An Empirical Investigation of the Monetary Model Economic Fundamentals

This paper presents an empirical investigation of an important series called “economic fundamentals” derived from the flexible price monetary model of exchange rate determination. The model predicts that the nominal exchange rate is determined by the “economic fundamentals”, referred here as the series t f . As a result, the characteristics of the “economic fundamentals” process may influence the properties of the nominal exchange rate process. We will just use the term “fundamentals”. Nevertheless, many exchange rate models found in the literature assume an ad-hoc process for t f ignoring the fact that the specification of this process can be formally derived within the framework of the monetary model. Using data for several countries on GDP and money supplies, we construct the series t f according to the monetary model specification, and we examine some important characteristics of its empirical distribution such as skewness, kurtosis, stationarity, ARCH and GARCH properties. We observe that the series is not exactly normally distributed, as commonly assumed in many target zone models. This investigation essentially helps with modeling exchange rate and more importantly in the analysis of exchange rate target zones modeling by identifying potential restrictions that need to be taken into consideration when choosing a process for the modeling of the “economic fundamentals”.


Introduction
The monetary model was originally developed as a framework to analyze Balance-ofpayments adjustments under a fixed exchange rate regime and has been modified after the Breakdown of the Bretton Woods system as a model of nominal exchange rate determination.The model is a common theme in textbooks on open-economy macroeconomics and in the literature.In addition, the model forms the basis of most target zone models and balance-of-payments studies.However, several versions of the monetary model have been developed over the years.In fact, Dornbusch [1] developed a sticky-price version of the model while Frenkel [2] and Mussa [3] developed a flexible price version.Dornbusch's sticky-price monetary model allows for short-run overshooting of the nominal exchange rate above its long-run value that is associated with purchasing power parity (PPP).But, according to Frankel (1979), the Sticky-price monetary model contains a deficiency in that it does not explicitly incorporate shortrun difference in secular rates of inflation between the two countries.To overcome this shortcoming, he introduced the real interest differential monetary model that combines elements of both the flexible-price and sticky-price monetary models.

Derivation of the Exchange Rate Process
The symbol  is used to denote foreign variables.A building block of the monetary model is purchasing power parity (PPP).The model makes four basic assumptions: 1) Money market equilibrium; 2) Continuous stock equilibrium in the money market; 3) Uncovered interest parity (UIP); and 4) Purchasing power parity.
Monetary equilibrium conditions in the domestic and foreign markets are given respectively by The parameter φ is known as the income elasticity of money demand where 0 1 φ < < and α is the interest rate semi-elasticity of money demand.
International capital market equilibrium is given by assuming that uncovered interest parity holds, that is, Using the PPP condition, we obtain the fundamental equation of the flexible price monetary model ( ) ( ) Under flexible exchange rates, the money stock is exogenous.
As commonly done in the literature, we simplify the model by assuming that the income elasticities and interest rate semi-elasticities of money demand are the same for the domestic and foreign countries.In this case, the fundamental equation becomes Following Nelson Mark, we let ( ) We therefore obtain ( ) This last version constitutes the fundamental equation of the flexible price monetary model in discrete time.This equation is basically a first order stochastic difference equation in the variable t s in expectation form.
The expression for t f is referred to as the "economic fundamentals" or the funda- mental determinants of exchange rate determination.
To solve for t s , it is more useful to rewrite the equation as follows where 1 1 . This class of stochastic difference equations is usually solved by the method of undetermined coefficients or by repeated substitutions.This equation states that expectations of future values of the exchange rate, that is, are embodied in the current exchange rate.It also indicates that high relative money growth in the domestic country leads to a weakening of the home currency, while an increase in the relative domestic income leads to a strenghtening of the home currency.
We can write It follows that In a similar fashion we obtain Continuing the process, we obtain the following recursive equation If the following transversality condition lim 0, is imposed, we obtain the so-called "no-bubbles" or "rational expectations" solution by letting k go to infinity: The transversality condition puts a constraint on the rate at which the exchange rate can grow.
The "no-bubbles" solutions indicates that the exchange rate is the present value of expected future values of the economic fundamentals.This is in view with the "asset" approach to the exchange rate according to which the exchange rate should be expected to behave just like other assets, such as stocks and bonds.

