1992). Time and the process of security price adjustment.Journal of Finance 47:2, 577—605.Eberlein, E. & U. Keller (1995). Hyperbolic distributions in finance. Bernoulli 1:3,281—299.
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10 ACTA WASAENSIAIn chapter 5 I sha
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14 ACTA WASAENSIA2.2 Absence of Ser
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ACTA WASAENSIA 23A particular class
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26 ACTA WASAENSIAMultiscaling may t
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28 ACTA WASAENSIAHansen (1982) to c
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30 ACTA WASAENSIAThe leverage hypot
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32 ACTA WASAENSIAIn order to aviod
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34 ACTA WASAENSIAon a risk-adjusted
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36 ACTA WASAENSIAplanations for the
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38 ACTA WASAENSIAspeculative prices
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40 ACTA WASAENSIAindex α is howeve
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42 ACTA WASAENSIAThis approach has
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44 ACTA WASAENSIAimplying exponenti
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46 ACTA WASAENSIA3.2.4 Descriptive
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48 ACTA WASAENSIAdivisible version
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50 ACTA WASAENSIAto check their ade
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52 ACTA WASAENSIAvolatility into th
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54 ACTA WASAENSIAfeedback of the co
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56 ACTA WASAENSIAarriving at the fo
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58 ACTA WASAENSIAat iteration k com
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60 ACTA WASAENSIAmultipliers in the
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62 ACTA WASAENSIALux & Ausloos (200
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64 ACTA WASAENSIAmarkets dominated
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66 ACTA WASAENSIAThe “representat
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68 ACTA WASAENSIA(1983) 114 motivat
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70 ACTA WASAENSIAIn the following w
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72 ACTA WASAENSIASethi (1996) exten
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74 ACTA WASAENSIASummation over all
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76 ACTA WASAENSIAthe microscopic un
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78 ACTA WASAENSIA& Winker (2003) an
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80 ACTA WASAENSIAWe wish to obtain
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82 ACTA WASAENSIAindividual markets
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84 ACTA WASAENSIAreturn series. I l
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86 ACTA WASAENSIASwitches between c
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88 ACTA WASAENSIAfollowing necessar
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90 ACTA WASAENSIATable 1. Parameter
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92 ACTA WASAENSIAin stepwise search
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94 ACTA WASAENSIA0.2Logreturns Para
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- Page 136 and 137: 136 ACTA WASAENSIAIn order to test
- Page 138 and 139: 138 ACTA WASAENSIAReferencesAbhyank
- Page 140 and 141: 140 ACTA WASAENSIABaillie, R. T. (1
- Page 142 and 143: 142 ACTA WASAENSIABlack, F. & M. Sc
- Page 144 and 145: 144 ACTA WASAENSIAButler, R. J., J.
- Page 148 and 149: 148 ACTA WASAENSIAEmbrechts, P., C.
- Page 150 and 151: 150 ACTA WASAENSIAFielitz, B. D. (1
- Page 152 and 153: 152 ACTA WASAENSIAGhysels, E., A. C
- Page 154 and 155: 154 ACTA WASAENSIAHeston, S. L. (19
- Page 156 and 157: 156 ACTA WASAENSIAKaldor, N. (1939)
- Page 158 and 159: 158 ACTA WASAENSIALiesenfeld, R. (1
- Page 160 and 161: 160 ACTA WASAENSIALye, J. N. & V. L
- Page 162 and 163: 162 ACTA WASAENSIAMikosch, T. (2003
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- Page 170 and 171: 170 ACTA WASAENSIAAAppendixA1Matlab
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- Page 194 and 195: 194 ACTA WASAENSIA279280281 %Output
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196 ACTA WASAENSIA(4.20), and o(τ
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198 ACTA WASAENSIAas t = n k P ˙
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200 ACTA WASAENSIA nBn˙f2 = v B n
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202 ACTA WASAENSIA f˙1−c1 = v B
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204 ACTA WASAENSIAlocal stability o
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