Publication Date:
2014
Abstract:
In this paper we analyse a case study based on the procedure introduced by De Luca and Zuccolotto (2011), whose aim is to
cluster time series of financial returns in groups
being homogeneous in the sense that their joint bivariate distributions exhibit high association
in the lower tail. The dissimilarity measure used for such clustering is based on tail dependence coefficients estimated using copula
functions. We carry out the clustering using an algorithm requiring a preliminary transformation of the dissimilarity index into a distance metric by means of a geometric representation of the time series, obtained with Multidimensional Scaling. We show that the results of the clustering can be used for a portfolio selection purpose, when the goal is to protect investments from the effects of a financial crisis.
cluster time series of financial returns in groups
being homogeneous in the sense that their joint bivariate distributions exhibit high association
in the lower tail. The dissimilarity measure used for such clustering is based on tail dependence coefficients estimated using copula
functions. We carry out the clustering using an algorithm requiring a preliminary transformation of the dissimilarity index into a distance metric by means of a geometric representation of the time series, obtained with Multidimensional Scaling. We show that the results of the clustering can be used for a portfolio selection purpose, when the goal is to protect investments from the effects of a financial crisis.
CRIS type:
2.1 Contributo in volume (Capitolo o Saggio)
Keywords:
Time series clustering; Tail dependence; Copula function; Portfolio selection
List of contributors:
Giovanni De, Luca; Zuccolotto, Paola
Book title:
Mathematical and Statistical Methods for Actuarial Sciences and Finance