Understanding the time-frequency dynamics of money demand, oil prices, and

macroeconomic variables: The case of India

Rabeh KhalfaouiCollege of Science and Humanities, Shaqra University, SA

Email: rabeh.khalfaoui@gmail.com

Hemachandra Padhan Department of Humanities and Social Sciences (HSS),

Indian Institute of Technology (IIT), Madras, IndiaEmail: hemachandrapadhan2016@gmail.com

Aviral Kumar Tiwari*Department of Finance Law and Control, Montpellier

Montpellier Business School, Montpellier, FranceEmail: aviral.eco@gmail.com

Shawkat HammoudehLebow College of Business, Drexel University, USA

Email: shawkat.hammoudeh@gmail.com

*Corresponding author.

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Understanding the time-frequency dynamics of money demand, oil prices, and

macroeconomic variables: The case of India

Abstract

This study investigates the multi-scale lead-lag nexuses between money demand and real GDP,

interest rate, exchange rate, oil prices, inflation-defining CPI for the third global oil consumer,

India, using the monthly data ranging from 1994 M1 to 2017 M11. A special focus is placed on

the effect of changes in oil prices and inflation-defining CPI on money demand. The paper uses

the wavelet coherency and the partial wavelet coherency techniques to achieve the goals. The

univariate empirical analysis reveals that during the whole sample period, the underlining

variables show the same pattern in terms of wavelet power spectra, suggesting weak volatility

levels across the time-frequency plane. The bivariate analysis indicates that the partial wavelet

coherent empirical results underscore the presence of either a unidirectional or a bidirectional

causal relationship between money demand and the underlining oil and macroeconomic

variables. In particular, in terms of the wavelet coherency results, money demand exhibits the

greatest interdependency with real GDP across the time-frequency domain, while it has a much

lower interdependency with interest rate, exchange rate and oil prices.

Keywords: Demand for money; Oil prices; Wavelet coherency; Partial wavelet coherency.

JEL Codes: E41, Q41, F31, Q4, C18

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1. Introduction

The present work aims to study how variations in real gross domestic product (GDP), oil prices,

exchange rate, interest rate, inflation-defining CPI and money demand in the world’s third

largest oil-consuming country, India, following the United States and China. Its oil demand is

expected to rise considerably in the future, as the projected size of its population is expected to

surpass that of China, and the growth rate of its GDP is anticipated to remain above 7% in the

long run. These relevant factors will enhance demand for money. As GDP growth and industrial

development are highly correlated with oil consumption, the Indian economy is thus extremely

vulnerable to oil price variations which will cause fluctuations in money demand that connects

the real and monetary sides of the economy1. Furthermore, India is the third largest economy by

the purchasing power parity (PPP) GDP after China in 2018 (IMF, 2018)2. Therefore, we are

motivated to examine whether India is able stabilize its demand for money in the presence of

changes in oil prices, exchange rate, interest rate, inflation-defining CPI and real gross domestic

product (GDP).

Moreover, the stability of demand for money has received a special attention by

macroeconomists. This importance stems mainly from the fact that this demand is associated

with the real and monetary sides of the economy through the quantitative theory of money3. The

issue of stability of the demand for money has been recognized by S. M Goldfeld of Brookings

Institution since 19734. Although, Goldfeld initiated the stability of demand for money in the

case of United States, most of the subsequent studies have emphasized the stability of demand 1 Exchange rate, interest rate, price level etc. 2 China (1st) is (25.1 billion$), United States (2nd) is (20.2 billion$) and India (3rd) is (10.3 billion$). "Report for Selected Country Groups and Subjects (PPP valuation of country GDP)" 3 See Friedmand (1956) and Poole (1970) for more details. 4 According to Goldfeld, S. M., Duesenberry, J., & Poole, W, (1973, p.579) “Has the demand function for money remained stable over the post war period? Put another way; is there any evidence of either systematic long-run shifts or marked short-run instabilities that make historically estimated relationships unsuitable for forecasting purposes?

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for money that links the real and monetary flanks of the U.S. economy by focusing on the pivotal

quantitative theory of money (Friedman, 1956; Poole, 1970). Later, the literature has placed a

special attention on the monetary side of the economy.

In the same vein, given the Keynesian framework of money demand, the literature has focused

on the relationship between demand for real money balances and the motives for holding money

(e.g., transaction, precautionary and speculative motives). Furthermore, Friedman (1953), Miles

(1978), and Mundell (2000) argue that the exchange rate insures a degree of monetary autonomy

for the monetary systems in the rest of the world. McKinnon et al. (1984) also find that exchange

rate is a better indicator of shifts or stability of money demand in the United States. In the same

line of thinking, Girton and Roper (1981) show that exchange rate variance5 increases with the

degree of currency substitution in the face of exogenous expected rate of depreciations.

Therefore, it is important to include the exchange rate in the money demand function in India.

On the other hand, the price of oil which is the most volatile commodity has demonstrated its

importance as a phenomenon that should be reckoned with in the global economy. This is due to

the fact that virtually all economic activities including consumption and production require the

use of the volatile oil whether as an input or a final output, which affects the stability of money

demand. Oil prices affect consumers’ budget and companies’ investment plans. Spikes in oil

prices that result from idiosyncratic oil shocks, and not from aggregate demand, may not

morphed into more inflation but may affect money demand through risk, exchange rate and other

channels.

5 Girton and Roper, (1981) explain that the exchange rate would be a determinant of money demand at the value of unity if the transaction cost is developed more fully in the aggregate money demand. For more details, see Mundell (1971), and Kareken and Wallace (1978).

