Week 9 - Elements of international finance Flashcards
Forward premium, FP_t,T
= (F_t,T - S_t)/St
= the annualised percentage difference between the forward rate and the spot rate
-> captures the TRADEOFF between buying today vs buying forward
- If FP > 0, then it takes more £ to buy $1 in the future than now
=> £ is at a discount and $ is at a premium - If FP < 0, then it take fewer £ to buy $1 in the future than now
=> £ is at a premium and $ is at a discount
How are Forward rates priced?
By INTEREST ARBITRAGE
- If there is no arbitrage, borrowing in one country and then lending in the other country should NOT be PROFITABLE after eliminating exchange rate risk using currency forwards
No-arbitrage pricing implies the Covered Interest Parity (CIP).
1. What is the formula for CIP?
2. Can investors trust the CIP theory?
F = S x (1+r)/(1+r*)
where r = interest rate in the home country UK
and r* = interest rate in the foreign country US
If F < or >, then we can have an ARBITRAGE strategy
- This is a no-arbitrage pricing relationship, and thus it holds as long as capital is free to flow across markets.
- We CAN TRUST this theory, since arbitrage trades are possible in these foreign currency markets and money markets.
- All the quotes/rates are assumed to be risk free and are known today.
2 strategies of the Covered Interest Parity (CIP)
- agree today t, executed in future (t+k)
- how much £ to deposit in bank at t today to get $1 at (t+k)
» strategy 1: deposit PV of F pounds in UK bank account to get enough, F pounds at time (t+k) to buy $1
» strategy 2: convert 1/(1+r*) pounds to dollars at time t to deposit in US bank account to buy $1 - commonality between strategies 1 and 2 is getting $1 at (t+k)
» so no-arbitrage implies that both values of £ have to be equal at time t (Law of One Price)
Unbiased Expectations Hypothesis (UEH)
If investors have identical expectations and are risk neutral (ie. do not require risk premium),
F_t,t+1 will rise or fall to E_t[S_t+1]
UEH: F_t,T = E_t[S_T]
Unbiased Expectations Hypothesis (UEH) - What to do if F_t,t+1 > E_t[S_t+1]? What about if < ?
(see slides for example with numbers)
- Buy pounds forward at time t
- Expect to sell at time t+1
If F_t,t+1 < E_t[S_t+1],
1. Sell pounds forward at time t
2. Expect to buy pounds at time t+1
Uncovered Interest Parity (UIP) which now has EXPECTATION
*obtained from CIP and UEH
Can investors trust the UIP theory?
- does not need to hold from no-arbitrage, unlike CIP
E_t[S_T] = S_t x (1+r_t,T)/(1+r_t,T*) - when it holds, it implies that the Expected change in interest rates is approx. = to the difference between domestic and foreign interest rates
E_t[(S_T - S_t)/S_t] ≈ r_t,T - r_t,T* - Investors cannot trust UIP b/c empirically UIP does not hold
- UIP is derived from CIP and UEH
> UEH ASSUMES that investors are RISK NEUTRAL. In reality, however, investors are risk averse.
Testing the Expectations theory - regression formula and results
See slides for formula
- If UEH is true -> alpha = 0
- UIP does NOT hold b/c alpha ≠ 0
- One explanation is RISK
- in well-functioning markets, risk will be rewarded to the extent that it cannot be diversified away (rmb CAPM)
- E[return] = rf rate + RISK PREMIUM
- coefficient a in the formula is the estimate of the risk premium
Commodity Price Parity (CPP)
~ Law of One Price
- we cannot make profits from buying individual goods in USD and selling in JPY
Absolute purchasing power parity (Absolute PPP)
P_t = P_t* St
where P_t is the price of basket of goods in the home country at time , P_t* is for foreign country
= {same} basket of goods should cost the same in the UK and in the US
- absolute PPP relates differences in prices of goods across countries to differences in inflation across countries
Absolute PPP may fail because CPP may not hold -> so represent Deviations from PPP, R_t
How do we relate R_t to relative PPP?
S_t = R_t P_t / P_t*
If systematic deviations from PPP (R_t) are constant over time, we can look at RELATIVE MOVEMENTS in EXCHANGE RATES & PRICE LEVELS OVER TIME
[see slides for formulas and equations]
then, relative PPP is s_t,T ≈ π_t,T - π_t,T*
ie. the change in spot exchange rate from t and T can be attributed to the INFLATION RATE differential between domestic and foreign
» related to UIP and the small s_t,T
Does Relative PPP and Absolute PPP hold?
- Relative PPP fails in the short run (1 day to 5 years)
- Absolute PPP holds better in long horizon (10-20 years)
Real exchange rate, R_t
- a measure that tells us about the relative purchasing power of money in the 2 countries
R_t = (S_t x P_t*)/P_t
- intuition: you can buy a number R of UK baskets for every foreign basket purchased
- if investors can trade freely across countries and the absolute PPP is satisfied, then R = 1
Real interest rate, rho_t,T
- the nominal interest rate r adjusted for inflation π
[see slides for formula]
- for small rates, we have the approximation rho_t,T ≈ r_t,T - π_t,T
