Olkhov, Victor (2022): Introduction of the Market-Based Price Autocorrelation.
Preview |
PDF
MPRA_paper_112003.pdf Download (157kB) | Preview |
Abstract
This paper considers direct dependence of the market price autocorrelation on statistical moments of the market trades as a must necessary requirement. We regard market time-series of the trade value and volume as origin of price time-series. That determines dependence of the market-based averaging of price on averaging of the trade value and volume time-series. We introduce the market-based price statistical moments as functions of the statistical moments of trade value and volume. Moving average helps define the market-based price statistical moments with time-lag and introduce the price time autocorrelation as function of time-lag statistical moments of the trade value and volume. Statistical moments of the market trade value and volume are determined by conventional frequency-based probability measures. However, the price statistical moments and the price autocorrelation in particular are determined by the market-based probability measure that differs from the conventional frequency-based price probability. That distinction leads to different treatments of the price autocorrelation via market-based and frequency-based approach. To assess market dependence of price statistical moments and price autocorrelation one should revise results founded on frequency-based approach.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Introduction of the Market-Based Price Autocorrelation |
| English Title: | Introduction of the Market-Based Price Autocorrelation |
| Language: | English |
| Keywords: | asset pricing; price probability; autocorrelation; market trades |
| Subjects: | C - Mathematical and Quantitative Methods > C1 - Econometric and Statistical Methods and Methodology: General C - Mathematical and Quantitative Methods > C5 - Econometric Modeling C - Mathematical and Quantitative Methods > C8 - Data Collection and Data Estimation Methodology ; Computer Programs > C80 - General E - Macroeconomics and Monetary Economics > E3 - Prices, Business Fluctuations, and Cycles > E37 - Forecasting and Simulation: Models and Applications F - International Economics > F3 - International Finance > F37 - International Finance Forecasting and Simulation: Models and Applications G - Financial Economics > G1 - General Financial Markets > G10 - General G - Financial Economics > G1 - General Financial Markets > G12 - Asset Pricing ; Trading Volume ; Bond Interest Rates G - Financial Economics > G1 - General Financial Markets > G17 - Financial Forecasting and Simulation |
| Item ID: | 112003 |
| Depositing User: | Victor Olkhov |
| Date Deposited: | 16 Feb 2022 16:23 |
| Last Modified: | 16 Feb 2022 16:23 |
| References: | Anderson, T.W. (1971). The Statistical Analysis of Time-Series. Wiley&.Sons, Inc., 1-757 Andersen, T.G., Tim Bollerslev, T., Peter F. Christoffersen, P.F. and F.X. Diebold, (2005). Practical Volatility And Correlation Modelling For Financial Market Risk Management, NBER, WP11069, Cambridge, MA, 1-41 Andersen, T.G., Bollerslev, T., Christoffersen, P.F., and Diebold, F.X. (2006). Volatility and Correlation Forecasting, in G. Elliot, C.W.J. Granger, and Allan Timmermann (eds.), Handbook of Economic Forecasting. Amsterdam: North-Holland, 778-878 Berkowitz, S.A., Dennis, E., Logue, D.E. and E.A. Jr. Noser, (1988). The Total Cost of Transactions on the NYSE, The Journal of Finance, 43, (1), 97-112 Buryak, A. and I. Guo, (2014). Effective And Simple VWAP Options Pricing Model, Intern. J. Theor. Applied Finance, 17, (6), 1450036, https://doi.org/10.1142/S0219024914500356 Busseti, E. and S. Boyd, (2015). Volume Weighted Average Price Optimal Execution, 1-34, arXiv:1509.08503v1 Campbell, J.Y., Grossman, S.J. and J.Wang, (1992). Trading Volume and Serial Correlation in Stock Return. NBER WP 4193, Cambridge, MA., 1-45 Cochrane, J.H. (2005). Time Series for Macroeconomics and Finance. Graduate School of Business, Univ. Chicago, 1-136 Davis, H.T., (1941). The Analysis of Economic Time-Series. Cowles Commission for Research in Economics. The Principia Press, Inc., 1-627 DeFusco, A.A., Nathanson, C.G. and E. Zwick, (2017). Speculative Dynamics of Prices and Volume, Cambridge, MA, NBER WP 23449, 1-74 Diebold, F.X. and G. Strasser, (2010). On The Correlation Structure Of Microstructure Noise: A Financial Economic Approach, NBER, WP 16469, Cambridge, MA, 1-65 Fama, E.F. (1965). The Behavior of Stock-Market Prices. The Journal of Business, 38 (1), 34-105 Friedman, M. (1962). The Interpolation of Time Series by Related Series, NBER, Cambridge, MA, Chapter 3, Correlation Methods, 14-22 Gallant, A.R., Rossi, P.E. and G. Tauchen, (1992). Stock Prices and Volume, The Review of Financial Studies, 