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Accordingly, oil prices, inflation-defining CPI, exchange rate, interest rate and real GDP can

each have different effects on the demand for money balances. In this case, the early studies like

Hamilton (1983), Burbidge and Harrison (1984), and Gisser and Goodwin (1986) argue that oil

price shocks had lowered the world output through reductions in the supply of inputs of

production. On the other hand, Darby (1982) and Ahmed et al. (1988) blame the poor economic

performance in the 1970s and 1980s on the macroeconomic policies that were implemented in

many industrial countries in the aftermath of the oil price shocks. Those policies have been

undertake in order to combat the prevailing high inflation rates, and thereby may have worsened

the recessions that were already associated with the increases in energy prices.

To this end, none of the studies has examined the causal relationship between the volatile oil

prices, exchange rate, inflation rate, interest rate and real GDP and the stability of money

demand function. Therefore, we contribute a new view to the literature on money demand by

using the wavelet analysis (wavelet coherency and partial wavelet coherency) in order to analyse

the impact of those oil and macroeconomic variables on the money demand function for the

world’s third largest oil consumer and the world’s largest democracy. Existing studies in the

literature have used traditional time series methods such as simple regression models, ARDL and

the Johensen cointegration models, or other time varying estimation methods. However, the use

of wavelet helps us to analyse the relationship between money demand and its determinants (e.g.,

income and interest rate) in a time-varying framework, without losing the information of the time

frequency counterpart of the data. It also shows both cyclical and anti-cyclical effects of the

relation of money demand with their variables, particularly income and interest rates. As we

know economic agents are heterogeneous and behave differently. For example, for some agents’

money demand due to income can be a short run phenomenon, while it can be a long run for

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some others. Similarly, for some economic agents’ money demand due interest rates can be a

short run phenomenon while it can be cast in the long-run perspective for others.

The objective of this study based on the new methodology is to examine the multi-scale lead-lag

nexus between changes in oil price, exchange rate, inflation-defining CPI, interest rate and real

GDP and changes in money demand. This methodology uses the wavelet coherency and the

partial wavelet coherency and the phase-differences to decompose the time frequency effects of

changes in oil prices, exchange rate, inflation–defining CPI, interest rate and real GDP on

changes in money demand over the period January 1994 to November 2017 for India.

The results show there exists a bi-directional direction between changes in oil prices, exchange

rate, inflation rate, interest rate and real GDP, and changes in money demand. In addition, the

wavelet coherency and partial wavelet coherency approaches reveal time-varying pockets of low

and high coherences among the different series under study, showing both cyclical and anti-

cyclical effects. Furthermore, the degree of co-movement and the causal effects for the pairs of

the variables occur in the time scale band from one year to two years in the short-term horizon.

The remainder of the study is organized as follows. Section 2 presents a brief overview of money

demand in India. Section 3 provides the literature review. Section 4 discusses the methodology

and data. Section 5 explains the results and provides policy implications. Finally, Section 6

concludes the study.

2. Role of Money demand in India

According to Poole (1970), money demand is the appropriate monetary policy tool that central

banks use to achieve macroeconomic goals if the money demand function (MDF) is stable.

However, if MDF is not stable, then central banks should target the interest rate. Therefore, the

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Indian government has witnessed significant changes in the financial system as a result of

enlarging the financial innovations and financial efficiency. These noticeable changes are due to

variations in interest rate, inflation, oil prices and exchange rate. Moreover, they are due to the

shift to the market-based exchange rate system and current account convertibility. The Financial

Stability Report (RBI; 2018) reflects an assessment of the stability of India’s financial system

and its resilience to risks emanating from global and domestic factors. It also discusses issues

related to developments and regulation of the financial sector, connected to stabilizing the

demand for money in India6. Moreover, it shows that the Reserve Bank of India (RBI) is

introducing multiple indicators to assist with stabilizing the money demand, which would initiate

a more effective policy prospective.

Jadhav (1994) finds a stability of demand for money in India as a result of the financial

deregulations and financial innovations that occurred. At the same line, Rao and Bajpai (1995)

and Ramachandran (2004) find a stability in money demand in the short-run by using output and

prices. On the other hand, a study by Arif (1996) demonstrates the stability of money demand in

the long-run. Based on Arif (1996), we can conclude that money demand in India has been

considered as less volatile. Furthermore, the studies by Reddy (1998), Mohanty and Mitra

(1999), Bhanumurthy (2000), Das and Mandal (2000), Rao and Ramachandran (2003) and

Padhan (2016) support the stability of money in India. Therefore, we can conclude that empirical

studies support a stable demand for money function in India.

3. Review of the related studies

6 See, The Financial Stability Report (RBI; 2018) https://rbi.org.in/Scripts/FsReports.aspx.

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Theoretically, the modelling of the stability of money demand function was done within the

framework of macroeconomics, particularly the monetary model (Friedman, 1956)7, the New

Classical model (Lucas and Thomas, 1981), the monetary approach with the exchange rate

(Dornbusch, 1976), the monetary approach with the balance of payments framework (Hahn,

1977; Frenkel & Johnson, 2013), and the New Keynesian model (Lee, 2009; Giordani, 2004).

The demand for money theory has typically focused on the elasticities of money demand with

respect to income and the interest rate (Goldfeld 1973; Arango and Nadiri 1981; Boughton 1981;

Butter and Fase 1981; McKinnon et al. 1984; Rose 1985; Payne 1992; Hueng 2000).

