Skip to main content
Fachgebiete
Automobil + Motoren Bauwesen + Immobilien Business IT + Informatik Elektrotechnik + Elektronik Energie + Nachhaltigkeit Finance + Banking Management + Führung Marketing + Vertrieb Maschinenbau + Werkstoffe Versicherung + Risiko
DE
EN
Bücher
Zeitschriften
Themenseiten
Organisationspsychologie Projektmanagement Marketing Smart Manufacturing
Weitere Formate
Podcasts Webinare Technik Webinare Wirtschaft Kongresse Veranstaltungskalender Awards
Jetzt Einzelzugang starten
Zugang für Unternehmen
Referenzkunden
SLX-Digitalkonferenz: Zukunftswerkstatt 2024

Mehr Umsatz mit Top-Kontakten

Am 7. Mai erfahren Sie, wie Vertriebsteams Leadgenerierung, Leadnurturing und Leadstrategien effizient steuern können.
Erweiterte Suche
Anmelden
nach oben
Financial Markets and Portfolio Management
Erschienen in: Financial Markets and Portfolio Management 1/2021

15.10.2020

Testing for structural breaks in return-based style regression models

verfasst von: Yunmi Kim, Douglas Stone, Tae-Hwan Kim

Erschienen in: Financial Markets and Portfolio Management | Ausgabe 1/2021

Einloggen

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

search-config
loading …

Abstract

It is important for investors to know not only the style of a fund manager in which they are interested, but also whether this style is constant or changing through time. The style of a fund manager can be estimated by the so-called style regression, and a great deal of research has been carried out to investigate the statistical properties of style regression methods. However, there has been no formal and statistically valid method to test for a change in manager style when the two typically imposed restrictions (sum-to-one and non-negativity) are jointly present in style analysis. In this study, we apply and extend the results of Andrews (Econometrica 61:821–856, 1993; Estimation when a parameter is on a boundary: theory and application, Yale University, 1997a; A simple counterexample to the bootstrap, Yale University, 1997b; Econometrica 67:1341–1383, 1999; Econometrica 68:399–405, 2000) to develop a valid testing procedure for the possibility wherein the location of any possible change does not need to be specified and the case of multiple shifts is accommodated. When our proposed test is applied to the Fidelity Magellan Fund, it is revealed that the fund’s style changed at least twice between 1988 and 2017.
Vorheriger Artikel ICO investors
Nächster Artikel A literature review of new methods in empirical asset pricing: omitted-variable and errors-in-variable bias

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
Fußnoten
1
In this paper, we attempt to make distinguish between true parameters, estimators, and place holders. On one hand, two notations \( \beta_{0} \) and \( \beta^{*} \) are reserved to indicate the unknown & true parameters; the former \( \beta_{0} \) for the case of style regression without breaks and the latter \( \beta^{*} \) for the case of style regression with structural breaks. On the other hand, \( \tilde{\beta } \) is used to represent an estimator. Finally, \( \beta \) is employed as the place holder in any minimization problem.
 
2
The weighting matrix \( \varGamma \) is not necessarily deterministic. We can allow \( \varGamma \) to be a random matrix (denoted by \( \tilde{\varGamma }_{T} \)), which depends on both data and sample size as long as it converges in probability to a non-stochastic, positive-definite matrix. A common example for \( \tilde{\varGamma }_{T} \) is given by \( \tilde{\varGamma }_{T} = R\tilde{D}_{T} R^{\prime}, \) where \( \tilde{D}_{T} = \tilde{M}_{T}^{ - 1} \tilde{V}_{T} \tilde{M}_{T}^{ - 1} \) and \( \tilde{M}_{T} \), \( \tilde{V}_{T} \) are defined later. One can show that \( \tilde{\varGamma }_{T} \) converges to a non-stochastic, positive-definite matrix in probability. This particular weighting matrix is known to be the optimal weighting matrix in the case without non-negativity and sum-to-one restrictions. In the present analysis, this choice is not known to be optimal. Finding an optimal weighting matrix in this case to maximize power would be an interesting issue, which we leave for future research.
 
3
For example, suppose \( k = 3 \) and the 1st and 3rd elements of \( \beta^{*} \) are known to be zero. Then, the matrix \( Q \) is given by \( Q = \left[ {\begin{array}{*{20}c} { - 1} & 0 & 0 \\ 0 & 0 & { - 1} \\ \end{array} } \right] \).
 
4
We note that the bootstrap method may be considered to generate the sampling distribution of relevant test statistics. However, the bootstrap method does not work when some true parameters are on the boundary, which is documented in Andrews (1997b, 2000). In our framework, when some true style coefficients are zero, they are on the boundary so that the bootstrap method does not work in our framework.
 
5
The Russell 2000 index is an index measuring the performance of about 2000 smallest-cap American companies included in the Russell 3000 Index, which is made up of 3000 largest U.S. companies. These 3000 companies represent about 98% of all U.S incorporated equity securities. While the Russell 2000 Growth index tracks small-cap companies in the Russell 2000 index that exhibit growth characteristics (i.e., small-cap companies whose earnings are expected grow at an above-average rate relative to the market), the Russell 2000 Value index includes small-cap firms in the Russell 2000 index that are under-priced, measured by some criteria such as book-to-price ratio. The Russell 1000 index includes the top 1000 large-cap stocks included in the Russell 3000 Value index. Both the Russell 1000 Growth index and the Russell 1000 Value index are constructed in an analogous way as in their Russell 2000 counterparts.
 
