Transcript Chapter 13
Chapter 13 Section II Equilibrium in the Foreign Exchange Market Factors affecting the demand for FX • To construct the model, we use two factors: 1. demand for (rate of return on) dollar denominated deposits R$ 2. demand for (rate of return on) foreign currency denominated deposits to construct a model of the foreign exchange market = R*+x • The FX market is in equilibrium when deposits of all currencies offer the same expected rate of return: uncovered interest parity: R$=R*+x. – interest parity implies that deposits in all currencies are deemed equally desirable assets. 2 • Uncovered Interest parity (UIRP) says: R$ = R€ + (Ee$/€ - E$/€)/E$/€ • Why should this condition hold? Suppose it didn’t. – Suppose R$ > R€ + (Ee$/€ - E$/€)/E$/€ . • no investor would want to hold euro deposits, driving down the demand and price of euros. • all investors would want to hold dollar deposits, driving up the demand and price of dollars. • The dollar would appreciate and the euro would depreciate, increasing the right side until equality was achieved. 3 UIRP (continued) Note: UIRP assumes investors only care for expected returns: they don’t need to be compensated for bearing currency risk. To determine the equilibrium exchange rate, we assume that: – Exchange rates always adjust to maintain interest parity. – Interest rates, R$ and R€, and the expected future dollar/euro exchange rate, Ee$/€, are all given. Mathematically, we want to solve the UIRP condition for E$/€ . That is the same as asking how the RHS and the LHS of the UIRP condition change with E$/€ , and then looking for an ‘intersection.’ 4 How do changes in the spot e.r affect expected returns in foreign currency? • Depreciation of the domestic currency today (E↑) lowers the expected return on deposits in foreign currency (expected RoR*↓). Why? – E↑ will ↑ the initial cost of investing in foreign currency, thereby ↓ the expected return in foreign currency. • E↑ then x ↓ hence R*+x ↓ • Appreciation of the domestic currency today (E ↓) raises the expected return of deposits in foreign currency (expected Ror* ↑). Why? – E ↓ wil lower the initial cost of investing in foreign currency, thereby ↑ expected return in foreign currency. • E ↓ then x ↑, hence R*+x ↑ 5 Expected Returns on € Deposits when Ee$/€ = $1.05 Per € Current Interest rate on Expected rate of exchange rate $ depreciation € deposits E$/€ R€ (1.05 - E$/€)/E$/€ Expected dollar return on € deposits R€ + (1.05 - E$/€)/E$/€ 1.07 0.05 -0.019 0.031 1.05 0.05 0.000 0.050 1.03 0.05 0.019 0.069 1.02 0.05 0.029 0.079 1.00 0.05 0.050 0.100 6 The spot e.r. and Exp Return on $ Deposits E ExpRor* 1.07 0.031 1.05 0.050 1.03 0.069 1.02 0.079 1.00 0.100 7 The spot e.r and the Exp Return on $Deposits Current exchange rate, E$/€ 1.07 1.05 1.03 1.02 1.00 0.031 0.050 R$ 0.069 0.079 0.100 Expected dollar return on dollar deposits, R$ 8 Determination of the Equilibrium e.r. No one is willing to hold euro deposits No one is willing to hold dollar deposits 9 The effects of changing interest rates • An increase in the interest rate paid on deposits denominated in a particular currency will increase the RoR on those deposits to an appreciation of the currency. – A rise in $ interest rates causes the $ to appreciate: ↑ in R$ then ↓E($/€) – A rise in € interest rates causes the $ to depreciate: ↑ in R€ then ↑E($/€) • A change in the expected future exchange rate has the same effect as a change in interest rate on foreign deposits: 10 A Rise in the $ Interest Rate A depreciation of the euro is an appreciation of the dollar. • See slide 3 for intuition 11 A Rise in the € Interest Rate • R$ < R€ + (Ee - E)/E The expected return from holding € assets is > than $assets. Investors get out of $ assets into € assets, sell $ to buy €, the $ depreciates or € appreciates. This creates an expected appreciation of the dollar (x↓), thus a fall in the expected return from holding € assets 12 13 An Expected Appreciation of the Euro People now expect the euro to appreciate 14 An Expected Appreciation of the Euro ↑Ee • If people expect the € to appreciate in the future, then investment will pay off in a valuable (“strong”) €, so that these future euros will be able to buy many $ and many $ denominated goods. • The expected return on €s therefore increases: ↑ROR€. – ↓Ee (expected appreciation of a currency) leads to an actual appreciation: a self-fulfilling prophecy. – ↑Ee (expected depreciation of a currency) leads to an actual depreciation: a self-fulfilling prophecy. 