Olkhov, Victor (2025): Market-Based Portfolio Variance.
![[thumbnail of MPRA_paper_125083.pdf]](https://mpra.ub.uni-muenchen.de/style/images/fileicons/application_pdf.png "MPRA_paper_125083.pdf") |
PDF
MPRA_paper_125083.pdf Download (438kB) |
Abstract
The investor, who holds his portfolio and doesn’t trade his shares, at current time can use the time series of the market trades that were made during the averaging interval with the securities of his portfolio to assess the current variance of the portfolio. We show how the time series of trades with the securities of the portfolio determine the time series of trades with the portfolio as a single market security. The time series of portfolio trades determine the return and variance of the portfolio in the same form as the time series of trades with securities determine their returns and variances. The description of any portfolio and any single market security is equal. The time series of portfolio trades define the decomposition of the portfolio variance by its securities. If the volumes of trades with all securities are assumed constant, the decomposition of the portfolio variance coincides with Markowitz’s (1952) expression of variance. However, the real markets expose random volumes of trades. The portfolio variance that accounts for the randomness of trade volumes is a polynomial of the 4th degree in the variables of relative amounts invested into securities and with the coefficients different from covariances of securities returns. We discuss the possible origin of the latent and unintended assumption that Markowitz (1952) made to derive his result. Our description of the portfolio variance that accounts for the randomness of real trade volumes could help the portfolio managers and the majors like BlackRock’s Aladdin and Asimov, JP Morgan, and the U.S. Fed to adjust their models and forecasts to the reality of random markets.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Market-Based Portfolio Variance |
| English Title: | Market-Based Portfolio Variance |
| Language: | English |
| Keywords: | portfolio variance; portfolio theory; random trade volumes |
| Subjects: | G - Financial Economics > G1 - General Financial Markets > G11 - Portfolio Choice ; Investment Decisions |
| Item ID: | 125083 |
| Depositing User: | Victor Olkhov |
| Date Deposited: | 22 Jun 2025 06:07 |
| Last Modified: | 22 Jun 2025 06:07 |
| References: | Berkowitz, S., Logue, D. and E. Noser, Jr., (1988), The Total Cost of Transactions on the NYSE, The Journal of Finance, 43, (1), 97-112 Boyd, S., Johansson, K., Kahn, R., Schiele, P. and T. Schmelzer, (2024), Markowitz Portfolio Construction at Seventy, Journal Portfolio Management, Special Issue Dedicated to Harry Markowitz, 50, ( 8), 117 - 160 Cochrane, J., (2014), A Mean-Variance Benchmark for Intertemporal Portfolio Theory, The Journal of Finance, 69(1), 1-49 Duffie, D. and P. Dworczak, (2021), Robust Benchmark Design, Journal of Financial Economics, 142(2), 775–802 Elton, E., Gruber, M., Brown, S. and W. Goetzmann, 2014, Modern portfolio theory and investment analysis (9-th Ed., Wiley&Sons, Inc.). Goyenko, R., Kelly B.T., Moskowitz, J., Su, Y. and C. Zhang, (2024), Trading Volume Alpha, NBER, Cambridge, MA 02138, WP 33037, 1-53 Lo, A.W. and J. Wang, (2001), Trading Volume: Implications Of An Intertemporal Capital Asset Pricing Model, NBER, Cambridge, MA 02138, WP 8565, 1-65 Karpoff, J. (1986), A Theory of Trading Volume, Jour. Finance, 41, (5), 1069-87 Markowitz, H., (1952), Portfolio Selection, Journal of Finance, 7(1), 77-91 Markowitz, H., (1991), Foundations of portfolio theory, Les Prix Nobel 1990, 292 Olkhov, V., (2022), Market-Based Asset Price Probability, SSRN WPS 4110345, 1-18 Olkhov, V., (2023), Market-Based Probability of Stock Returns, SSRN, WPS 4350975, 1-17 Olkhov, V., (2025), Market-Based Correlations Between Prices and Returns of Two Assets, SSRN WPS 4350975, 1-23 Pogue, G.A., (1970), An Extension of the Markowitz Portfolio Selection Model to Include Variable Transaction’s Costs, Short Sales, Leverage policies and Taxes, Jour. Finance, 25(5), 1005-1027 Rubinstein, M., (2002), Markowitz's "Portfolio Selection": A Fifty-Year Retrospective, Jour. Finance, 57(3), 1041-1045 Samuelson, P., (1970), The Fundamental Approximation Theorem of Portfolio Analysis in terms of Means, Variances and Higher Moments, Rev. Economic Studies, 37(4), 537-542 Shiryaev, A., (1999), Essentials of Stochastic Finance: Facts, Models, Theory, W.Sci.Publ. Singapore Shreve, S., (2004), Stochastic calculus for finance, Springer finance series, NY, USA |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/125083 |
All papers reproduced by permission. Reproduction and distribution subject to the approval of the copyright owners.
 |
View Item |