6
All data supporting the findings of this study have been downloaded from Yahoo Finance (https://​finance.​yahoo.​com/​quote/​FMAGX/​history?​p=​FMAGX) and are also available from the corresponding author (T.-H. Kim) upon request.
 
7
All the results in this section are robust to the choice of random seed.
 
Literatur
Andrews, D.W.K.: Tests for parameter instability and structural change with unknown change point. Econometrica 61, 821–856 (1993)CrossRef
Andrews, D.W.K.: Estimation when a parameter is on a boundary: theory and application. Cowles Foundation Discussion Paper, Yale University (1997a)
Andrews, D.W.K.: A simple counterexample to the bootstrap. Cowles Foundation Discussion Paper, Yale University (1997b)
Andrews, D.W.K.: Estimation when a parameter is on a boundary. Econometrica 67, 1341–1383 (1999)CrossRef
Andrews, D.W.K.: Inconsistency of the bootstrap when a parameter is on the boundary of the parameter space. Econometrica 68, 399–405 (2000)CrossRef
Annaert, J., Van Campenhout, G.: Time variation in mutual fund style exposures. Rev. Finance 11, 633–661 (2007)CrossRef
Bai, J.: Estimating multiple breaks one at a time. Econom. Theory 13, 315–352 (1997)CrossRef
Bai, J., Perron, P.: Estimating and testing linear models with multiple structural changes. Econometrica 66, 47–78 (1998)CrossRef
Bai, J., Perron, P.: Computation and analysis of multiple structural change Models. J. Appl. Econom. 18, 1–22 (2003)CrossRef
Bodson, L., Coen, A., Hubner, G.: Dynamic hedge fund style analysis with errors-in-variables. J. Financ. Res. 33, 201–221 (2010)CrossRef
Chow, G.C.: Tests of equality between sets of coefficients in two linear regressions. Econometrica 28, 591–605 (1960)CrossRef
Darolles, S., Vaissie, M.: The alpha and omega of fund of hedge fund added value. J. Bank. Finance 36, 1067–1078 (2012)CrossRef
DeRoon, F.A., Nijman, T.E., TerHorst, J.R.: Evaluating style analysis. J. Empir. Finance 11, 29–53 (2004)CrossRef
Gallo, J.G., Lockwood, L.J.: Fund management changes and equity style shifts. Financ. Anal. J. 55, 44–52 (1999)CrossRef
Hawkins, D.L.: A test for a change point in a parametric model based on a maximal wald-type statistic. Sankhya 49, 368–376 (1987)
Kim, H.J., Siegmund, D.: The likelihood ratio test for a change-point in simple linear regression. Biometrika 76, 409–423 (1989)CrossRef
Kim, M., Shukla, R., Thomas, M.: Mutual fund objective misclassification. J. Econ. Bus. 52, 309–323 (2000)CrossRef
Kim, T.-H., White, H., Stone, D.: Asymptotic and Bayesian confidence intervals for sharpe-style weights. J. Financ. Econ. 3, 1–29 (2005)CrossRef
Marques, R., Pizzinga, A., Vereda, L.: Restricted Kalman filter applied to dynamic style analysis of actuarial funds. Appl. Stoch. Models Bus. Ind. 28, 558–570 (2012)CrossRef
Posthuma, N., Van Der Sluis, P.J.: Analysing style drift in hedge funds. In: Gregoriou, G.N., Hubner, G., Papageorgiou, N., Rouah, D. (eds.) Hedge Funds: Insights in Performance Measurement, Risk Analysis, and Portfolio Allocation, pp. 83–104. Wiley, London (2005)
Sharpe, W.F.: (1988) Determining a fund’s effective asset mix. In: Investment Management Review, Nov/Dec, pp. 59–69
Sharpe, W.F.: Asset allocation: management style and performance measurement. J. Portf. Manag. 18, 7–19 (1992)CrossRef
Swinkels, L., Van Der Sluis, P.: Return-based style analysis with time-varying exposures. Working Paper, Tilburg University (2001)
Swinkels, L., Van Der Sluis, P.: Return-based style analysis with time-varying exposures. Eur. J. Finance 12, 529–552 (2006)CrossRef
White, H.: Asymptotic Theory for Econometricians. Academic Press, San Diego (1984)
Metadaten
Titel
Testing for structural breaks in return-based style regression models
verfasst von
Yunmi Kim
Douglas Stone
Tae-Hwan Kim
Publikationsdatum
15.10.2020
Verlag
Springer US
Erschienen in
Financial Markets and Portfolio Management / Ausgabe 1/2021
Print ISSN: 1934-4554
Elektronische ISSN: 2373-8529
DOI
https://doi.org/10.1007/s11408-020-00364-2

Weitere Artikel der Ausgabe 1/2021

Financial Markets and Portfolio Management 1/2021 Zur Ausgabe

OriginalPaper

A literature review of new methods in empirical asset pricing: omitted-variable and errors-in-variable bias

OriginalPaper

ICO investors

Book Review

Antony Lewis: The basics of bitcoins and blockchains

Report

Report of the Editor 2020

OriginalPaper

A comprehensive investigation into style momentum strategies in China