15 Covered Interest Parity and Forward Rates 16 Covered Investment Suppose that when investing $1 in a deposit in euros, instead of planning to convert euros back into dollars at an exchange rate of Ee$/ € one year from now, I enter now a contract to sell euros forward at the rate F$/€. My return from such investment then is: R€ + (F$/€ -E$/€ )/E$/€ So, you buy the € deposit with $ To avoid exchange rate risk by buying the € with $, at the same time sell the proceeds of your investment (principal+interest) forward for $ → you have covered yourself. 17 CIRP • Since I could invest the same $1 domestically at R$ , the forward market is in equilibrium when the Covered Parity Condition (CIRP) holds: R$ = R€ + (F$/€ -E$/€ )/E$/€ where F$/€ = the forward exchange rate. This is called “covered” parity because it involves no risk-taking by investors: unlike UIRP, CIRP is a true arbitrage relationship. • Covered interest parity relates interest rates across countries and the rate of change between forward exchange rates,F and the spot exchange rate, E. It says that ROR on $ deposits and “covered” foreign currency deposits are the same. 18 Remarks: • Unlike UIRP, CIRP holds well among major exchange rates quoted in the same location at the same time, and even across different locations in integrated capital markets. • CIRP fails when comparing markets segmented by current or expected capital controls: investors in a country subject to “political risk” require higher interest rates as compensation. • For UIRP = CIRP , F$/€ should = Ee$/€ (the spot rate expected one year from now). • In fact, empirically, the forward rate moves closely with the current spot rate, rather than the expected future spot rate: 19 • f = (F$/€ -E$/€ )/E$/€ is called the “forward premium” (on euros against dollars). – f>0 the dollar is sold at discount (euro at premium) – f<0 the dollar is sold at premium (euroa at discount) – f=0 domestic and foreign currency interest rates are equal. • Exemple: Data from Financial Times, February 9, 2006 – E($/€)=1.195, F($/€)=1.22 (1-year from now) – i$=5.03%, i€=2.9%. i$-i€=2.13% expected depreciation of the $US a year from now. – f = (F$/€ -E$/€ )/E$/€ = (1.22/1.195)-1=2.1%. The dollar is sold at 2.1% discount in the forward market. 20 Expected exchange rates and the term structure (TS)of interest rates • There is no such a thing as “the” interest rate for a country. Rates vary with investment opportunities and maturity dates. • In bond market, there are 3-month, 6-month, 1-year, 3year, 10-year, 30-year bonds. • Term structure is described by the slope of a line connecting the points in time when we observe interest rates. – R rises with term to maturity→a rising TS – R same with all maturities →flat TS – R falls with term to maturity → inverse TS 21 Different types of term structure % 4.5 4 3.5 TS1 TS2 TS3 3 2.5 2 • TS1: rising term structure • TS2: flat term structure • TS3: inverted term structure. 1.5 1 0.5 months 0 1 3 6 12 36 In International finance we can use the TS on different currencies to infer the expected change in the exchange rate. 22 Remarks • Usually, the forward rate, F, is considered a market forecast of the future spot rate Ee (even though empirically F moves more closely with the spot exchange rate, E). • Even if there is not a forward exchange market in a currency, at each point on the TS, the interest differential i-i* allows us to infer the directions of the expected change in E for the two currencies by the markets. 23 Differentials between term structures 6 % 5 4 TS-high TS-low 3 2 • Constant differential: x=(Ee-E)/E=0. Currencies will appreciate or depreciate against each other at a constant rate. 1 months 0 3 8 6 12 36 % 7 6 5 TS-high 4 TS-low 3 • Diverging: x>0 or f>0. High interest currency expected to depreciate at an increasing rate. 2 1 months 0 3 6 12 36 6 % 5 4 TS-high TS-low 3 2 • Converging: x>0, f>0 but decreasing. High interest currency expected to depreciate at a decreasing rate. 1 months 0 3 6 12 36 24 Practical application: wwww.bloomberg.com/markets/index.html: Rates and Bonds 2/22 06 US Germ UK i-iG i-iUK 5 4.5 3-m 4.56 2.52 4.45 2.04 0.11 6-m 4.71 2.63 4.43 2.08 0.28 1-y 4.70 2.76 4.29 1.94 0.41 2-y 4.69 2.93 4.26 1.76 0.43 3 5-y 4.58 3.18 4.23 1.4 0.35 2.5 10-y 4.54 3.43 4.12 1.11 0.42 4 3.5 2 3m 6m Forward discount of $ on £ is increasing but on € decreasing. TSUS 1y 2y TSG 5y 10y TSUK 25