5(2), 199-242 Goetzmann, W.N., Li, L. and K. G. Rouwenhorst, (2001). Long-Term Global Market Correlations. NBER, WP 8612, Cambridge, MA., 1-52 Gopikrishnan, P., Pleroua, V., Liua, Y., Amarala, L.A.N., X. Gabaix, X. and H.E. Stanley, (2000). Scaling and correlation in financial time series, Physica A, 287, 362-373 Karpoff, J.M. (1987). The Relation Between Price Changes and Trading Volume: A Survey. The Journal of Financial and Quantitative Analysis, 22 (1), 109-126 Kendall, M.G and A.B. Hill, (1953). The Analysis of Economic Time-Series-Part I: Prices. Jour. Royal Statistical Soc., Series A, 116 (1), 11-34 King, W.I. (1917). The Correlation of Historical Economic Variables and the Misuse of Coefficients in this Connection. Publications of the American Statistical Association, 15 (120), 847-853 Klyatskin, V.I. (2005). Stochastic Equations through the Eye of the Physicist, Elsevier B.V. Klyatskin, V.I. (2015). Stochastic Equations: Theory and Applications in Acoustics, Hydrodynamics, Magnetohydrodynamics, and Radiophysics, v.1, 2, Springer, Switzerland Lind, N. and N. Ramondo, (2018). Trade With Correlation, NBER, WP 24380, Cambridge, MA, 1-64 Liu,Y., Cizeau, P., Meyer, M., Peng, C-K. and H. E. Stanley, (1997). Correlations in Economic Time Series. Physica A, 245, 437-440 Llorente, G., Michaely R., Saar, G. and J. Wang. (2001). Dynamic Volume-Return Relation of Individual Stocks. NBER, WP 8312, Cambridge, MA., 1-55 Lo, A.W., (1987). Long-term Memory in Stock Market Prices. NBER WP 2984, Cambridge, MA., 1-47 Mantegna, R.N. and H. E. Stanley, (2000). An Introduction To Econophysics. Correlations And Complexity In Finance. Cambridge Univ.Press, 1-147 Michaely, M. (1971). Appendix: A Few Experiments with Formal Correlation Analysis, 281-287 in Ed. Michaely, M., The Responsiveness of Demand Policies to Balance of Payments: Postwar Patterns, NBER, Cambridge, MA Montgomery, D.C., Jennings, C.L. and M. Kulahci. (2008). Introduction to Time Series Analysis and Forecasting. Wiley&.Sons, Inc., 1-469 Nava, N., Di Matteo, T. and A. Tomaso, (2018). Dynamic correlations at different timescales with empirical mode decomposition. Physica A, 502, 534-544 Olkhov, V. (2016a). On Economic space Notion, Intern. Rev. Financial Analysis. 47, 372-381 Olkhov, V. (2016b). Finance, Risk and Economic space, ACRN Oxford Journal of Finance&Risk Perspectives, 5, 209-221 Olkhov, V., (2017). Quantitative wave model of macro-finance, International Review of Financial Analysis, 50, 143-150 Olkhov, V. (2018). How Macro Transactions Describe the Evolution and Fluctuation of Financial Variables, Int. J. Financial Stud., 6 (38), 1-19 Olkhov, V. (2019a). Economic And Financial Transactions Govern Business Cycles. ACRN Oxford Journal of Finance&Risk Perspectives. 8, 1-20 Olkhov, V. (2019b). Financial Variables, Market Transactions, and Expectations as Functions of Risk. Int. J. Financial Stud., 7, 66; 1-27 Olkhov, V. (2020), Classical Option Pricing and Some Steps Further. MPRA, WP105431, 1-16, https://mpra.ub.uni-muenchen.de/105431/ Olkhov, V. (2021a). Price, Volatility and the Second-Order Economic Theory. ACRN Jour. Finance & Risk Perspectives, Sp. Issue, 18th FRAP Conference, 10, 139-165 Olkhov, V., (2021b), Three Remarks On Asset Pricing. SSRN WP3852261, 1-24. https://ssrn.com/abstract=3852261 Olkhov, V. (2021c). To VaR, or Not to VaR, That is the Question. SSRN, WP3770615, 1-14, https://ssrn.com/abstract=3770615 Olkhov, V. (2021d). Theoretical Economics and the Second-Order Economic Theory. What is it? SSRN, WP 3975585, 1-14. https://ssrn.com/abstract=3975585 Odean,T. (1998). Volume, Volatility, Price, And Profit When All Traders Are Above Average, The Journal of Finance, LIII, (6), 1887-1934 Plerou, V., Gopikrishnan, P., Rosenow, B., Amaral, L.A.N. and H. E. Stanley, (2000). Econophysics: Financial time series from a statistical physics point of view, Physica A, 279 443-456 Podobnik, B., Horvatic, D., Petersena, A.M. and H. E. Stanleya, (2009). Cross-correlations between volume change and price change, Proceed. National Academy of Sci., US (PNAC), 106 (52), 22079–22084 Quinn, D.P. and H-J. Voth, (2008). A Century of Global Equity Market Correlations. American Economic Review, 98 (2), 535–540 Shephard, N.G. (1991). From Characteristic Function to Distribution Function: A Simple Framework for the Theory. Econometric Theory, 7 (4), 519-529 Shiryaev, A.N. (1999). Essentials Of Stochastic Finance: Facts, Models, Theory. World Sc. Pub., Singapore. 1-852 Woodward, W.A., Gray, H.L. and A. C. Elliott, (1917). Applied Time Series Analysis, R. Taylor & Francis Group, 1-752 |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/112003 |
All papers reproduced by permission. Reproduction and distribution subject to the approval of the copyright owners.
 |
View Item |
