1.0 INTRODUCTION
This study attempts to
empirically examine the determinants of reserves in Malaysia. Times series
monthly data spanning from 1994 to 2013 were utilized in the study. The ADF
unit root test results prove that all the variables are stationary after being
differenced once. The co-integration test results further show that
international reserves and the specified determinants are co-integrated. Total
reserve can be defined as total reserves comprise holdings of monetary gold,
special drawing rights, reserves of IMF members held by the IMF, and holdings
of foreign exchange under the control of monetary authorities.[1]The
definition of export is to take or cause to be taken out of Malaysia any items
by land, sea or air, or to place any items in a conveyance for the purpose of
such items being taken out of Malaysia by land, sea or air or to transmit
technology by any means to a destination outside Malaysia, and includes any
oral or visual transmission of technology by a communication device where the
technology is contained in a document the relevant part which is read out,
described or otherwise displayed over the communications device in such a way
as to achieve similar result (“Intangible Technology Transfer”)[2]. Meanwhile,
the definition of Import is a good or service brought into one country from
another. Along with exports, imports form the backbone of international trade.
The higher the value of imports entering a country, compared to the value of
exports, the more negative that country's balance of trade becomes.[3]
PROBLEM
OF STATEMENT
Foreign reserves acts
as a buffer against capital outflows in excess of the trade balance. This makes
foreign reserves management secondary to macroeconomic objectives, as liquidity
is always the target. This
also enables the monetary authority intervene in the foreign exchange market at
any given time. Holding foreign reserves under both fixed and floating exchange
rate regimes also acts as a “shock absorber” in terms of fluctuations in
international transactions, such as variations in imports resulting from trade shocks,
or in the capital account due to financial shocks.
OBJECTIVE
1.
To determine the long
term relationship by utilizing Johansen Cointegration Test
2.
To explore the short
term relationship by those relationship
3.
To determine the factor
influence the reserve of Malaysia
2.0 LITERATURE REVIEW
Reserves are used to
intervene in the foreign exchange market to influence the exchange rate.
Foreign reserves are used to support monetary and foreign exchange policies, in
order to meet the objectives of safeguarding currency stability and the normal
functions of domestic and external payment systems (Irefin & Yaaba, 2011).
Based on the literature in the (Marc-Andre & Parent, 2005),
the determinants of reserve holdings reported in the literature can be grouped into
five categories: economic size, current account vulnerability, capital account vulnerability,
exchange rate flexibility, and opportunity cost. The table 2 below are the lists
potential explanatory variables for each of these categories (Heller and Khan
1978; Edwards 1985; Lizondo and Mathieson 1987; Landell-Mills 1989; and Lane
and Burke 2001).
In the literature, GDP
and GDP per capita are used as indicators of economic size. The vulnerability
of the current account can be captured by such measures as trade openness and
export volatility. In the long run, central banks will increase their reserves
in response to a greater exposure to external shocks. For this reason, the
level of reserves should be positively correlated with an increase both exports
and imports (Irefin & Yaaba, 2011).
According to Frenkeland
Jovanovic (1981) most of the rules for a country’s demand for foreign exchange
reserves consider real variables, such as imports, exports, foreign debt,
severity of possible trade shocks and monetary policy considerations (Irefin & Yaaba, 2011). Similarly, Shcherbakov (2002) states that,
there are some common indicators that are used to determine the adequate level
of foreign reserves for an economy. According to him, some of these indicators
determine the extent of external vulnerability of a country and the capability
of foreign reserves to minimize this vulnerability. These indicators includes:
import adequacy, debt adequacy and monetary adequacy (Irefin & Yaaba, 2011).
The traditional and most prominent factor considered in determining foreign
reserves adequacy is the ratio of foreign reserves to imports (import
adequacy). This represents the number of months of imports for which a country
could support its current level of imports, if all other inflow and outflow
stops. As a rule of thumb, countries are to hold reserves in order to cover their
import for three to four months (Irefin & Yaaba, 2011).
For a developing
economy like Nigeria, there is need to extend the model to incorporate other variables
that are peculiar in the determination of reserves holdings. Hence, variables
such as Gross Domestic Product (GDP), imports, monetary policy rate which is an
anchor of monetary policy and exchange rate are included in the estimation
equation (Irefin & Yaaba, 2011).
Thus, the equation becomes:
Log Rt =
B0 + B1logYt + B2logIMt + B3logMPRt +B4logEXRt + ut
Where R= foreign
reserves, Y = Gross Domestic Product, IM = Import, MPR = Monetary Policy Rate
and EXR = Exchange Rate.
The justification for
including additional variables for Nigeria is that, for instance, reserves holdings
are positively related with the level of international transactions hence the
importance of variables such as imports and exchange rate.
