NO.PZ2023101601000091
问题如下:
A CRO at an investment bank has
asked the risk department to evaluate the bank’s 3-year derivative exposure
position with a counterparty. The 1-year CDS on the counterparty is currently
trading at a spread of 180 bps. The table below presents trade and forecast
data on the CDS spread, the expected exposure, and the recovery rate on the
counterparty:
Additionally, the
CRO has presented the risk team with the following set of assumptions to use in
conducting the analysis:
•
Counterparty’s default
probabilities follow a constant hazard rate process
•
The investment bank and the
counterparty have signed a credit support annex (CSA) to cover this exposure,
which requires collateral posting of AUD 13 million over the life of the
contract
•
The current risk-free rate of
interest is 2% and the term structure of interest rates will remain flat over
the 3-year horizon
•
Collateral and exposure values
will remain stable over the life of the contract
Given the
information and the assumptions above, what is the correct estimate for the
credit valuation adjustment for this position?
选项:
A.
AUD 0.140
million
B.
AUD 0.863
million
C.
AUD 1.291
million
D.
AUD 2.514
million
解释:
To derive the credit
valuation adjustment (CVA), we use the standard formula:
Where (at any time
t),
• The discount factor
(DFt) is determined from the risk-free rate of 2%; and
• The hazard rate =
Spread/(1 – RR) = (180/10,000)/(1 – 0.85) = 12% (true for years 2 and 3);
• The probability of
default is derived from its relationship with the constant hazard rate (λ) ,
PD(t)=1-exp(-λt).
For instance,
PD(1)=1-exp(-0.12*1)=11.31% (Marginal probability (PD1))
PD(2)=1-exp(-0.12*2)
= 21.34%; Marginal probability (PD2)=21.34%-11.31%=10.03%
PD(3)=1-exp(-0.12*3)
= 30.23%; Marginal probability (PD3)=30.23%-21.34%=8.89%
• Collateral amounts
of AUD 13 million for year 2 and AUD 13 million for year 3 are considered.
Hence, the rest of
the derivation becomes:
(Expected Exposure,
Collateral, and CVA in AUD million)
epe*spread
