Credit risk assessment of fixed income portfolios: an analytical approach (*)

Credit risk assessment of fixed income portfolios: an analytical approach (*) Bernardo PAGNONCELLI Business School Universidad Adolfo Ibanez Santiago, CHILE Arturo CIFUENTES CREM/ FEN University of CHILE Santiago, CHILE Primera Jornada de Regulación y Estabilidad Macrofinanciera January 2014 (*) Based on Credit Risk Assessment of Fixed Income Portfolios Using Explicit Expressions, Finance Research Letters, forthcoming.

A Brief History of an Interesting Problem • Regulatory Implications

Portfolio of Risky Assets • Issues: • How risky is this pool? • How much can I lose in a bad scenario? • How much should I put aside to cover potential losses? • Can it bring the company down? • Systemic risk? N assets Default Probability, p Correlation, ρ

Example Assume that the total notional amount is $ 100 each default results in a loss of $ 100/ 40 = $ 2.5 N = 50 p = 27% ρ = 18.36% $ 100 How risky is this portfolio ?

The naïve approach (assume no correlation) Corre (Yi, Yj) = 0 For all i, j Yi(i=1, …, N) is 1 or 0 (1 = default; 0 = no default) The number of defaults X is given by X=Y1+ …+ YN. X follows a binomial distribution with E(X)= Np and Var(X)= N p (1-p). The discrete probability density function is given by

Probability Number of Defaults E(X) = Np = 13.5 defaults Var(X) = N p (1-p) = 9.85

Other approaches (1) Still assume that ρ = 0 increase the value of p (more or less by pulling a number out of …), say by 20% and then hope that this trick will result in “conservative” results… N = 50 p = 27% ρ = 18.36% E(X) = Np = 16.2 defaults Var(X) = N p (1-p) = 10.89

Other approaches (2) N = 50 p = 27% ρ = 18.36% DS = 5 p = 27% ρ = 0 ≈ Replace the original portfolio with a portfolio that has zero correlation but a lower number of bonds (5 instead of 50 in this case)

Defaults Using A Normal Distribution Default Probability Default Index Assume P = 30% I = 0 I = 1

Monte Carlo Simulations [see Ref. 4]

Probability Number of Defaults The fat tails thing…

Finally: The Golden Formula if i=0 then δ = (1-p) ρ If i=N then δ = p ρ otherwise δ = 0 ρ = Corre(Yi, Yj) For all i, j E(X) = Np Var(X) = p (1-p) (N + ρ N (N-1))

Almost 5% Probability Number of Defaults It’s Not The Fat Tails Stupid !!! It’s The Bump At The End !!!

Probabilities Correct (Analytical) Distribution Number of Defaults Monte Carlo (with Correlation)

A Brief History of an Interesting Problem • Regulatory Implications

Example: A Typical Securitization Structure Cash flow allocation Assets Liabilities $ 70 $ 10 $ 20 $ 100 Portfolio A: p=12%; ρ=0.1; N=40 Recovery =40% each default = ($100/40) .6= a $1.5 loss Portfolio B: p=43%; ρ=0; N=45 Recovery =40% each default = ($100/45) .6= a $1.335 loss

Issue # 1: St Deviation matters !!! Cash flow allocation Assets Liabilities $ 70 $ 10 $ 20 Senior $ 100 Mezzanine Equity QUESTION: If you are going to buy the senior tranche, would you prefer portfolio (A) or (B) as collateral?

QUESTION: If you are going to buy the senior tranche, would you prefer portfolio (A) or (B) as collateral?

Issue # 2: Correlation is tricky !!! Is Correlation Good or Bad??

Issue # 3: Subordination does not always help !!! Portfolio A, Probability of each default scenario Probability Number of Defaults

Probabilities Very Low Probability Scenarios Number of Defaults $ 70 $ 10 $ 20 Senior 21 defaults; Loss= 21x $1.5= $31.5 Mezzanine Equity 14 defaults; Loss= 14x $1.5= $21

Credit risk assessment of fixed income portfolios: an analytical approach (*)