3.0
METODOLOGY
DATA SOURCE AND
DESCRIPTION
There
are totally three variables are being used in this study, which are total
reserve, export and import. I utilized 235 observations monthly in selected
time series data that span from 1994 to 2013. All the data can be obtained from
World Bank website.[4]
The major variables for
which data collected are defined below:
Total reserves: Total
reserves comprise holdings of monetary gold, special drawing rights, reserves
of IMF members held by the IMF, and holdings of foreign exchange under the
control of monetary authorities. The gold component of these reserves is valued
at year-end (December 31) London prices.[5]
While, Foreign reserves (R) is the
total assets of central bank held in different reserves currencies abroad. The
reserves currencies includes; US dollar, Pound Sterling, Euro, Japanese Yen
etc. The common scale variables used in the model are GDP and imports (Irefin & Yaaba, 2011).
Export: The term export means shipping the goods and services out of the port of a
country. Export of commercial quantities of goods normally requires involvement
of the customs authorities in both the country of export and the country of
import
Import: Imports
are the total monetary value of goods and services imported into the country on
quarterly basis (Irefin & Yaaba, 2011).
ECONOMETRIC MODEL
R = B1
+ B2X + B3M + E
R =
Total reserve
X =
Export
M =
Import
E = Error
term
To
check for the stationary properties of the data, the Augmented Dickey-Fuller
(ADF) (Dickey and Fuller, 1979) unit root test will be applied. Next I will examine
the long-run equilibrium relationship of the variables using the Johansen and
Juselius (1990) cointegration test. The vector error correction estimate will
then be utilized to scrutinize the impact of each of the independent variable
towards the dependent variable in the model as stated in Equation (1). And I will
use ARCH and GARCH family to test whether the variable is fit to with one
model.
Based on literature the
Autoregressive Distributed Lag (ARDL) model developed by Pesaran et al (2001)
is deployed to estimate Frenkel and Jovanovic‟s “buffer stock” econometric
model, but with a slight modification. The choice of ARDL is based on several considerations.
First, the model yields consistent estimates of the long run normal coefficients
irrespective of whether the underlying regressors are stationary at I(1) or
I(0) or a mixture of both. In other words, it ignores the order of integration
of the variables (Pesaran et al, 2001). Secondly, it provides unbiased estimates
of the long run model as well as valid t-statistics even when some of the
regressors are endogenous (Harris & Sollis, 2003). Thirdly, it has good
small sample properties. In other words it yields high quality results even if
the sample size is small (Irefin & Yaaba, 2011).
THEORETICAL FRAMEWORK
4.0 RESULT AND FINDING
ORDINARY LEAST SQUARE
(OLS)
Dependent Variable:
LOG(R)
| ||||
Method: Least
Squares
|
||||
Date: 12/12/14 Time: 20:49
|
||||
Sample: 1994M01
2013M10
|
||||
Included
observations: 238
|
||||
Variable
|
Coefficient
|
Std. Error
|
t-Statistic
|
Prob.
|
C
|
11.53195
|
0.021664
|
532.3059
|
0.0000
|
LOG(X)
|
11.82853
|
0.724507
|
16.32633
|
0.0000
|
LOG(M)
|
-9.399178
|
0.816743
|
-11.50812
|
0.0000
|
R-squared
|
0.887677
|
Mean dependent var
|
10.84844
|
|
Adjusted R-squared
|
0.886722
|
S.D. dependent var
|
0.660280
|
|
S.E. of regression
|
0.222230
|
Akaike info criterion
|
-0.157687
|
|
Sum squared resid
|
11.60570
|
Schwarz criterion
|
-0.113919
|
|
Log likelihood
|
21.76476
|
Hannan-Quinn criter.
|
-0.140048
|
|
F-statistic
|
928.5946
|
Durbin-Watson stat
|
0.318120
|
|
Prob(F-statistic)
|
0.000000
|
|||
Table 1.1
HO: X
not influence R
H1: X
influence R
H0: M
does not influence R
H1: M
does influence R
Based
on the Table 1.1 above we can reject the null hypothesis with 1 percent level
of significant where the prob (t-statistic) is 0.0000 is less than 0.01 which
is represent highly significant relationship between X and R. Thus, we can
accept the alternate hypothesis. Based on table 1.1 the prob(t-statistic =
11.50812) is more than critical value 2 and the prob= 0.00 is highly
significant representing the relationship between M and R. Thus, we can reject
null hypothesis and accept the alternate hypothesis.R-squared is 0.887677
meaning the 88.7677 percent of reserve is explained by export and import and
the balance 11.2323 percent is explain by other factors, thus, they are not
included in the model.Durbin Watson is 0.318120 which represents the data has autocorrelation
and it is non-stationary thus the unit root test is needed to make the data
stationary with integrating first level or second level.
