Basel II - Credit risk | Vose Software

Basel II - Credit risk

 

Background

To protect depositors and the financial system overall, the 1998 Capital Accord ('Basel I') placed restrictions on the exposure a bank could have in relation to its capital (see Capital_required.xls for a simple illustration of how to calculate capital requirements for a non-financial firm). In other words, it restricted how much a bank could lend in total with the goal to decrease the probability that, in an extreme downturn of the economy, depositors would lose their money and (since banks often lend to other banks) the banking system would collapse (i.e. systematic risk).

Basel II comprises three mutually reinforcing pillars:

  • Pillar 1: The Minimum Capital Requirements (the part we will focus on);

  • Pillar 2: The Supervisory review - about the dialogue between banks and their supervisors;

  • Pillar 3: About the disclosure requirements.

Pillar 1 says that the Capital Ratio, defined as below, should be no less than 8%:

Capital Ratio = Capital a bank has available / Risk-weighted assets ≥ 8%

Because the 1998 Capital Accord took a relatively unsophisticated view of the risk-weighted assets, the Basel Committee developed a more sophisticated risk sensitive framework, called Basel II. In Basel II the risk-weighted assets will explicitly include three types of risk:

  1. Credit Risk (new treatment under Basel II)

  2. Market Risk (in 1996, an amendment was made to the treatment of market risk)

  3. Operational Risk (newly introduced in Basel II)

In this section, we will focus on Credit Risk. Basel II gives banks the freedom to choose from three distinct options for the calculation of credit risk and three others for operational risk. For credit risk, they are:

  1. The Standardised Approach;

  2. The Foundation Internal Ratings Based (IRB) approach;

  3. The Advanced IRB approach.

The Standardised Approach makes use of external credit assessments to determine the weightings and to calculate the total risk-weighted assets. In this section, we will focus on the Internal Rating Based approaches (second and third method) of the credit risk approach, since they include an internal risk assessment of the company. The primary inputs to the risk-weighted asset calculations, are:

  1. Probability of Default (PD) - measures the likelihood that the borrower will default over a given time horizon;

  2. Loss Given Default (LGD) - measures the proportion of the exposure that will be lost if a default occurs;

  3. Exposure At Default (EAD) - measures the amount of the facility that is likely to be drawn if a default occurs.

The EAD depends on the insurance and hedging activities of the bank (they will be left out of this example; see Integrated_Risk_Management.xls for an example of this). Banks will have to categorize their risk assets into risk classes, and for each class estimate the probability of default (PD) and the expected loss given default (LGD).

Relevance

In this example, which is based on the BIS working paper of Altman et al. (2002), we look at a very important assumption about credit risk, i.e. the relationship between the PD and the LGD. In other words, if macro-economic factors increase the PD (e.g. during a recession), does the LGD stay the same, go up or go down. It is often thought that if the PD goes up, the LGD will go up too. Most credit models currently used assume no relationship between the two variables. In this example, we will examine the effect of this assumption on estimates of credit risk models, such as expected (average) losses and VaR - 99%.

Situation

You are working for a bank that has a portfolio of 250 loans (see graph below), ranging from $1,000 to $15,000 and belonging to seven different rating grades with long-term (historic) probability of default (PD) levels ranging from 0.5% to 5%.

 

The short term PD is, however, influence by a macro-economic factor, x1, that is equal to all loans (with weight w1 equal to 50%) and an idiosyncratic (random) factor x2, unique for every loan (with w2 equal to 50%), such that:

PDshort = PDlong * (w1x1 + w2x2)

The two weights w1 and w2 always have to add up to 100%, i.e. w2 = 1 - w1. Both factors x1 and x2 are modelled as Exponential (1) distributions [same as Gamma (1, 1) distributions, see section Gamma distribution] that have a mean of one. An Exponential distribution was assumed since it is highly skewed to the right, representing the situation that default probabilities (PD's) are low most of the time but sometimes, during rare/extreme situations, can increase dramatically.

Three scenarios

Scenario 1. Assume that the LGD is deterministic; 30% for all borrowers

Scenario 2. Assume the LGD is stochastic but uncorrelated with the probability of default PD. Use a Beta (9, 21), which results in a mean LGD of 30% (see section on Beta Distribution)

Scenario 3. Assume there is a perfect rank order correlation (see Rank Order Correlation) between the macro-economic background factor, x1, and the LGD.

Question

What are the losses and their distribution parameters under the three different scenarios?

Results

The solution to this example is provided in the following spreadsheet - Basel_II.xls

The resulting distributions of the losses of the portfolio are shown in the graph and figure below. Although there is no real difference between scenario 1 and 2, the expected losses and the unexpected losses (VaR) under scenario 3 are considerably higher.

 

Table 1. Main results under the three scenarios

 

LGD modelled according to approach

Scenario 1

 Scenario 2

 Scenario 3

% error1

Expected losses

13603

13617

16566

 21.8%

95% VaR

31376

31706

51573

64.4%

99% VaR

43756

44998

86858

 98.5%

99.5% VaR

49053

50085

101242

106.4%

99.9% VaR

63762

64044

148833

133.4%

1 computed as [(scenario 1 - scenario 2)/scenario 1]

Conclusion

This relatively simple exercise illustrates that the relationship between the PD and the LGD is very important to estimate credit risk. If in reality PD and LGD are both driven by some common (e.g. macro economic) forces and therefore are correlated, not only the expected but also the unexpected losses (VaR) in most portfolio credit risk models, will have been seriously underestimated if the correlation is ignored.

See Also

 

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