From the empirical statistical prospective, the earlier studies focused on the cointegration

technique, assessing the stability of money demand function. These include Hafer and Jansen,

1991; Hoffman and Rasche, 1991; McNown and Wallace, 1992,) for the United States. Karfakis

and Parikh (1993) for Australia; Adams (1991) and Johansen (1992) for the United Kingdom;

Muscatelli and Papi (1990) for Italy; Bahmani-Oskooee and Shabsigh (1996) for Japan; Melnick

(1990) for Argentina; Frenkel and Taylor (1993) for Yugoslavia; Bahmani-Oskooee and Rhee

(1994) for Korea; Hafer and Kutan (1994) for China; and Bahmani-Oskooee (1996) for Iran.

Moreover, in contrast to the earlier studies on stability of money demand, the more recent

research uses the traditional8 cointegration techniques without analysing the stability of money

demand function. The recent research places attention only on the long-run relationship by using

cointegration techniques. These include Prasad (1994), Bhattacharya (1995), Rao and Shalabh

(1995) and Pradhan and Subramanian (1997) for India; Khan (1980, 1994), Khan and Reza 7 Friedman’s quantity theory of money is based on the portfolio approach to the demand for money by considering the price level, interest rate on bonds and interest rate on equities, non-human wealth, human wealth and income level. 8 Traditional techniques include the ordinary least squares and second stage least squares in estimating the elasticity of the variables. They also suffer from the spurious regression problem. Therefore, they use the cointegration approach to solve the spurious regression problem. In the same line, those approaches interpret their finding of the presence of cointegration as a sign of stability but without performing a stability test.

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(1989), Ahmad and Khan (1990), Khan (1992) and Hossain (1994) for Pakistan; Tan (1997),

Ibrahim (1998, 2001) for Malaysia; Arize et al. (1991), Chowdhury (1997) and Bahmani-

Oskooee and Techaratanachai (2001) for Thailand; Bahmani-Oskooee and Rhee (1994) and Lee

and Chung (1995) for Korea. However, some newer studies use the ARDL method including

Bahmani-Oskooee and Barry (2000) for Russia, Bahmani-Oskooee and Bohl (2000) for

Germany and Cheong Tang (2007) for the ASEAN 5 countries. Others use panel data models

with structural breaks and the PMG model.

But recently the new developments in money demand apply distinct modelling procedures to

investigate the variance of exchange rate, structural change and the specification of the

contextual setting (Lungu et al. 2012; Sahin 2013). Concerning the short-run versus long-run

money demand, Chow (1966) investigated the determinants of the long-run and short-run

demand for money and concluded that there is indeed a difference between the long-run and

short-run demand and that permanent income is more important than current income as the long-

run asset constraint.

For better understanding of the literature on money demand, we have tabulated the

characteristics of the more recent studies in more details in Table 1:

Table 1. A review summary of the findings of previous studies

Authors Country/Region Period Approach Findings

Bahmani-Oskooee and Barry (2000)

Russia Post-1970 ARDL Not stable

Bahmani-Oskooee and Bohl (2000)

Germany 1965q1-1991q4 ARDL Not stable

Sriram (2002) Malaysia 1973:1-1995:12 ECM Stable

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Nell (2010)South Africa 1965–1997 Engle and

Granger

Cointegration

Both stable and unstable

Akinlo (2005) Nigeria 1970:01-2004:04 ARDL Stable

Bahmani-Oskooee & Rehman (2005)

Asian developing countries

1973-2000 Johansen Maximum Likelihood

Unstable

Bahmani-Oskooee & Tanku (2006)

LCDs 1974q1-1998q4 ARDL Cointegration

Cheong Tang (2007)

ASEAN-5 1975-1994 ARDL Stable

Narayan (2007) Indonesia 1970-2005 Johansen Maximum Likelihood

Cointegration

Nwafor et al (2007)

Nigeria 1986Q3–2005Q4 VAR Stable

Bahmani-Oskooee and Wang (2007)

China 1983.1–2002.4 ARDL Stable

Owoye and Onafowora (2007)

Nigeria 1986.1–2001.4 Johansen Maximum Likelihood

Stable

Hamori and Hamori (2008)

11 EU countries 1999m1-2006m3 Johansen Maximum Likelihood

Stable

Hamori (2008) Sub-Saharan African

1980-2005 Non-stationary panel data analysis

Cointegration

Inoue and Hamori (2008)

India 1980-2007

1976-2007

Cointegration test Cointegration

Bahmani-Oskooee and Gelan (2009)

21 African Countries

1971q1-2004q3 Johansen Maximum Likelihood

Cointegration

Baharumshah et al. (2009)

China 1990:02-2007:04 ARDL Stable

Darrat and Al- Bahrain, UAE and 1973-2005 Johansen and Cointegration

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Sowaid (2009) Qatar Juselius

Yu and Gan (2009)

ASEAN-5 1987m1-2007m4 Engle and Granger

Cointegration

Stable

Singh and Pandey (2009)

India 1953-2007 Cointegration With structural breaks

Stable with structural breaks

Rao and Kumar ( 2009,b)

14Asian developing countries

1970-2005 Cointegration With structural breaks

Stable with structural breaks

Rao and Kumar ( 2009,a)

Bangladesh 1973-2003 Cointegration With structural breaks

Unstable

Siddiki (2010) Bangladesh 1975-1995 Johansen Maximum Likelihood

Stable

Chukwu et al. (2010)

Nigeria 1986q1-2006q4 Cointegration and structural breaks

Stable

Hossain (2010) Bangladesh 1973-2008 Johansen Maximum Likelihood

Stable with structural breaks

Kumar et al. (2013,b)

11 OECD Countries

1975q1-2008q4 Panel Data With structural breaks

Stable with structural breaks

Kumar (2011) 20 developing countries

1975-2005 ARDL With structural breaks

Stable

Kumar and Rao (2012)

14 Asian countries

1970-2009 ECM & ARDL Stable

Kumar et al. (2013,a)

