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WP/16/158
Measuring Concentration Risk A Partial Portfolio
Approach
by Pierpaolo Grippa and Lucyna Gornicka
2
© 2016 International Monetary Fund WP/16/158
IMF Working Paper
Monetary and Capital Markets Department
MEASURING CONCENTRATION RISK - A PARTIAL PORTFOLIO APPROACH
1
Prepared by Pierpaolo Grippa and Lucyna Gornicka
Authorized for distribution by Michaela Erbenova
August 2016
IMF Working Papers describe research in progress by the author(s) and are published
to elicit comments and to encourage debate. The views expressed in IMF Working Papers
are those of the author(s) and do not necessarily represent the views of the IMF, its Executive
Board, or IMF management.
ABSTRACT
Concentration risk is an important feature of many banking sectors, especially in emerging and
small economies. Under the Basel Framework, Pillar 1 capital requirements for credit risk do not
cover concentration risk, and those calculated under the Internal Ratings Based (IRB) approach
explicitly exclude it. Banks are expected to compensate for this by autonomously estimating and
setting aside appropriate capital buffers, which supervisors are required to assess and possibly
challenge within the Pillar 2 process. Inadequate reflection of this risk can lead to insufficient
capital levels even when the capital ratios seem high. We propose a flexible technique, based on
a combination of “full” credit portfolio modeling and asymptotic results, to calculate capital
requirements for name and sector concentration risk in banks’ portfolios. The proposed approach
lends itself to be used in bilateral surveillance, as a potential area for technical assistance on
banking supervision, and as a policy tool to gauge the degree of concentration risk in different
banking systems.
JEL Classification Numbers: E44, G21, G32
Keywords: concentration risk, Basel capital requirements, Pillar 2, Credit VaR.
Authors’ E-Mail Address: pgrippa@imf.org, lgornicka@imf.org.
1 The authors wish to thank Andre O. Santos for stimulating the initial work on which this paper is based, as well as
participants of two internal IMF seminars for their useful comments. We also thank Michaela Erbenova for her constant
support throughout this research project. We are grateful to Mr. Som-lok Leung (IACPM) for providing the IACPM-ISDA
dataset and useful instructions, and to Nirmaleen Jayawardane and Rebecca Shyam for their assistance.
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Content Page
I. Introduction ........................................................................................................................... 4
II. Concentration Risk in the Basel Capital Framework ........................................................... 6
A. The Asymptotic Single Risk Factor Approach ................................................................ 6
B. Name Concentration ......................................................................................................... 8
C. Sector Concentration ...................................................................................................... 10
D. Treatment of Concentration Risk under Basel II and Basel III ...................................... 10
III. A Partial Portfolio Approach to Concentration Risk ........................................................ 12
IV. Testing the Approach ........................................................................................................ 13
A. Application to a Synthetic Portfolio............................................................................... 13
B. Application to Semi-Hypothetical Portfolios ................................................................. 18
V. Conclusions ........................................................................................................................ 28
References ............................................................................................................................... 30
Figures
1. Partial Portfolio Approach: Credit VaR for Varying m ...................................................... 16
2. Granularity Adjustment of Partial Portfolio and G&L (2013) Methods............................. 17
3. Partial Portfolio Approach: Credit VaR for Varying m and Different LGD Assumptions 18
4. Share of Non-Granular Part of Loan Portfolios .................................................................. 20
5. Partial Portfolio Approach for Semi-Hypothetical Portfolios ............................................ 23
6. Granularity Adjustment: Partial Portfolio Approach and Gordy and Lütkebohmert ......... 24
7. Granularity Adjustment: Partial Portfolio Approach and HHI ........................................... 25
8. Distribution of Sectoral Adjustments Across the Semi-Hypothetical Portfolios................ 26
9. Sectoral Adjustment and Weighted Average Difference between MKMV and IRB-Based
Asset Correlation ............................................................................................................ 27
10. Sectoral Adjustments with and without Correlated Draws in the Simulation .................. 27
Tables
1. Characteristics of the IACPM-ISDA Portfolio ................................................................... 14
2. Regulatory Capital: Partial Portfolio Method versus IRB Model ....................................... 15
3. Characteristics of Semi-Hypothetical Portfolios ................................................................ 19
4. Bank Funding of Domestic Companies in Semi-Hypothetical Portfolios .......................... 19
Appendix ................................................................................................................................. 32
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I. INTRODUCTION
The concentration risk in banks’ credit portfolios arises mainly from two types of imperfect
diversification: “name” and sector concentrations (BCBS, 2006b). Name concentration
happens when the idiosyncratic risk cannot be perfectly diversified due to large (relative to
the size of the portfolio) exposures to individual borrowers. Sector concentration emerges
when the portfolio is not perfectly diversified across sectoral factors, corresponding to
systematic components of risk.
Concentration risk is relevant for the stability of both individual institutions and whole
financial systems. Exposures to large borrowers like Enron and WorldCom contributed to
financial problems of several U.S. banks in the early 2000s. A housing crisis combined with
concentrated mortgage portfolios resulted in a number of bank failures in Scandinavian
countries in the 1990s, and contributed to the global financial crisis of 2007/08.
The Internal Ratings Based approach (IRB) of the Basel capital framework is aimed at
capturing general credit risk, but does not incorporate explicitly the concentration risk. The
IRB formula is based on the Asymptotic Single Risk Factor (ASRF) model derived from the
Vasicek (2002) model, which is—in turn—an extension of the Merton (1974) model of
firms’ default. The ASRF model has the advantage of being portfolio-invariant, i.e., the
capital required for any given loan only depends on the risk of that loan, regardless of the
portfolio it is added to. From a regulatory perspective, this property allows the capital charge
to be estimated without the need to rely on credit portfolio models. The downside of the
model is that it ignores the concentration of exposures in real-world bank portfolios, as the
idiosyncratic risk is assumed to be fully diversified. Specifically, the capital charge derived
from the ASRF model is the same for banks with different levels of the concentration risk (all
other things equal). In Basel II and in Basel III the concentration risk is covered under Pillar
2, focused on interaction between banks’ own evaluations of their capital adequacy (ICAAP)
and supervisors’ subsequent review (SREP). Pillar 2 provides a general framework for
dealing with concentration risk (and other types of risk not captured by the ASRF model), but
banks and regulators have a large degree of freedom in choosing the quantitative tools to
measure the additional capital required to cover concentration risk.
Several model-based and simulation-based methods for calculating capital charges for
concentration risk have been proposed over the years. The model-based techniques, usually
use second-order approximations of generalized ASRF formulas, are generally conceptually
complex, and are based on analytical results that are strongly dependent on the assumptions
made. The simulation-based methods, while relatively straightforward in application, are
heavily computer-intensive: in order to obtain stable quantile loss estimates, millions of
Monte Carlo (MC) iterations are often needed.
In this paper we propose an alternative, “partial portfolio” approach, which tries to extract the
best features of the two “worlds” of realistic—but cumbersome—full-portfolio simulations
and parsimonious—but inflexible—ASRF approximations. Specifically, within a MC
simulation, we maintain the ASRF assumption of diversified idiosyncratic risk for the part of
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