AUGMENTED
DICKY-FULLER (ADF) TEST STATISTIC
R
|
X
|
M
|
|||||||
level
|
1st
differ
|
2nd
differ
|
Level
|
1st
differ
|
2nd
differ
|
Level
|
1st
differ
|
2nd
differ
|
|
Augmented
Dickey-Fuller test statistic
|
0.204428
|
-9.545826
|
-0.576868
|
-6.280101
|
-0.629085
|
-6.092040
|
|||
Test
Critical Value: 1%
|
-3.457984
|
-3.457984
|
-3.458225
|
-2.574882
|
-3.458225
|
-2.574882
|
|||
5%
|
-2.873596
|
-2.873596
|
-2.873701
|
-1.942188
|
-2.873701
|
-1.942188
|
|||
10%
|
-2.573270
|
-2.573270
|
-2.573327
|
-1.615795
|
-2.573327
|
-1.615795
|
|||
Table
2.1
Based
on table 2.1, the R variable is stationary at I (1)because we can reject the
null hypothesis (Ho) with 1 percent, 5 percent, 10 percent level of significant
and the augmented dickey fuller t absolute value (9.5458260) is more than the
t-values(3.457984),( 2.873596) and (2.573270) at integrated level 1 I (1). We
can conclude that the data are stationary at I (1).
For
Z variable, we can reject the null hypothesis (Ho) with 1 percent, 5 percent,
10 percent level of significant because the augmented dickey fuller t absolute
value (6.280101) is more than the t-value, (2.574882), (1.942188) and
(1.615795) at integrated level 1 I (1). We can conclude that the data is
stationary at I (1).
For
M variable we can reject the null hypothesis (Ho) with 1 percent, 5 percent, 10
percent level of significant because the augmented dickey fuller t absolute
value (6.092040) is more than the t-value, (2.574882), (1.942188) and
(1.615795)at integrated level 1 I (1). We can conclude that the data is
stationary at I (1).
Ordinary Least Square
(OLS) After The Data is Stationary
Table
2.2 shows the result after we run the ordinary least squares by using
integrated variable the Durbin Watson become more than critical value (2) then
we conclude the model is no autocorrelation. After the data being stationary
the Durbin Watson increases than before. So, we can conclude that the model has
no autocorrelation problem because the Durbin Watson stat is 2.899154 which is
more than critical value 2.As well the R-square is strongly indicating that the
X and M are 100 percent explaining the R dependent variable.
Dependent Variable:
DR
|
||||
Method: Least
Squares
|
||||
Date: 12/12/14 Time: 21:22
|
||||
Sample (adjusted):
1994M03 2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Variable
|
Coefficient
|
Std.
Error
|
t-Statistic
|
Prob.
|
C
|
-2.26E-19
|
1.40E-19
|
-1.609466
|
0.1089
|
DX
|
1.000000
|
1.55E-17
|
6.43E+16
|
0.0000
|
DM
|
-2.26E-16
|
1.73E-17
|
-13.07836
|
0.0000
|
R-squared
|
1.000000
|
Mean dependent var
|
0.001547
|
|
Adjusted R-squared
|
1.000000
|
S.D. dependent var
|
0.013810
|
|
S.E. of regression
|
2.14E-18
|
Sum squared resid
|
1.07E-33
|
|
F-statistic
|
4.89E+33
|
Durbin-Watson stat
|
2.899154
|
|
Prob(F-statistic)
|
0.000000
|
|||
Table
2.2
Graph
1, 3, and 5 is shown the data before stationary and we can see it was randomly
walk. Meanwhile, the graph 2, 4, and 6 shows the variable after being
stationary and converted into integrated first difference.
JOHANSEN COINTEGRATION
TEST
Unrestricted
Co-integration Rank Test (Trace)
|
||||
Hypothesized
|
Trace
|
0.05
|
||
No.
of CE(s)
|
Eigenvalue
|
Statistic
|
Critical
Value
|
Prob.**
|
None
|
0.066398
|
19.02628
|
29.79707
|
0.4910
|
At
most 1
|
0.012866
|
3.017952
|
15.49471
|
0.9661
|
At
most 2
|
2.61E-06
|
0.000607
|
3.841466
|
0.9820
|
Trace test
indicates no cointegration at the 0.05 level
|
||||
* denotes
rejection of the hypothesis at the 0.05 level
|
||||
**MacKinnon-Haug-Michelis
(1999) p-values
|
||||
Table
3.1
From
table 3.1 at hypothesized, number of co-integration none is show
H0:
There is no co-integration equation.
H1:
There is co-integration equation.
The
estimated trace statistics value of 19.02628 is less than critical value of
MacKinnon at 5% significance level (29.79707 P=0.4910). This shows there is no
one cointegrating equation between R, X, and M. This means there is no a long
run relationship between R, X, and M.