Nigeria 1960-2008 Cointegration with structural breaks

Stable with structural breaks

Dreger and Wolters (2014)

Euro area 2003q4-2010q4 Cointegration Stable

Sani et al. (2014) Nigeria 1991:Q1-2013:Q4 Gregory and Hansen cointegration (1996)

Stable with structural breaks

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Ben-Salha and Jaidi (2014)

Tunisia 1979-2011 ARDL Stable

Hamdi et al (2015)

GCC countries 1980.1 2011.4 FMOLS, PDOLS and PMG

Stable

4. Methodology and Data

4.1. The wavelet coherency.

In this paper we employ a continuous wavelet transform (CWT) for our analysis. We used the

complex Morlet wavelet (Percival and Walden, 2000), which is defined as

ψ0 (η)=π−1/4 e iω0η e−1

2 η2

, (1)

where ω0 and denote the frequency and the time, respectively. To reach an optimal balance,

Torrence and Compo (1998) argue thatω0=6 .

The ratio of the cross-spectrum between two times series X and Y to the product of the spectrum

of each time series defines the wavelet coherency. This ratio indicates the local correlation in the

time-frequency space. The formula of the wavelet coherency between X and Y is as follows

(2)

S denotes the smoothing operator; defines the cross-spectrum and is the

complex conjugate of . Following Torrence and Compo (1998), the time convolution is

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carried out with a Gaussian process, while the scale convolution is accomplished using a

rectangular window (for further details, see Torrence and Compo, 1998).

According to Aguirar-Conraria and Soares (2011) and for the partial continuous wavelet

transform approach, the wavelet coherency is given by the following:

Rm2 ( s )X ,Y|ZU=

|QXYM |2

QXXM QYY

M ,

(3)

where QXYM

, QXXM

and QYYM

denote the minors linked with the smoothed cross wavelet

transforms |S (s−1W m

XY (s ))|2

, S (s−1|Wm

X( s )|2) and S (s−1|W m

Y (s )|2) , respectively, in the 4×4

matrix Q .

The lead-lag relationship (phase-difference) between X and Y can be defined as the following

(4)

where ℑdenotes the imaginary part of the smoothing power spectrum and ℜ indicates the real

part of the smoothing power spectrum. A phase-difference coefficient equal to zero demonstrates

that the signals move together at a specified frequency. If , then the series are in-

phase, with leading . On the other hand, if then is leading Y. One may

experience an anti-phase relation (analogous to negative covariance) if the phase difference is of

π (or −π ) meaning . If then is leading, while

Y is leading if .

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4.2. Data

This study covers the monthly data over the period January1994 to November 2017 for India.

The data are collected from the Reserve Bank of India (RBI) and the US Energy Information

Administration (EIA). Moreover, we use the broad money (M3) as a proxy of money demand, the

consumer price index as a proxy of inflation CPI (base year, 2010=100), real GDP per capita as

economic growth, interest rate, exchange rate and crude oil prices as a proxy of oil prices. This

analysis follows the Goldfeld (1989), Hossain (2010) and Alsamara et al. (2017). It is based on

the following empirical model

where MD is money demand, SV is the scale variable proxied by the oil price (OP), real GDP (Y)

and OC is the opportunity cost proxied by the inflation rate CPI (INF), interest rate (R) and

exchange rate (ER). Therefore Eq. (8) can be rewritten as

For a first assessment of the patterns of oil prices, inflation CPI, money demand, real GDP,

interest rate and exchange rate in the case of India through the time-frequency space, we

represent the individual wavelet power of each variable which indicates the intensity of the

volatility of the time series at a certain time (point of time) and scale (period). Regarding the

wavelet power spectra (right panel of Figure 1), the horizontal axis shows the time component

while the vertical axis denotes the period in terms of years (the frequency is converted into time

units; years), i.e. the frequency component. The thick black contour represents the region of the

5% significance level, while the curved black line indicates a cone of influence which denotes

areas affected by the edge effects.

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In Figure 1, we portray on the left the time series under study. On the right side of the figure, we

show the wavelet power spectra of the six variables.

Looking at Figure 1, it is clearly noticeable that the individual wavelet power plots exhibit a

quite similar behaviour featured by slight concentration of power at coarser scales (at 8-16 years

frequency band). Further, referring to the dispersion of the areas color and the degree of intensity

concentration, it is interesting to note that oil price changes and inflation were more volatile than

the four other variables. Obviously, we observe less significant islands of the deep blue for the

oil price and consumer price index wavelet powers than for the other variables.

Referring to the diagram of the inflation wavelet power spectra, at the frequency band of 1-2

years, the periods 1998-2000 and 2008-2011 are marked by high volatility levels as indicated by

the significant red-yellow areas. Those years are concomitant with the 2007 Asian fanatical

crisis, the 2008 global financial crisis and the 2010 European sovereign debt crisis.

Summing up, given the individual wavelet power spectra diagrams, several remarks merit

emphasis. First, one general finding can come out is this is that the variables used in the study

show weak volatility across all wavelet scales and during the entire sample period. Second, oil

prices and the consumer price index (inflation) appear to be more volatile than the other

variables across the time-frequency domain. Third, it is interesting to emphasize that the six

variables seem to exhibit the same pattern in terms of individual wavelet power spectra, which

points to weak volatility powers in the whole.

The individual wavelet power spectra are used in the volatility investigation and do not uncover

any common characteristics between the different pairs, as they do not examine the causal

interplays and the co-phases between the selected time series. Therefore, the wavelet coherency,

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the partial wavelet coherency, the phase and partial phase relations are employed in order to

connect the different variables.

