nach oben

Finance and Stochastics

Erschienen in:

01.04.2013

Time-consistent mean-variance portfolio selection in discrete and continuous time

verfasst von: Christoph Czichowsky

Erschienen in: Finance and Stochastics | Ausgabe 2/2013

Einloggen

Aktivieren Sie unsere intelligente Suche, um passende Fachinhalte oder Patente zu finden.

search-config

KI-gestützte Suche

Aus

Abstract

It is well known that mean-variance portfolio selection is a time-inconsistent optimal control problem in the sense that it does not satisfy Bellman’s optimality principle and therefore the usual dynamic programming approach fails. We develop a time-consistent formulation of this problem, which is based on a local notion of optimality called local mean-variance efficiency, in a general semimartingale setting. We start in discrete time, where the formulation is straightforward, and then find the natural extension to continuous time. This complements and generalises the formulation by Basak and Chabakauri (2010) and the corresponding example in Björk and Murgoci (2010), where the treatment and the notion of optimality rely on an underlying Markovian framework. We justify the continuous-time formulation by showing that it coincides with the continuous-time limit of the discrete-time formulation. The proof of this convergence is based on a global description of the locally optimal strategy in terms of the structure condition and the Föllmer–Schweizer decomposition of the mean-variance trade-off. As a by-product, this also gives new convergence results for the Föllmer–Schweizer decomposition, i.e., for locally risk-minimising strategies.

Nächster Artikel Market selection with learning and catching up with the Joneses

Sie haben noch keine Lizenz? Dann Informieren Sie sich jetzt über unsere Produkte:

Springer Professional "Wirtschaft+Technik"

Online-Abonnement

Mit Springer Professional "Wirtschaft+Technik" erhalten Sie Zugriff auf:

über 102.000 Bücher
über 537 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Finance + Banking
Management + Führung
Marketing + Vertrieb
Maschinenbau + Werkstoffe
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

Jetzt informieren

Springer Professional "Wirtschaft"

Online-Abonnement

Mit Springer Professional "Wirtschaft" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 340 Zeitschriften

aus folgenden Fachgebieten:

Bauwesen + Immobilien
Business IT + Informatik
Finance + Banking
Management + Führung
Marketing + Vertrieb
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

Jetzt informieren

Nur mit Berechtigung zugänglich

Albert, A.: Regression and the Moore–Penrose Pseudoinverse. Mathematics in Science and Engineering. Academic Press, San Diego (1972) MATH

Basak, S., Chabakauri, G.: Dynamic mean-variance asset allocation. Rev. Financ. Stud. 23, 2970–3016 (2010) CrossRef

Björk, T., Murgoci, A.: A general theory of Markovian time inconsistent stochastic control problems. Preprint, Stockholm School of Economics, September 2010. http://ssrn.com/abstract=1694759

Björk, T., Murgoci, A., Zhou, X.Y.: Mean variance portfolio optimization with state dependent risk aversion. Math. Finance (to appear). Available at http://onlinelibrary.wiley.com/doi/10.1111/j.1467-9965.2011.00515.x/pdf

Bouchard, B., Elie, R., Touzi, N.: Discrete-time approximation of BSDEs and probabilistic schemes for fully nonlinear PDEs. In: Albrecher, H., Runggaldier, W., Schachermayer, W. (eds.) Advanced Financial Modelling. Radon Ser. Comput. Appl. Math., vol. 8, pp. 91–124. Walter de Gruyter, Berlin (2009) CrossRef

Briand, P., Delyon, B., Mémin, J.: Donsker-type theorem for BSDEs. Electron. Commun. Probab. 6, 1–14 (2001) (electronic) MATHCrossRef

Briand, P., Delyon, B., Mémin, J.: On the robustness of backward stochastic differential equations. Stoch. Process. Appl. 97, 229–253 (2002) MATHCrossRef

Campbell, J., Viceira, L.: Strategic Asset Allocation: Portfolio Choice for Long-Term Investors. Oxford University Press, London (2002) CrossRef

Choulli, T., Krawczyk, L., Stricker, C.: \(\mathcal{E}\)-martingales and their applications in mathematical finance. Ann. Probab. 26, 853–876 (1998) MathSciNetMATHCrossRef

10.

Choulli, T., Stricker, C.: Deux applications de la décomposition de Galtchouk–Kunita–Watanabe. In: Azéma, J., Yor, M., Emery, M. (eds.) Séminaire de Probabilités, XXX. Lecture Notes in Math., vol. 1626, pp. 12–23. Springer, Berlin (1996) CrossRef

11.

