CS代考 WORTH 15 MARKS. – cscodehelp代写
SCHOOL OF MATHEMATICAL AND COMPUTER SCIENCES Department of Actuarial Mathematics and Statistics
CREDIT RISK MODELLING Semester 2 2015/16
Duration: Two Hours Total marks: 60
THERE ARE 5 QUESTIONS, EACH WORTH 15 MARKS.
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ANSWER 4 QUESTIONS.
IF YOU ANSWER 5, CREDIT WILL BE GIVEN FOR THE 4 BEST ANSWERS.
“Formulae and Tables for Actuarial Examinations” and electronic calculators approved by the University may be used.
1. In this question you may assume that, in the Black-Scholes-Merton geometric Brownian motion model, the values of European call and put options written on a stock, with maturity T and strike K are given by
CBS(t,St;r, ,K,T) = St (dt,1) Ke r(T t) (dt,2) PBS(t,St;r, ,K,T) = Ke r(T t) ( dt,2) St ( dt,1),
where (St ) denotes the stock price process, is the stock volatility, r is the interest
dt,1 = and dt,2 = dt,1 pT t.
St ⌘+ 1 2(T t) K exp( r(T t)) 2
(a) In Merton’s model the debt of the firm takes the form of a zero-coupon bond with face value B and maturity T. Explain clearly why the equity and debt may be viewed as contingent claims on the total assets (Vt ) of the firm.
[3 marks] Supposethat(Vt)ismodelledbyageometricBrownianmotionwithdriftμV and
volatility V .
(b) Give a valuation formula for the equity of the firm.
(c) Show that the valuation formula for the debt of the firm is given by
Bt =p0(t,T)B (dt,2)+Vt ( dt,1),
where you should define p0(t, T ) and redefine dt,1 and dt,2 in an appropriate
way for the setting of Merton’s model.
(d) Derive a formula for the credit spread of a bond issued by the company in Merton’s model.
(e) The credit spread depends only on a measure of leverage, asset volatility and time to maturity. Define the measure of leverage and state whether the spread increases or decreases with leverage.
[Total 15 Marks]
PLEASE TURN OVER 1
2. This question concerns the pricing of a defaultable zero-coupon bond using the martingale modelling approach. The bond pays 1 unit at maturity T and the default time ⌧ of the bond is modelled using a hazard rate model under the risk- neutral measure Q. The interest rate is assumed to be given by a deterministic function r(t).
In answering the question you may use the fact that, for an integrable random
variable X ,
where Ht = ({I{⌧s} : s t}) is the information available to an investor at time t.
(a) Explain the difference between a survival claim and a payment-at-default claim.
(b) Derive a formula for the value of a payment-at-default claim in terms of the deterministic hazard function Q(t) under the risk-neutral measure and the interest rate r(t).
(c) Hence show that the risk-neutral price of the bond under the recovery-of- face-value (RF) recovery model is given by
✓✓ZT◆ZT✓Zs◆◆ p1(t,T)=I{⌧>t} exp R(s)ds +(1 ) Q(s)exp R(u)du ds
where R(t) = r(t) + Q(t) and is the loss-given-default (corrected from
(d) Simplify this formula as far as you can in the case where the risk-neutral hazard function and the interest rate are assumed to be constants.
(e) Explain why pricing a survival-at-default claim is also relevant to the problem of valuing a CDS contract.
[Total 15 Marks]
EQ(I X|H)=I EQ(I{⌧>t}X), {⌧>t} t {⌧>t} Q(⌧>t)
PLEASE TURN OVER 2
3. Let Q ⇠ Beta(a,b) be a beta-distributed mixing variable. Given Q, assume that Y1, … , Ym are conditionally independent Bernoulli indicator variables with default probability Q. You may use the fact that the density of a random variable with a Beta(a, b)-distribution is given by
g(q)= 1 qa 1(1 q)b 1, a,b,>0, 0