1999 2002 2005 2008 2011 2014 20172

3.5

5

6.5

8MD

Perio

d (y

ears

)

Wavelet Power

1999 2002 2005 2008 2011 2014 2017

1

2

4

810

1999 2002 2005 2008 2011 2014 20177

8.25

9.5

10.75

12GDP

Perio

d (y

ears

)

Wavelet Power

1999 2002 2005 2008 2011 2014 2017

1

2

4

810

1999 2002 2005 2008 2011 2014 20175

7

9

11

13IR

Perio

d (y

ears

)

Wavelet Power

1999 2002 2005 2008 2011 2014 2017

1

2

4

810

1999 2002 2005 2008 2011 2014 20173

3.75

4.5

5.25

6ER

Perio

d (y

ears

)

Wavelet Power

1999 2002 2005 2008 2011 2014 2017

1

2

4

810

1999 2002 2005 2008 2011 2014 2017-4

-1.5

1

3.5

6Inflation

Perio

d (y

ears

)

Wavelet Power

1999 2002 2005 2008 2011 2014 2017

1

2

4

810

1999 2002 2005 2008 2011 2014 20175

5.75

6.5

7.25

8Oil Price

Perio

d (y

ears

)

Wavelet Power

1999 2002 2005 2008 2011 2014 2017

1

2

4

810

Figure 1. Log-level time series plots and individual wavelet power spectra plots.

Note: The 5% significance level against the red noise is denoted by the thick black contour. The color code for power spans from blue (low power) to red (high power). The region affected by the edge effects (the cone of influence) is designated by a black line.

5. Results’ Discussions and Implications

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In this section, we aim to quantify the intensity of the time-frequency lead-lag nexus of the real

GDP, interest rate, exchange rate, inflation-defining CPI, oil price versus money demand in the

case of India. To this end, we employ the wavelet coherency, partial wavelet coherency, phase

relation and partial phase relation methods to examine the relations between the variables in the

nexus. The results of those methods allow policymakers, different types of investors,

researchers, etc. to evaluate the frequency and the power of interconnection at any point of time

and discover the causal effects and synchronization of two phenomena we analyse the wavelet

(partial) coherency diagrams and the phase-difference plots.

We have five figures in our analysis which indicate the wavelet (partial) coherent and (partial)

phase structures for: (i) the money demand-real GDP pair; (ii) the money demand-interest rate

pair; and (iii) the money demand-exchange rate pair; (iv) the money demand-inflation defining

CPI pair; (v) the money demand-oil price pair in the time-frequency plane. Each figure contains

two panels where in the top panel the coherency diagram (the left-hand side) and the partial

coherency (the right-hand side) are displayed. In the bottom panel the phase relation (the left-

hand-side) and the partial phase relation (the right-hand side) are plotted.

As shown in the coherency and partial coherency diagrams, the strength of the nexus between

two variables is indicated through the colours of the regions which vary from blue to red.

However, the blue islands indicate lower interconnection between the considered time series,

whereas the red areas demonstrate the presence of higher intensity of interdependencies between

the two variables. The (partial) coherent structure of the investigated variables is given in a time-

frequency plane.

On each diagram, the x- and y-axes denote the time and frequency, respectively. The statistically

significant coherence intervals are denoted by the black outlined contours, while the opaque

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areas are the regions of the diagram which refer to the so-called the cone of influence (i.e., the

area which is affected by edge effects). The lead-lag relationship via the time-frequency plane is

analysed across two business cycles: a 1-4 year frequency band (will be analysed as the short-

term horizon) and a 4-8 year frequency band (which corresponds to the long-term horizon). As it

can be seen in a first glance from the (partial) coherency diagrams for all possible pairs, one may

reveal that the nexus between real GDP, interest rate, exchange rate, inflation-defining CPI, oil

price and money demand in India is not stable across the time and over wavelet scales. As a

point of fact, with reference to the wavelet coherency and partial wavelet coherency diagrams

one might claim out a varying nature in the dynamics between the investigated time series

showed by the time-varying pockets of weak and high nexuses for the money demand-real GDP

pair, money demand-interest rate pair, money demand-exchange rate pair, money demand-

inflation defining CPI pair and money demand-oil price pair i.e. regarding both the diagrams of

coherency and partial coherency, we observe a plenty of red islands (a high power of

interdependency) and a great deal of blue islands (low power of interdependency).

Some exceptions are registered for the wavelet coherency structure of the money demand-

interest rate, money demand-exchange rate and money demand-oil price pairs with weak strength

of connectivity at almost all frequency bands and during the entire sample period. Interestingly,

regarding the wavelet coherency maps, another striking finding is the very low interdependency

of money demand with exchange rate and oil price across all frequencies and time periods. In

fact, inside the significance area we observe only blue and light blue islands, which indicates

lack of co-movement between exchange rate, oil price and money demand.

In terms of the phase relation, it is evident that we can highlight a similar lead-lag behaviour in

the short-term (1-4 year frequency band) and long-term (4-8 year frequency band) horizons for

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all the possible pairs emphasized by the phase-difference values, ranging between and

suggesting a cyclical effect (in-phase relation) between the studied variables. This finding

reveals that money demand is positively correlated with all other variables across time and

frequencies, suggesting that real GDP, interest rate, exchange rate, inflation-dinging CPI, oil

price and money demand move in the same directions during a long time period. The exception

is for the period before 2003 at the two frequency bands for the money demand-interest rate pair

and for the period after 2014 at the 4-8 business cycle for the couple money demand-inflation

CPI as the phase-difference values range from to , implying that money demand moves with

an anti-phase phenomenon versus interest rate which leads in the short- and long-term and versus

inflation CPI with CPI leading in the long-term.