Interactions between the Properties of the Fundamental Process and Those of the Exchange Rate Process
We see that the exchange rate is a function of the fundamentals process.Therefore, the properties of the fundamentals have serious implications on the properties of the exchange rate process.Conversely, the observed characteristics of the exchange rate series put some restrictions on the potential characteristics of the fundamentals process.In this section we look at the implications of some well known stylized facts about exchange rate data for the characteristics of the fundamentals series.
For empirical purposes, we follow Mark characterization setting 1 ψ = and use the expression ( ) Two common stylized facts are as follows: 1) The deviation of the price from the fundamentals displays substantial persistence and much less volatility than the exchange rate returns.
2) The volatility of exchange rate returns, that is of t s ∆ , is virtually indistinguishable from stock return volatility.
At this stage of the analysis, we want to focus on some empirical analysis by specifically looking at some descriptive statistics about the economic fundamentals, t f , as de- fined in (0.18).
To address the excess volatility in the exchange rate returns relative to changes in the fundamentals, as in Mark [4], the growth rate of the economic fundamentals is assumed to follow the following AR(1) stationary process where t  is assumed iid with mean 0 and variance 2 σ  .No normality assumption is necessary.
The k-step ahead prediction formula is Alternatively, we obtain ( ) Thus, the exchange rate solution can be simplified and we have the following formula ( ) ( )( ) Thus, we obtain the exchange rate solution to the standard FPMM At this point, we want to compare the variance of the exchange rate returns, t s ∆ with the variance of the change in fundamentals, ∆ is assumed to be stationary, then we have ( ) ( ) . Therefore, we obtain Figure 1 shows that the series in level { } t f are not stationary.If they have unit root the AR(1) process specified above for the economic fundamentals does not explain the empirical fact that exchange rate returns are more volatile than the growth rate of the fundamentals.

Some Characteristics of the Empirical Distribution of the Fundamentals
Given the implications of the properties of the fundamentals for the characteristics of the exchange rate process, it is important to analyze some essential aspects of the empirical distribution of the fundamentals, { } t f .

Some Sample Statistics
First, we present a set of sample statistics in Table 1.The series { } t f is computed using quarterly data on money supplies on both the domestic and foreign countireis from for Japan and Canada, from for Sweden, and from series is not normal as indicated at least by the excess kurtosis.Since the skewness is negative for Sweden and Japan, the data skewed to the left, that the left tail is longer.But, given that the skewness is between −0.5 and 0.5, the distribution can be viewed as approximately symmetric.Figure 2 shows the density of the economic fundamentals estimated using a normal kernel.
A quick observation confirms our analysis, particularly for Japan and Sweden.
From this analysis, we observe that the series { } t f does not appear to have a normal distribution.
Let ( ) S f be the coefficient of skewness and ( ) f κ be the coefficient of kurtosis.
We can also test the hypotheses: 1) ( ) ( ) The t-statistics for the above tests as well as the corresponding p-value are presented in Table 2. Additionally, the Jarque and Bera [5] statistics, which can be viewed as a combination of the above statistics is also presented.
According to the table at a 5% significance level we cannot reject the hypothesis that the distributions of the series are symmetric, but we can reject the hypothesis of zero excess kurtosis as well as the hypothesis of normality.
This analysis may seem unnecessary.However, it actually has very important implications in terms of exchange rate modeling in both the discrete and continuous time as well as aset pricing modeling.The following section tackles the issue of stationarity.

Stationarity of the Fundamentals
Given any time series, one important question that is often to be considered is whether    We conduct the analysis using the Augmented Dickey-Fuller test statistic or alternatively the KPSS test procedure.The first step is to identify the optimal order of the autoregressive process that fits the quarterly change in the fundamentals.To do so we start by plotting the sample autocorrelation function and the sample partial autocorrelation function for each series (f_t).For Japan we see that the first, the second, and the ninth partial autocorrelation coefficients appear to be significant at a 5% significance level suggesting an AR(2) or AR(9) model.Since the model that minimizes the Akaike Information criterion is an AR(9) and since the autocorrelation coefficients are significant for several lags, the autoregressive model of order 9 appears to be a good model for this series.A similar analysis for Sweden, the United Kingdom, and Canada suggest that we work with autoregressive processes of order 1, 2, and 3 respectively.
The Augmented Dickey Fuller test that follows is based on the above autoregressive models.The test's null hypothesis assumes that the series is non stationary while the alternative hypothesis states that the series is stationary.Since the distribution of the ADF test statistic under the null hypothesis is not the usual t-distribution, Monte Carlo methods are used approximate the distribution of the statistic.The null hypothesis of nonstationarity is rejected as long as the test statistic is smaller than a commonly specified critical value or the associated p-value is less than a chosen significance level.Otherwise, stationarity should be maintained.In Table 3 the p-value are computed using Monte Carlo methods and model-based bootstrap.The latter is chosen to account for   The KPSS test procedure is more commonly used in empirical work.The null hypothesis is that the series is stationary.Here, for completeness, we report both testing procedures.
Table 3 shows that for all the series the Asymptotic and the Bootstrap p-values are greater than 20%.We cannot reject the null hypothesis that the series are non-stationary.
This observation is confirmed in Table 4 where the p-values of the KPSS test are all less than or equal to 1%, which provides evidence against stationarity.
To complete the analysis, we explore whether the series exhibit Autoregressive Conditional Heteroskedasticity (ARCH) or Generalized ARCH (GARCH) effects.Stock prices usually exhibit ARCH and GARCH properties.Moreover, given that most international economists believe that exchange rates behave like stock prices, we would expect exchange rates to have such properties.We will examine ARCH and GARCH effects in the next section.