Unrestricted
Cointegration Rank Test (Maximum Eigenvalue)
|
||||
Hypothesized
|
Max-Eigen
|
0.05
|
||
No.
of CE(s)
|
Eigenvalue
|
Statistic
|
Critical
Value
|
Prob.**
|
None
|
0.066398
|
16.00833
|
21.13162
|
0.2244
|
At
most 1
|
0.012866
|
3.017345
|
14.26460
|
0.9456
|
At
most 2
|
2.61E-06
|
0.000607
|
3.841466
|
0.9820
|
Max-eigenvalue
test indicates no co-integration at the 0.05 level
|
||||
* denotes
rejection of the hypothesis at the 0.05 level
|
||||
**MacKinnon-Haug-Michelis
(1999) p-values
|
||||
Table
3.2
From table3.2, the max-Eigen statistics also shows the
number of co-integration equation. The hypothesized number of co-integration
equation for
of none shows there is no co-integration
equation. At this level, the estimated max-Eigen statistics of 16.00833 is
smaller than the MacKinnon critical value of 21.13162 at 5% significance level
(p=0.2244). This means there is no a long run relationship between R, X, and M.
LONG RUN MODEL
Normalized
co-integrating coefficients (standard error in parentheses)
|
||||
R
|
X
|
M
|
||
1.000000
|
-960761.5
|
771035.5
|
||
(141723.)
|
(156231.)
|
|||
R = – 960761.5 + 771035.5
(141723.) (156231.)
Estimated-t
X960761.5/141723 = 6.7791
M771035.5/156231 = 6.8353
The estimated t-value for X (6.7791) is greater than
critical t-value of t (2). Therefore x is significant in explaining the changes
in y at 5% significance level.
The estimated t-value of M (6.8353) is greater than
critical t-value of t (2). Thus M can explain the changes in y at 5%
significance level. Therefore, X, and M can influence R in long run.
Unrestricted
Var
Vector
Auto-regression Estimates
|
|||
Date:
12/13/14 Time: 08:27
|
|||
Sample
(adjusted): 1994M03 2013M10
|
|||
Included
observations: 236 after adjustments
|
|||
Standard
errors in ( ) & t-statistics in [ ]
|
|||
R
|
X
|
M
|
|
R(-1)
|
1.399820
|
9.64E-07
|
9.27E-07
|
(0.05975)
|
(3.7E-07)
|
(3.4E-07)
|
|
[
23.4298]
|
[
2.60085]
|
[
2.75684]
|
|
R(-2)
|
-0.379027
|
-4.97E-07
|
-6.32E-07
|
(0.06324)
|
(3.9E-07)
|
(3.6E-07)
|
|
[-5.99361]
|
[-1.26555]
|
[-1.77562]
|
|
X(-1)
|
18022.96
|
0.643799
|
0.224729
|
(16499.7)
|
(0.10237)
|
(0.09290)
|
|
[
1.09232]
|
[
6.28907]
|
[
2.41910]
|
|
X(-2)
|
-43659.39
|
-0.058098
|
-0.440797
|
(15929.0)
|
(0.09883)
|
(0.08968)
|
|
[-2.74087]
|
[-0.58787]
|
[-4.91495]
|
|
M(-1)
|
-2973.498
|
0.364043
|
0.741475
|
(17243.6)
|
(0.10698)
|
(0.09709)
|
|
[-0.17244]
|
[
3.40279]
|
[
7.63728]
|
|
M(-2)
|
25502.70
|
-0.039125
|
0.411956
|
(17675.5)
|
(0.10966)
|
(0.09952)
|
|
[
1.44283]
|
[-0.35677]
|
[
4.13950]
|
|
C
|
1072.199
|
0.040762
|
0.032412
|
(1933.61)
|
(0.01200)
|
(0.01089)
|
|
[
0.55451]
|
[
3.39778]
|
[
2.97718]
|
|
R-squared
|
0.997519
|
0.993035
|
0.993022
|
Adj. R-squared
|
0.997454
|
0.992853
|
0.992840
|
Sum sq. resids
|
9.53E+08
|
0.036680
|
0.030207
|
S.E. equation
|
2039.886
|
0.012656
|
0.011485
|
F-statistic
|
15343.78
|
5441.673
|
5431.706
|
Log likelihood
|
-2129.790
|
699.9152
|
722.8249
|
Akaike AIC
|
18.10839
|
-5.872163
|
-6.066312
|
Schwarz SC
|
18.21113
|
-5.769422
|
-5.963572
|
Mean dependent
|
63846.25
|
0.858027
|
0.880401
|
S.D. dependent
|
40425.30
|
0.149700
|
0.135727
|
Determinant
resid covariance (dof adj.)
|
0.031293
|
||
Determinant
resid covariance
|
0.028590
|
||
Log likelihood
|
-585.1541
|
||
Akaike
information criterion
|
5.136899
|
||
Schwarz
criterion
|
5.445122
|
||
Table 4.1
We have to run
unrestricted Var because there is no relationship in long run for this model.
Base on table 4.1, can conclude the R is has short term relationship with X and
M because the t-stat 2.60085 and 2.75684 is more than critical value (2).
Residual
Test
Base
on graph 7 above the residual is low volatile for some period of time and
continued with also low volatile for another period of time then we can justify
that an ARCH and GARCH family model can be used.