Comparing the findings driven by the partial phase relation diagrams with those displayed by the

phase relation diagrams in the short- and long-term horizons and doing robustness checking in

order to control for the effect of several factors on the direction of interdependencies and

causalities when comparing two variables, it is evident that the findings have been changed at the

same frequency bands. This suggests either in-phase (cyclical effects) or anti-phase (anti-cyclical

effects) relations (i.e., the partial phase-differences values lie between and ) during various

periods of times. For instance, looking at the money demand-real GDP pair, for the period 2010-

2016 and at the 4-8 year frequency band, as the values of the partial phase-difference ranging

between and , money demand causes real GDP with a negative sign.

Contrariwise, real GDP causes money demand for the same time period and the same business

cycle regarding the phase relation structure. Further, comparing the findings of the partial phase

19

relation with those of the phase relation shown for the money demand-exchange rate pair in the

long-run (a 4-8 years frequency band) during the period 1999-2008, it is clearly noticeable that

money demand and real GDP co-move with an anti-phase relation in terms of the partial phase-

differences, while the two variables are in-phase in terms of the phase-differences. In addition, if

we look at the money demand-oil price couple for the period 2000-2005 and across the

frequency cycle of 4-8 years, the oil price leads money demand as the partial phase-differences

ranging between and . On the other hand, money demand leads in terms of the phase

relation for both the same period of time and frequencies. Accordingly, one might infer that not

taking into account the partial coherency approach in our case study may drive us to spurious

conclusions. However, performing the partial coherency technique provides valuable information

to policymakers, market participants, and short- and long-term horizon investors.

With reference to the partial coherency diagrams depicted in Figures 2, 3, 4, 5 and 6, we observe

more significant red-yellow islands at all frequency bands during the whole sample under study.

This interesting finding that is inferred from the partial coherency diagrams indicates that the

level of causalities between the different pairs, after eliminating the influence of all other

variables, increase across time and frequencies. Additionally, the most important causality

interplays for the underlined pairs, after controlling for the other variables appeared at the lower

frequencies, which may suggest that short- and long-term investors and market participants pay

greater attention to the dynamics between real GDP, interest rate, exchange rate, inflation

defining CPI and oil prices from one side, and money demand from another side in India.

Furthermore, Figure 2 in connection with the phase and partial phase diagrams displays quite

similar patterns as featured by time-varying pockets of cyclical (in-phase) effects with a positive

20

long-term leading role of real GDP over the whole sample period, as the phase and partial phase-

difference values switching between and zero.

Summing up, in regard to the aforementioned findings of both the coherent structure (the

coherency and phase relation analysis) and the partial coherent structure (the partial coherency

and partial phase relation analysis), one can highlight the following major findings. (i) The

highest (partial) coherence of money demand with the underling variables is shown for the

money demand-real GDP pair. The finding underlines the importance of the transactions motive

for demanding money, which arises from the absence of perfect synchronization of receipts and

payments. It also highlights the significance of demand for assets in liquid forms. This high

dependency appears at lower frequencies, indicating perfect integration and interdependency

between money demand and real GDP.

(ii) Compared to the results of the partial wavelet coherency, the wavelet coherency exhibits

weak common power of interdependency for all the different pairs, except for the money

demand-real GDP pair. However, controlling the effects for all other variables when comparing

two factors leads to prominent results and provide crucial information on the dynamics of the

behaviour of money demand in India towards real GDP, interest rate, exchange rate, inflation

defining CPI and oil prices.

(iii) With respect to the phase structure, it is apparent that in the short- and long-term horizons

there is an in-phase behaviour between the related time series, as the values of the phase-

difference switching between and . Whereas controlling for the effects of all other

21

variables when investigating the two others provides more suitable information in the short- and

medium-terms with the in-phase or the anti-phase patterns.

(iv) At last, overall one may claim that during the entire sample period the nexuses between the

related variables depict a time-varying behaviour across the different time scales and that the

powerful partial coherences are more pronounced in the long-term horizon. Additionally, the

most prominent causal effects between the related variables are concentrated in the C-term, thus

providing us with a high significant long-term impact of changes in oil prices, interest rate,

exchange rate and inflation CPI on money demand.

Figure 2. Wavelet (partial) coherency and phase differences between money demand and real

GDP.

22

Note: In plots (a.1) and (a.2), we have the wavelet coherency (at the top left) and its respective phase relation (at the bottom left). In plots (b.1) and (b.2), we have the partial wavelet coherency (at the top right) and its respective phase relation (at the bottom right). The partial coherency and phase relations between money demand and real GDP are computed after controlling for the effects of interest rate, exchange rate, inflation defining CPI and oil prices. The black contour denotes the 5% statistical significance level. The color code for the coherency spans from blue (low coherency where coherence values are close to zero) to red (high coherency where coherence values are close to one). The phase relation is computed for the four frequency bands. The cone of influence represents the region affected by the edge effects and the values outside this line indicate no statistical significance.

Figure 3. Wavelet (partial) coherency and phase differences between money demand and

interest rate.

Note: Please refer to the notes in Figure 2. The partial coherency and phase relations between money demand and interest rate are computed after controlling for the effects of real GDP, exchange rate, inflation and oil prices.

23

(a.1) Wavelet Coherence(m,er)Pe

riod

1

2

4

8

1999 2002 2005 2008 2011 2014 2017-pi

-pi/2

0

pi/2

pi(a.2) Phase-difference

1~4 f requency band 4~8 f requency band

(b.1) Partial Wavelet Coherence(m,er|r,y,inf,op)

1999 2002 2005 2008 2011 2014 2017

(b.2) Phase-difference

Figure 4. Wavelet (partial) coherency and phase differences between money demand and

exchange rate.

