Modelling Default Contagion Using Multivariate Phase-Type Distributions
Abstract
We model dynamic credit portfolio dependence by using default contagion
in an intensity-based framework. Two different portfolios (with 10 obligors), one in the
European auto sector, the other in the European financial sector, are calibrated against
their market CDS spreads and the corresponding CDS-correlations. After the calibration,
which are perfect for the banking portfolio, and good for the auto case, we study several
quantities of importance in active credit portfolio management. For example, implied
multivariate default and survival distributions, multivariate conditional survival distributions,
implied default correlations, expected default times and expected ordered defaults
times. The default contagion is modelled by letting individual intensities jump when
other defaults occur, but be constant between defaults. This model is translated into a
Markov jump process, a so called multivariate phase-type distribution, which represents
the default status in the credit portfolio. Matrix-analytic methods are then used to derive
expressions for the quantities studied in the calibrated portfolios.
University
Göteborg University. School of Business, Economics and Law
Institution
Department of Economics
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Date
2007-10-31Author
Herbertsson, Alexander
Keywords
Portfolio credit risk
intensity-based models
dynamic dependence modelling
CDS-correlation
default contagion
Markov jump processes
multivariate phase-type distributions
matrixanalytic methods
Publication type
report
ISSN
1403-2465
Series/Report no.
Working Papers in Economics
271
Language
eng