Arch Effect Test
Heteroskedasticity
Test: ARCH
|
||||
F-statistic
|
0.319847
|
Prob. F(1,233)
|
0.5722
|
|
Obs*R-squared
|
0.322150
|
Prob. Chi-Square(1)
|
0.5703
|
|
Test Equation:
|
||||
Dependent Variable:
RESID^2
|
||||
Method: Least
Squares
|
||||
Date: 12/14/14 Time: 00:42
|
||||
Sample (adjusted):
1994M04 2013M10
|
||||
Included
observations: 235 after adjustments
|
||||
Variable
|
Coefficient
|
Std.
Error
|
t-Statistic
|
Prob.
|
C
|
9.87E-36
|
3.59E-36
|
2.747913
|
0.0065
|
RESID^2(-1)
|
0.037024
|
0.065465
|
0.565550
|
0.5722
|
R-squared
|
0.001371
|
Mean dependent var
|
1.02E-35
|
|
Adjusted R-squared
|
-0.002915
|
S.D. dependent var
|
5.40E-35
|
|
S.E. of regression
|
5.41E-35
|
Sum squared resid
|
6.82E-67
|
|
F-statistic
|
0.319847
|
Durbin-Watson stat
|
2.000600
|
|
Prob(F-statistic)
|
0.572244
|
|||
Table 5.1
H0:
No ARCH effect
H1:
There is Arch effect
We
cannot reject the hypothesis null because the prob chi-square is 0.572244 is more
than 5 percent level of significant than the data is fail to reject that there
is no ARCH effect in our model.
SERIAL CORRELATION TEST
|
Date: 12/14/14 Time: 01:02
|
|
|
|
||
|
Sample: 1994M03
2013M10
|
|
|
|
|
|
|
Included
observations: 236
|
|
|
|
|
|
Arch Effect Test
Heteroskedasticity
Test: ARCH
|
||||
F-statistic
|
0.059602
|
Prob. F(1,233)
|
0.8073
|
|
Obs*R-squared
|
0.060099
|
Prob. Chi-Square(1)
|
0.8063
|
|
Test Equation:
|
||||
Dependent Variable:
WGT_RESID^2
|
||||
Method: Least
Squares
|
||||
Date: 12/14/14 Time: 01:16
|
||||
Sample (adjusted):
1994M04 2013M10
|
||||
Included
observations: 235 after adjustments
|
||||
Variable
|
Coefficient
|
Std.
Error
|
t-Statistic
|
Prob.
|
C
|
1.028378
|
0.348523
|
2.950680
|
0.0035
|
WGT_RESID^2(-1)
|
-0.015991
|
0.065501
|
-0.244136
|
0.8073
|
R-squared
|
0.000256
|
Mean dependent var
|
1.012216
|
|
Adjusted R-squared
|
-0.004035
|
S.D. dependent var
|
5.234924
|
|
S.E. of regression
|
5.245475
|
Akaike info criterion
|
6.161083
|
|
Sum squared resid
|
6410.997
|
Schwarz criterion
|
6.190526
|
|
Log likelihood
|
-721.9272
|
Hannan-Quinn criter.
|
6.172953
|
|
F-statistic
|
0.059602
|
Durbin-Watson stat
|
2.000226
|
|
Prob(F-statistic)
|
0.807340
|
|||
Table
5.3
H0: There is no
ARCH effect
H1: There is
ARCH effect
We have to
accept the null hypothesis with 5 percent level of significant because the prob
(0.8073) is more than 5 percent level of significant.
NORMALLY DISTRIBUTED TEST
Graph 8
H0:
The data is not normally distributed
H1:
The data is normally distributed
The Jarque-Bera prob
is less than 5 percent of level of significant, thus, we can reject the null
hypothesis and concluded the data is normally distributed.
The Fitted Model Test D(R)
GARCH
Dependent Variable:
DR
|
||||
Method: ML - ARCH
(Marquardt) - Normal distribution
|
||||
Date: 12/15/14 Time: 02:27
|
||||
Sample (adjusted):
1994M03 2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Convergence achieved
after 14 iterations
|
||||
Presample variance:
backcast (parameter = 0.7)
|
||||
GARCH = C(1) +
C(2)*RESID(-1)^2 + C(3)*GARCH(-1)
|
||||
Variable
|
Coefficient
|
Std.