ARCH and GARCH Effects for the Fundamentals
We examine the conditional variance of the above four series to determine the presence of ARCH and GARCH effects.We start by estimating the conditional means of the series by determining the ARMA model that minimizes the Akaike Information criterion.
We then generate the residuals which are used to compute the sample autocorrelation function and the sample partial autocorrelation functions of the squared residuals.
They are plotted in the following figures (Figure 5 & Figure 6).
According to the sample autocorrelation functions of the square of the residuals, Japan and the UK cannot be modeled as a pure Moving Average process.However, a Moving Average process of order 0 seems to be appropriate for Sweden, and in the case of Canada one may be able to use a Moving Average process of order 3.
Further, looking at the sample partial autocorrelation functions, one can see that the first, and the ninth lags are significant for Japan, which suggests a possible AR(1) mo-  for the UK, a GARCH(3,3) for Canada, and no ARCH effect for Sweden.
We also use the Akaike information criterion (AIC) to identify the best autoregressive models for the square of the residuals.The models obtained are ARCH(1) for Japan and the UK and ARCH(0) for Sweden and Canada.
, where T is the sample size an q is the number of lags 2 ˆt e (here q = 1) and 2 R is the coefficient of determination.Under the null hypothesis, the LM statistic has a chi-square distribution with q degrees of freedom in large samples.Hence, the null hypothesis is rejected if ( ) 2 2 1 ,q T q R α χ − − > or the associated p-value is less than the chosen significance level, and conclude that ARCH effects are present in the data.The test was implemented and the results are provided in Table 5.
As the table indicated there is evidence in favor of conditional heteroskedasticity for Japan and the UK, but we cannot reject the hypothesis that residuals for Sweden and Canada are white noise.
The estimates of the corresponding ARCH models for Japan and the UK are presented in Table 6.

Figure 1 .
Figure 1.Plots of the economic fundamentals series.

Figure 3 .
Figure 3. Sample autocorrelation function of the quaterly change in the fundamentals for Japan, Sweden, the United Kingdom, and Canada.

Figure 4 .
Figure 4. Sample partial autocorrelation function of the quarterly change in the fundamentals for Japan, Sweden, UK, and Canada.

Figure 5 .
Figure 5. Sample autocorrelation function of the square of the residuals obtained from the autoregressive model that minimizes the Akaike Information criterion (AIC).

Figure 6 .
Figure 6.Sample partial correlation function of the square of the residuals obtained from the autoregressive model that minimizes the Akaike Information criterion (AIC).

Table 1 .
Descriptive statistics on the economic fundamentals { }

Table 2 .
Test of normality.
More generally, for the general case, the null hypothesis states that all the coefficients should be zero and the alternative hypothesis states that at least one coefficient should be zero.The LM statistic is To test for ARCH effects or the presence of ARCH effects, the most commonly used test is the Lagrange multiplier(LM) test proposed by Engle.The test is usually performed by first estimating the best fitting regression equation usually called the "mean equation", which can be an appropriate ARMA or AR model and then use the residuals to estimate the coefficients.For example, to test for an ARCH(2) model for Japan, we collect the squared residuals from the autoregressive model with the smallest AIC

Table 5 .
LM test for ARCH effect.

Table 6 .
Estimates of the parameters AR-ARCH models for Japan and the UK.