# International Fisher effect

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The international Fisher effect (sometimes referred to as Fisher's open hypothesis) is a hypothesis in international finance that suggests differences in nominal interest rates reflect expected changes in the spot exchange rate between countries.[1][2] The hypothesis specifically states that a spot exchange rate is expected to change equally in the opposite direction of the interest rate differential; thus, the currency of the country with the higher nominal interest rate is expected to depreciate against the currency of the country with the lower nominal interest rate, as higher nominal interest rates reflect an expectation of inflation.[2][3]

## Derivation of the international Fisher effect

The international Fisher effect is an extension of the Fisher effect hypothesized by American economist Irving Fisher. The Fisher effect states that a change in a country's expected inflation rate will result in a proportionate change in the country's interest rate,[2][4] such that the Fisher effect:

${\displaystyle (1+i_{\})=(1+\rho _{\})\times E(1+\pi _{\})}$

can be arranged as

${\displaystyle i_{\}=\rho _{\}+E(\pi _{\})+\rho _{\}E(\pi _{\})\approx \rho _{\}+E(\pi _{\})}$

where

${\displaystyle i_{\}}$ is the nominal interest rate
${\displaystyle \rho _{\}}$ is the real interest rate
${\displaystyle E(\pi _{\})}$ is the expected inflation rate

The hypothesis suggests that the expected inflation rate should equal the difference between the nominal and real interest rates in any given country,[5] such that:

${\displaystyle E(\pi _{\})={\frac {(i_{\}-\rho _{\})}{(1+\rho _{\})}}\approx i_{\}-\rho _{\}}$

where

${\displaystyle \}$ could be substituted with any country's currency

Assuming the real interest rate is equal across two countries due to capital mobility, such that ${\displaystyle \rho _{\}=\rho _{c}}$, substituting the aforementioned equation into the expectations form of relative purchasing power parity results in the formal equation for the international Fisher effect:

${\displaystyle E(e)={\frac {(i_{\}-i_{c})}{(1+i_{c})}}\approx i_{\}-i_{c}}$

where

${\displaystyle E(e)}$ is the expected rate of change in the exchange rate

This equation can be rearranged as:

${\displaystyle E(e)={\frac {(1+i_{\})}{(1+i_{c})}}-1}$

### Relation to interest rate parity

Combining the international Fisher effect with uncovered interest rate parity yields the following equation:

${\displaystyle {\frac {E(S_{t+k})}{S_{t}}}-1={\frac {(i_{\}-i_{c})}{(1+i_{c})}}=E(e)}$

where

${\displaystyle E(S_{t+k})}$ is the expected future spot exchange rate
${\displaystyle S_{t}}$ is the spot exchange rate

Combining the international Fisher effect with covered interest rate parity yields the equation for unbiasedness hypothesis, where the forward exchange rate is an unbiased predictor of the future spot exchange rate.:[2]

${\displaystyle {\frac {F_{t,T}}{S_{t}}}-1={\frac {(i_{\}-i_{c})}{(1+i_{c})}}=E(e)}$

where

${\displaystyle F_{t,T}}$ is the forward exchange rate.

### Example

Suppose the current spot exchange rate between the United States and the United Kingdom is 1.4339 USD/GBP. Also suppose the current interest rates are 5 percent in the U.S. and 7 percent in the U.K. What is the expected spot exchange rate 12 months from now according to the international Fisher effect? The effect estimates future exchange rates based on the relationship between nominal interest rates. Multiplying the current spot exchange rate by the nominal annual U.S. interest rate and dividing by the nominal annual U.K. interest rate yields the estimate of the spot exchange rate 12 months from now:

${\displaystyle \1.4339\times {\frac {(1+5\%)}{(1+7\%)}}=\1.4071}$

To check this example, use the formal or rearranged expressions of the international Fisher effect on the given interest rates:

${\displaystyle E(e)={\frac {(5\%-7\%)}{(1+7\%)}}=-0.018692=-1.87\%}$
${\displaystyle E(e)={\frac {(1+5\%)}{(1+7\%)}}-1=-0.018692=-1.87\%}$

The expected percentage change in the exchange rate is a depreciation of 1.87% for the GBP (it now only costs $1.4071 to purchase 1 GBP rather than$1.4339), which is consistent with the expectation that the value of the currency in the country with a higher interest rate will depreciate.

## References

1. ^ Buckley, Adrian (2004). Multinational Finance. Harlow, UK: Pearson Education Limited. ISBN 978-0-273-68209-7.
2. ^ a b c d Eun, Cheol S.; Resnick, Bruce G. (2011). International Financial Management, 6th Edition. New York, NY: McGraw-Hill/Irwin. ISBN 978-0-07-803465-7.
3. ^ Madura, Jeff (2007). International Financial Management: Abridged 8th Edition. Mason, OH: Thomson South-Western. ISBN 0-324-36563-2.
4. ^ Mishkin, Frederic S. (2006). Economics of Money, Banking, and Financial Markets, 8th edition. Boston, MA: Addison-Wesley. ISBN 978-0-321-28726-7.
5. ^ Saunders, Anthony; Cornett, Marcia Millon (2009). Financial Markets and Institutions, 4th Edition. New York, NY: McGraw-Hill/Irwin. ISBN 978-0-07-338229-6.