Note: Please refer to the notes in Figure 2. The partial coherency and phase relations between money demand and exchange rate are computed after controlling for the effects of real GDP, interest rate, inflation and oil price.

24

(a.1) Wavelet Coherence(m,inf)Pe

riod

1

2

4

8

1999 2002 2005 2008 2011 2014 2017-pi

-pi/2

0

pi/2

pi(a.2) Phase-difference

1~4 f requency band 4~8 f requency band

(b.1) Partial Wavelet Coherence(m,inf|r,er,y,op)

1999 2002 2005 2008 2011 2014 2017

(b.2) Phase-difference

Figure 5. Wavelet (partial) coherency and phase differences between money demand and

inflation.

Note: Please refer to the notes in Figure 2. The partial coherency and phase relations between money demand and inflation are computed after controlling for the effects of real GDP, interest rate, exchange rate and the oil price.

25

(a.1) Wavelet Coherence(m,op)Pe

riod

1

2

4

8

1999 2002 2005 2008 2011 2014 2017-pi

-pi/2

0

pi/2

pi(a.2) Phase-difference

1~4 f requency band 4~8 f requency band

(b.1) Partial Wavelet Coherence(m,op|r,er,inf,y)

1999 2002 2005 2008 2011 2014 2017

(b.2) Phase-difference

Figure 6. Wavelet (partial) coherency and phase differences between money demand and oil

price.

Note: Please refer to the notes in Figure 2. The partial coherency and phase relations between money demand and oil prices are computed after controlling for the effects of real GDP, interest rate, exchange rate and inflation CPI.

6. Conclusion and policy recommendations

This empirical research aims to investigate the multi-scale lead-lag nexuses between changes in

real GDP, interest rate, exchange rate, inflation defining CPI, oil price changes and changes in

money demand in for the third global oil consumer, India. To this end, we applied two important

econometric methods employed recently in the economic and financial literature: the wavelet

coherency and the partial wavelet coherency. Our major findings can be summed up as follows.

26

First, there is a bi-directional lead-lag causality interplay between changes in real GDP, interest

rate, exchange rate, inflation CPI, oil prices and changes in money demand.

Second, the most pronounced degree of causal interplays for the studied couples occurred in the

long-term horizon (at a 4-8 years frequency band). This may indicate that the effects of oil price

shocks and those of the macroeconomic variables on money demand are not immediate, and they

would also have some periods of time for those shocks to run via the Indian real economy.

Therefore, the effects of changes in oil prices and macroeconomic factors become more visible

when taking into consideration larger time horizons. Additionally, one may claim that the

fluctuations in oil prices and the macroeconomic changes have a minor effect on the Indian

economic activity at shorter time horizons. This important finding may have crucial practical

implications for several economic agents. From the point of view of policy makers, in order to

apply some powerful long-term macro-prudential policies, the timely recognition and

expectations of unfavourable circumstances in the monetary policy and the time of intervention

should be a foremost priority for Indian policymakers and Indian policy authorities. From the

standpoint of investors and portfolio managers, it is recommended that investors and portfolio

managers pay great attention to the fluctuations in oil prices and macroeconomic variables under

consideration, in order to make optimal investment strategies, perform portfolio diversification

decisions and improve the efficiency of their risk management in the long-term horizon.

Third, the results that the high power of the causal interdependency of changes in money

demand versus changes in real GDP, interest rate, exchange rate, inflation CPI and oil prices

occurred at the lower frequencies may suggest that short-/long-term investors, portfolio

managers and market participants pay more attention to the dynamics of the shocks in real GDP,

27

interest rate, exchange rate, inflation, and oil prices and changes in money demand in India in

four to eight years business cycles.

Fourth, it is recommended that investors and decision makers design optimal investment

strategies, make portfolio diversification decisions and enhance their risk-management power, as

well formulate their asset allocation strategies, notably in long-term stock holding periods.

Fifth, at the lower frequencies policy interventions of the Indian authorities should be important

as the real GDP, interest rate, exchange rate, inflation CPI and oil prices are highly connected to

money demand.

Six, finally applying the partial coherency technique to the selected variables has led to

important results, more specifically, at the shorter and medium-term horizons. Accordingly, in

terms of the partial phase relation, the removal of the influence of all other variables when

investigating the interaction of two others led us to accurate findings, indicated by either an in-

phase or anti-phase behaviour, whereas the phase structure is revealed only as an in-phase

pattern of causal effects between the related.

References

Ahmed, E., Rosser Jr, J. B., & Sheehan, R. G. (1988). A global model of OECD aggregate supply and

demand using vector autoregressive techniques. European Economic Review, 32(9), 1711-1729.

Akinlo, A. E. (2005). The stability of money demand in Nigeria: An autoregressive distributed lag

approach. Journal of Policy Modeling, 28, 445–452.

Arif, R. R. (1996). Money Demand Stability: Myth or Reality, an Econometric Analysis. Department of

Economic Analysis and Policy, Reserve Bank of India.

Alsamara, M., Mrabet, Z., Dombrecht, M., & Barkat, K. (2017). Asymmetric responses of money

demand to oil price shocks in Saudi Arabia: a non-linear ARDL approach. Applied Economics,

28

49(37), 3758-3769.

Arango, S., & Nadiri, M. I. (1981). Demand for money in open economies. Journal of Monetary

Economics, 7(1), 69-83.

Bahmani-Oskooee, M. and Bohl, M. (2000), Germany Monetary Unification and the Stability of the

German M3 Money Demand Function. Economics Letters, 66, 203-208.