Choulli, T., Vandaele, N., Vanmaele, M.: The Föllmer–Schweizer decomposition: Comparison and description. Stoch. Process. Appl. 120, 853–872 (2010) MathSciNetMATHCrossRef

12.

Cui, X., Li, D., Wang, S., Zhu, S.: Better than dynamic mean-variance: time inconsistency and free cash flow stream. Math. Finance 22, 346–378 (2012) MathSciNetMATHCrossRef

13.

Czichowsky, C., Schweizer, M.: Cone-constrained continuous-time Markovitz problems. NCCR FINRISK working paper No. 683, ETH Zurich, June 2012. To appear in Annals of Applied Probability, available at http://www.nccr-finrisk.uzh.ch/wps.php?action=query&id=683

14.

Czichowsky, C., Schweizer, M.: Closedness in the semimartingale topology for spaces of stochastic integrals with constrained portfolios. In: Donati-Martin, C., Lejay, A., Rouault, A. (eds.) Séminaire de Probabilités XLIII. Lecture Notes in Math., vol. 2006, pp. 413–436. Springer, Berlin (2011) CrossRef

15.

Delbaen, F., Monat, P., Schachermayer, W., Schweizer, M., Stricker, C.: Weighted norm inequalities and hedging in incomplete markets. Finance Stoch. 1, 181–227 (1997) MATHCrossRef

16.

Delbaen, F., Schachermayer, W.: The existence of absolutely continuous local martingale measures. Ann. Appl. Probab. 5, 926–945 (1995) MathSciNetMATHCrossRef

17.

Delbaen, F., Schachermayer, W.: The Mathematics of Arbitrage. Springer Finance. Springer, Berlin (2006) MATH

18.

Dellacherie, C., Meyer, P.A.: Probabilities and Potential B. Theory of Martingales. North-Holland, Amsterdam (1982) MATH

19.

Ekeland, I., Lazrak, A.: Being serious about non-commitment: subgame perfect equilibrium in continuous time, Apr. 2006. http://arxiv.org/abs/math/0604264v1

20.

Ekeland, I., Lazrak, A.: Equilibrium policies when preferences are time inconsistent, Aug. 2008. http://arxiv.org/abs/0808.3790v1

21.

Ekeland, I., Pirvu, T.A.: Investment and consumption without commitment. Math. Financ. Econ. 2, 57–86 (2008) MathSciNetMATHCrossRef

22.

Ekeland, I., Pirvu, T.A.: On a non-standard stochastic control problem, June 2008. http://arxiv.org/abs/0806.4026v1

23.

Emery, M.: Compensation de processus à variation finie non localement intégrables. In: Azéma, J., Yor, M. (eds.) Séminaire de Probabilités, XIV. Lecture Notes in Math., vol. 784, pp. 152–160. Springer, Berlin (1980)

24.

Fleming, W.H., Soner, H.M.: Controlled Markov Processes and Viscosity Solutions, 2nd edn. Stochastic Modelling and Applied Probability, vol. 25, Springer, New York (2006) MATH

25.

Föllmer, H., Schweizer, M.: The minimal martingale measure. In: Cont, R. (ed.) Encyclopedia of Quantitative Finance, pp. 1200–1204. Wiley, New York (2010)

26.

Jacod, J., Méléard, S., Protter, P.: Explicit form and robustness of martingale representations. Ann. Probab. 28, 1747–1780 (2000) MathSciNetMATHCrossRef

27.

Jacod, J., Shiryaev, A.N.: Limit Theorems for Stochastic Processes, 2nd edn. Grundlehren der Mathematischen Wissenschaften, vol. 288. Springer, Berlin (2003) MATHCrossRef

28.

Kallsen, J.: A utility maximization approach to hedging in incomplete markets. Math. Methods Oper. Res. 50, 321–338 (1999) MathSciNetMATHCrossRef

29.

Kallsen, J.: Derivative pricing based on local utility maximization. Finance Stoch. 6, 115–140 (2002) MathSciNetMATHCrossRef

30.

Kallsen, J.: σ-localization and σ-martingales. Theory Probab. Appl. 48, 152–163 (2004) MathSciNetCrossRef

31.

Kardaras, C., Platen, E.: Multiplicative approximation of wealth processes involving no-short-sale strategies via simple trading. Math. Finance (2012, to appear). Available at http://onlinelibrary.wiley.com/doi/10.1111/j.1467-9965.2011.00511.x/pdf

32.

Li, D., Ng, W.-L.: Optimal dynamic portfolio selection: multiperiod mean-variance formulation. Math. Finance 10, 387–406 (2000) MathSciNetMATHCrossRef

33.