Error
|
z-Statistic
|
Prob.
|
Variance
Equation
|
||||
C
|
1.98E-05
|
4.77E-06
|
4.144316
|
0.0000
|
RESID(-1)^2
|
0.072293
|
0.022838
|
3.165519
|
0.0015
|
GARCH(-1)
|
0.835157
|
0.044685
|
18.68974
|
0.0000
|
R-squared
|
-0.012599
|
Mean dependent var
|
0.001547
|
|
Adjusted R-squared
|
-0.021291
|
S.D. dependent var
|
0.013810
|
|
S.E. of regression
|
0.013956
|
Akaike info criterion
|
-5.753751
|
|
Sum squared resid
|
0.045380
|
Schwarz criterion
|
-5.709719
|
|
Log likelihood
|
681.9426
|
Hannan-Quinn criter.
|
-5.736001
|
|
Durbin-Watson stat
|
1.816389
|
|||
Table
5.4
EGARCH
Dependent Variable:
DR
|
||||
Method: ML - ARCH
(Marquardt) - Normal distribution
|
||||
Date: 12/15/15 Time: 02:28
|
||||
Sample (adjusted):
1994M03 2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Convergence achieved
after 35 iterations
|
||||
Presample variance:
backcast (parameter = 0.7)
|
||||
LOG(GARCH) = C(1) +
C(2)*ABS(RESID(-1)/@SQRT(GARCH(-1))) + C(3)
|
||||
*LOG(GARCH(-1))
|
||||
Variable
|
Coefficient
|
Std.
Error
|
z-Statistic
|
Prob.
|
Variance
Equation
|
||||
C(1)
|
-1.378363
|
0.281393
|
-4.898363
|
0.0000
|
C(2)
|
0.167184
|
0.058467
|
2.859455
|
0.0042
|
C(3)
|
0.850599
|
0.028905
|
29.42758
|
0.0000
|
R-squared
|
-0.012599
|
Mean dependent var
|
0.001547
|
|
Adjusted R-squared
|
-0.021291
|
S.D. dependent var
|
0.013810
|
|
S.E. of regression
|
0.013956
|
Akaike info criterion
|
-5.781030
|
|
Sum squared resid
|
0.045380
|
Schwarz criterion
|
-5.736999
|
|
Log likelihood
|
685.1616
|
Hannan-Quinn criter.
|
-5.763281
|
|
Durbin-Watson stat
|
1.816389
|
|||
Table 5.5
TARCH
Dependent Variable:
DR
|
||||
Method: ML - ARCH
(Marquardt) - Normal distribution
|
||||
Date: 12/14/13 Time: 02:30
|
||||
Sample (adjusted):
1994M03 2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Convergence achieved
after 83 iterations
|
||||
Presample variance:
backcast (parameter = 0.7)
|
||||
GARCH = C(1) +
C(2)*RESID(-1)^2 + C(3)*RESID(-1)^2*(RESID(-1)<0) +
|
||||
C(4)*GARCH(-1)
|
||||
Variable
|
Coefficient
|
Std.
Error
|
z-Statistic
|
Prob.
|
Variance
Equation
|
||||
C
|
5.65E-05
|
1.02E-05
|
5.518783
|
0.0000
|
RESID(-1)^2
|
0.139978
|
0.048400
|
2.892081
|
0.0038
|
RESID(-1)^2*(RESID(-1)<0)
|
0.860897
|
0.437444
|
1.968016
|
0.0491
|
GARCH(-1)
|
0.439916
|
0.096858
|
4.541889
|
0.0000
|
R-squared
|
-0.012599
|
Mean dependent var
|
0.001547
|
|
Adjusted R-squared
|
-0.025693
|
S.D. dependent var
|
0.013810
|
|
S.E. of regression
|
0.013986
|
Akaike info criterion
|
-5.785566
|
|
Sum squared resid
|
0.045380
|
Schwarz criterion
|
-5.726857
|
|
Log likelihood
|
686.6968
|
Hannan-Quinn criter.
|
-5.761900
|
|
Durbin-Watson stat
|
1.816389
|
|||
Table
5.6
GARCH
Akaike info
criterion -5.753751
Schwarz
criterion -5.709719
EGARCH
Akaike info
criterion -5.781030
Schwarz
criterion -5.736999
TARCH
Akaike info
criterion -5.785566
Schwarz
criterion -5.726857
We can conclude
that GARCH is the best model for D(R) because it has the lower AIC and SIC.
The Fitted Model Test D(X)
GARCH
Dependent Variable:
DX
|
||||
Method: ML - ARCH
(Marquardt) - Normal distribution
|
||||
Date: 12/14/13 Time: 02:17
|
||||
Sample (adjusted):
1994M03 2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Convergence achieved
after 14 iterations
|
||||
Presample variance:
backcast (parameter = 0.7)
|
||||
GARCH = C(1) +
C(2)*RESID(-1)^2 + C(3)*GARCH(-1)
|
||||
Variable
|
Coefficient
|
Std.