Maccheroni, F., Marinacci, M., Rustichini, A., Taboga, M.: Portfolio selection with monotone mean-variance preferences. Math. Finance 19, 487–521 (2009) MathSciNetMATHCrossRef

34.

Markowitz, H.: Portfolio selection. J. Finance 7, 77–91 (1952)

35.

Monat, P., Stricker, C.: Föllmer–Schweizer decomposition and mean-variance hedging for general claims. Ann. Probab. 23, 605–628 (1995) MathSciNetMATHCrossRef

36.

Mossin, J.: Optimal multiperiod portfolio policies. J. Bus. 41, 215–229 (1968) CrossRef

37.

Musiela, M., Zariphopoulou, T.: Investments and forward utilities. Technical report (2006). Available at http://www.oxford-man.ox.ac.uk/~zariphop/pdfs/tz-technicalreport-4.pdf

38.

Musiela, M., Zariphopoulou, T.: The backward and forward dynamic utilities and their associated pricing systems: the case study of the binomial model. Technical report (2003). Available at http://www.math.utexas.edu/users/zariphop/pdfs/tz-technicalreport-7.pdf

39.

Nutz, M.: The Bellman equation for power utility maximization with semimartingales. Ann. Appl. Probab. 22, 363–406 (2012) MathSciNetMATHCrossRef

40.

Pham, H., Rheinländer, T., Schweizer, M.: Mean-variance hedging for continuous processes: new proofs and examples. Finance Stoch. 2, 173–198 (1998) MathSciNetMATHCrossRef

41.

Protter, P.E.: Stochastic Integration and Differential Equations, 2nd edn. Stochastic Modelling and Applied Probability, vol. 21. Springer, Berlin (2005). Version 1 CrossRef

42.

Richardson, H.R.: A minimum variance result in continuous trading portfolio optimization. Manag. Sci. 35, 1045–1055 (1989) MATHCrossRef

43.

Schweizer, M.: Hedging of options in a general semimartingale model. Diss. ETH Zürich 8615 (1988)

44.

Schweizer, M.: Approximating random variables by stochastic integrals. Ann. Probab. 22, 1536–1575 (1994) MathSciNetMATHCrossRef

45.

Schweizer, M.: On the minimal martingale measure and the Föllmer–Schweizer decomposition. Stoch. Anal. Appl. 13, 573–599 (1995) MathSciNetMATHCrossRef

46.

Schweizer, M.: A guided tour through quadratic hedging approaches. In: Jouini, É., Cvitanić, J., Musiela, M. (eds.) Option Pricing, Interest Rates and Risk Management. Handb. Math. Finance, pp. 538–574. Cambridge University Press, Cambridge (2001)

47.

Schweizer, M.: Local risk-minimization for multidimensional assets and payment streams. In: Stettner, Ł. (ed.) Advances in Mathematics of Finance. Banach Center Publ., vol. 83, pp. 213–229. Polish Acad. Sci. Inst. Math., Warsaw (2008) CrossRef

48.

Schweizer, M.: Mean-variance hedging. In: Cont, R. (ed.) Encyclopedia of Quantitative Finance, pp. 1177–1181. Wiley, New York (2010)

49.

Strotz, R.: Myopia and inconsistency in dynamic utility maximization. Rev. Econ. Stud. 23, 165–180 (1956)

50.

Sun, W.G., Wang, C.F.: The mean-variance investment problem in a constrained financial market. J. Math. Econ. 42, 885–895 (2006) MATHCrossRef

Titel: Time-consistent mean-variance portfolio selection in discrete and continuous time
verfasst von: Christoph Czichowsky
Publikationsdatum: 01.04.2013
Verlag: Springer-Verlag
Erschienen in: Finance and Stochastics / Ausgabe 2/2013
Print ISSN: 0949-2984
Elektronische ISSN: 1432-1122
DOI: https://doi.org/10.1007/s00780-012-0189-9

Springer Professional

Abstract

Bitte loggen Sie sich ein, um Zugang zu Ihrer Lizenz zu erhalten.

Sie haben noch keine Lizenz? Dann Informieren Sie sich jetzt über unsere Produkte:

Springer Professional "Wirtschaft+Technik"

Springer Professional "Wirtschaft"

Weitere Artikel der Ausgabe 2/2013

Bounds for the sum of dependent risks and worst Value-at-Risk with monotone marginal densities

Discretely sampled variance and volatility swaps versus their continuous approximations

The dual optimizer for the growth-optimal portfolio under transaction costs

Market selection with learning and catching up with the Joneses

Optimal consumption and investment for markets with random coefficients

Exercise boundary of the American put near maturity in an exponential Lévy model