Error
|
z-Statistic
|
Prob.
|
Variance
Equation
|
||||
C
|
1.98E-05
|
4.77E-06
|
4.144316
|
0.0000
|
RESID(-1)^2
|
0.072293
|
0.022838
|
3.165519
|
0.0015
|
GARCH(-1)
|
0.835157
|
0.044685
|
18.68974
|
0.0000
|
R-squared
|
-0.012599
|
Mean dependent var
|
0.001547
|
|
Adjusted R-squared
|
-0.021291
|
S.D. dependent var
|
0.013810
|
|
S.E. of regression
|
0.013956
|
Akaike info criterion
|
-5.753751
|
|
Sum squared resid
|
0.045380
|
Schwarz criterion
|
-5.709719
|
|
Log likelihood
|
681.9426
|
Hannan-Quinn criter.
|
-5.736001
|
|
Durbin-Watson stat
|
1.816389
|
|||
Table
5.7
EGARCH
Dependent Variable:
DX
|
||||
Method: ML - ARCH
(Marquardt) - Normal distribution
|
||||
Date: 12/14/13 Time: 02:19
|
||||
Sample (adjusted):
1994M03 2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Convergence achieved
after 35 iterations
|
||||
Presample variance:
backcast (parameter = 0.7)
|
||||
LOG(GARCH) = C(1) +
C(2)*ABS(RESID(-1)/@SQRT(GARCH(-1))) + C(3)
|
||||
*LOG(GARCH(-1))
|
||||
Variable
|
Coefficient
|
Std.
Error
|
z-Statistic
|
Prob.
|
Variance
Equation
|
||||
C(1)
|
-1.378363
|
0.281393
|
-4.898363
|
0.0000
|
C(2)
|
0.167184
|
0.058467
|
2.859455
|
0.0042
|
C(3)
|
0.850599
|
0.028905
|
29.42758
|
0.0000
|
R-squared
|
-0.012599
|
Mean dependent var
|
0.001547
|
|
Adjusted R-squared
|
-0.021291
|
S.D. dependent var
|
0.013810
|
|
S.E. of regression
|
0.013956
|
Akaike info criterion
|
-5.781030
|
|
Sum squared resid
|
0.045380
|
Schwarz criterion
|
-5.736999
|
|
Log likelihood
|
685.1616
|
Hannan-Quinn criter.
|
-5.763281
|
|
Durbin-Watson stat
|
1.816389
|
|||
Table
5.8
TARCH
Dependent Variable:
DX
|
||||
Method: ML - ARCH
(Marquardt) - Normal distribution
|
||||
Date: 12/14/13 Time: 02:20
|
||||
Sample (adjusted):
1994M03 2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Convergence achieved
after 83 iterations
|
||||
Presample variance:
backcast (parameter = 0.7)
|
||||
GARCH = C(1) +
C(2)*RESID(-1)^2 + C(3)*RESID(-1)^2*(RESID(-1)<0) +
|
||||
C(4)*GARCH(-1)
|
||||
Variable
|
Coefficient
|
Std.
Error
|
z-Statistic
|
Prob.
|
Variance
Equation
|
||||
C
|
5.65E-05
|
1.02E-05
|
5.518783
|
0.0000
|
RESID(-1)^2
|
0.139978
|
0.048400
|
2.892081
|
0.0038
|
RESID(-1)^2*(RESID(-1)<0)
|
0.860897
|
0.437444
|
1.968016
|
0.0491
|
GARCH(-1)
|
0.439916
|
0.096858
|
4.541889
|
0.0000
|
R-squared
|
-0.012599
|
Mean dependent var
|
0.001547
|
|
Adjusted R-squared
|
-0.025693
|
S.D. dependent var
|
0.013810
|
|
S.E. of regression
|
0.013986
|
Akaike info criterion
|
-5.785566
|
|
Sum squared resid
|
0.045380
|
Schwarz criterion
|
-5.726857
|
|
Log likelihood
|
686.6968
|
Hannan-Quinn criter.
|
-5.761900
|
|
Durbin-Watson stat
|
1.816389
|
|||
Table
5.9
GARCH
Akaike info
criterion -5.753751
Schwarz
criterion -5.709719
EGARCH
Akaike info criterion -5.781030
Schwarz
criterion -5.736999
TARCH
Akaike info
criterion -5.785566
Schwarz
criterion -5.726857
We can concluded that GARCH is the best
model for D(X) because it has the lower AIC and SIC.
THE
FITTED MODEL TESTD (M)
GARCH
Dependent Variable:
DM
|
||||
Method: ML - ARCH
(Marquardt) - Normal distribution
|
||||
Date: 12/14/13 Time: 02:38
|
||||
Sample (adjusted):
1994M03 2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Convergence achieved
after 23 iterations
|
||||
Presample variance:
backcast (parameter = 0.7)
|
||||
GARCH = C(1) +
C(2)*RESID(-1)^2 + C(3)*GARCH(-1)
|
||||
Variable
|
Coefficient
|
Std.
Error
|
z-Statistic
|
Prob.
|
Variance
Equation
|
||||
C
|
0.000226
|
6.79E-06
|
33.36290
|
0.0000
|
RESID(-1)^2
|
0.001386
|
0.001321
|
1.049360
|
0.2940
|
GARCH(-1)
|
-1.000169
|
0.001424
|
-702.5541
|
0.0000
|
R-squared
|
-0.010949
|
Mean dependent var
|
0.001297
|
|
Adjusted R-squared
|
-0.019626
|
S.D. dependent var
|
0.012423
|
|
S.E. of regression
|
0.012544
|
Akaike info criterion
|
-6.189925
|
|
Sum squared resid
|
0.036665
|
Schwarz criterion
|
-6.145893
|
|
Log likelihood
|
733.4112
|
Hannan-Quinn criter.
|
-6.172176
|
|
Durbin-Watson stat
|
1.943615
|
|||
Table
6.0
EGARCH
Dependent Variable:
DM
|
||||
Method: ML - ARCH
(Marquardt) - Normal distribution
|
||||
Date: 12/14/13 Time: 02:39
|
||||
Sample (adjusted):
1994M03 2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Convergence achieved
after 21 iterations
|
||||
Presample variance:
backcast (parameter = 0.7)
|
||||
LOG(GARCH) = C(1) +
C(2)*ABS(RESID(-1)/@SQRT(GARCH(-1))) + C(3)
|
||||
*LOG(GARCH(-1))
|
||||
Variable
|
Coefficient
|
Std.
Error
|
z-Statistic
|
Prob.
|
Variance
Equation
|
||||
C(1)
|
-4.290583
|
1.105587
|
-3.880818
|
0.0001
|
C(2)
|
0.279081
|
0.095713
|
2.915822
|
0.0035
|
C(3)
|
0.529858
|
0.122047
|
4.341415
|
0.0000
|
R-squared
|
-0.010949
|
Mean dependent var
|
0.001297
|
|
Adjusted R-squared
|
-0.019626
|
S.D. dependent var
|
0.012423
|
|
S.E. of regression
|
0.012544
|
Akaike info criterion
|
-5.936776
|
|
Sum squared resid
|
0.036665
|
Schwarz criterion
|
-5.892745
|
|
Log likelihood
|
703.5396
|
Hannan-Quinn criter.
|
-5.919027
|
|
Durbin-Watson stat
|
1.943615
|
|||
Table
6.1
TARCH
Dependent Variable:
DM
|
||||
Method: ML - ARCH
(Marquardt) - Normal distribution
|
||||
Date: 12/14/13 Time: 02:40
|
||||
Sample (adjusted): 1994M03
2013M10
|
||||
Included
observations: 236 after adjustments
|
||||
Convergence achieved
after 8 iterations
|
||||
Presample variance:
backcast (parameter = 0.7)
|
||||
GARCH = C(1) +
C(2)*RESID(-1)^2 + C(3)*RESID(-1)^2*(RESID(-1)<0) +
|
||||
C(4)*GARCH(-1)
|
||||
Variable
|
Coefficient
|
Std.
Error
|
z-Statistic
|
Prob.
|
Variance
Equation
|
||||
C
|
0.000151
|
1.95E-05
|
7.749871
|
0.0000
|
RESID(-1)^2
|
0.117887
|
0.078832
|
1.495422
|
0.1348
|
RESID(-1)^2*(RESID(-1)<0)
|
-0.133214
|
0.102083
|
-1.304959
|
0.1919
|
GARCH(-1)
|
-0.000121
|
0.124311
|
-0.000975
|
0.9992
|
R-squared
|
-0.010949
|
Mean dependent var
|
0.001297
|
|
Adjusted R-squared
|
-0.024021
|
S.D. dependent var
|
0.012423
|
|
S.E. of regression
|
0.012571
|
Akaike info criterion
|
-5.916491
|
|
Sum squared resid
|
0.036665
|
Schwarz criterion
|
-5.857782
|
|
Log likelihood
|
702.1459
|
Hannan-Quinn criter.
|
-5.892825
|
|
Durbin-Watson stat
|
1.943615
|
|||
Table 6.2
GARCH
Akaike info
criterion -6.189925
Schwarz
criterion -6.145893
EGARCH
Akaike info
criterion -5.936776
Schwarz
criterion -5.892745
TARCH
Akaike info
criterion -5.916491
Schwarz
criterion -5.857782
We can concluded
that TARCH is the best model for D(M) because it has the lower AIC and SIC.
5.0 CONCLUSION
We
found that the data is not stationary in the beginning and we have to integrate
it into first difference to make it stationary for our analysis. Then after the
data become stationary the export and import highly significantly explaining
the total reserve Malaysia then we can suggest to the policy maker that in
order to increase the total revenue we have to increase the export. Reducing
imports is important as well because it negatively influence the total reserve
Malaysia. But in the long run we found that import and export do not have
relationship with Malaysia total reserve but in short run they will influence
the total reserve and other than that we can choose the GARCH model for reserve
and export variable and meanwhile TARCH model for import variable because the
data is fitted with those model. And lastly for future researcher these paper
is provide a latest analysis with the newest data and updated methodology and
it will contributed to the body of knowledge.
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