Bahmani-Oskooee, M. and M.P. Barry, M. P. (2000), "Stability of the Demand for Money in an

Unstable Country: Russia," Journal of Keynesian Economics, 22 (No.4), 619-629.

Bahmani-Oskooee, M., & Wang, Y. (2007). How stable is the demand for money for China. Journal of

Economic Development, 32, 21–33.

Bahmani-Oskooee, M. and Tanku, A., (2006). Black Market Exchange Rate, Currency Substitution

and the Demand for Money in LCDs. Economic system, 30, 249-263.

Bahmani-Oskooee, M. and Rehman, H., (2005). Stability of money demand function in Asian

developing countries. Applied Economics, 37, 773-792.

Bahmani-Oskooee, M., & Gelan, A. (2009). How stable is the demand for money in African

countries?. Journal of Economic Studies, 36(3), 216-235.

Baharumshah A.Z., Mohd S.H., Mansur M. Masih A, (2009).The stability of money demand in China:

Evidence from the ARDL model. Economic systems, 33, 231–244

Ben-Salha, O. and Jaidi, Z., (2014). Some new evidence on the determinants of money demand in

developing countries – A case study of Tunisia. The Journal of Economic Asymmetries, 11, 30–

45

Bhanumurthy, N. R. (2000). Stability of demand for money. Economic and Political Weekly, 35, 25–

31.

Bjørnland, H. C. (2000). The dynamic effects of aggregate demand, supply and oil price shocks—a

comparative study. The Manchester School, 68(5), 578-607.

Boughton, J. M. (1981). Recent instability of the demand for money: an international

perspective. Southern Economic Journal, 579-597.

29

Burbidge, J., & Harrison, A. (1984). Testing for the effects of oil-price rises using vector

autoregressions. International Economic Review, 459-484.

Cheong Tang, T. (2007). Money demand function for Southeast Asian countries: an empirical view

from expenditure components. Journal of Economic Studies, 34(6), 476-496.

Chow, G. C. (1966). On the long-run and short-run demand for money. Journal of Political

Economy, 74(2), 111-131.

Chukwu,J. O., Agu, C. C. and Onah, F. E., (2010). Cointegration and structural breaks in Nigerian

long-run money demand function. International Research Journal of Finance and Economics,

38, 48–56

Darby, M. R. (1982). The price of oil and world inflation and recession. The American Economic

Review, 72(4), 738-751.

Darrat, A. F., & Al‐Sowaidi, S. S. (2009). Financial progress and the stability of long‐run money

demand: Implications for the conduct of monetary policy in emerging economies. Review of

Financial Economics, 18(3), 124-131.

Das, S., & Mandal, K. (2000). Modeling money demand in India: Testing weak, strong & super

exogeneity. Indian Economic Review, 1-19.

Den Butter, F. A., & Fase, M. M. (1981). The demand for money in EEC countries.  Journal of

Monetary Economics,8(2), 201-230.

Dreger, C. and Wolters, J., (2014). Money demand and the role of monetary indicators in forecasting

euro area inflation, International Journal of Forecasting, 30,303–312

Friedman, M. (1956). The Quantity Theory of Money: A Restatement', in M. Friedman (ed.) Studies in

the Quantity Theory of Money, Chicago: University of Chicago Press.

Friedman, M. (1953). Essays in positive economics. University of Chicago Press.

Gabor, D. (1946). Theory of communication. Part 1: The analysis of information. Journal of the

Institution of Electrical Engineers-Part III: Radio and Communication Engineering, 93(26), 429-

30

441.

Girton, L., & Roper, D. (1981). Theory and implications of currency substitution. Journal of Money,

Credit and Banking, 13(1), 12-30.

Gisser, M., & Goodwin, T. H. (1986). Crude oil and the macroeconomy: Tests of some popular

notions: Note. Journal of Money, Credit and Banking, 18(1), 95-103.

Goldfeld, S. M. (1989). Demand for money: empirical studies. In Money (pp. 131-143). Palgrave

Macmillan, London.

Goldfeld, S. M., Duesenberry, J., & Poole, W. (1973). The demand for money revisited.  Brookings

Papers on Economic Activity, 1973(3), 577-646.

Inoue, T., & Hamori, S. (2008). An empirical analysis of the money demand function in India. Institute

of Developing Economies Discussion Paper, 166.

Kareken, J. H., & Wallace, N. (1978). Samuelson's consumption-loan model with country-specific fiat

monies. Staff Report 24, Federal Reserve Bank of Minneapolis, Research Department,

Minneapolis.

Kumar, S. Webber, D. J. and Fargher, S., (2013.a). Money demand stability: A case study of Nigeria.

Journal of Policy Modeling, Volume 35, pp. 978-99.

Kumar, S. and Rao B. B., (2012). Error-correction based panel estimates of the demand for money of

selected Asian countries with the extreme bounds analysis, Economic Modelling, Volume 29,

pp. 1181–1188.

Kumar, S., (2011). Financial reforms and money demand: Evidence from 20 developing countries.

Economic Systems, 35, 323-334

Kumar, S., Chowdhury, M. B., & Rao, B. B. (2013.b). Demand for money in the selected OECD

countries: a time series panel data approach and structural breaks. Applied Economics, 45(14),

1767-1776.

Lungu, M., Simwaka, K., Chiumia, A., Palamuleni, A., & Jombo, W. (2012). Money demand function

for Malawi: implications for monetary policy conduct. Banks and Bank Systems, 7(1), 50-63.

31

Helmi Hamdi, Ali Said2 and Rashid Sbia3 (2015), Empirical Evidence on the Long-Run Money

Demand Function in the Gulf Cooperation Council Countries, International Journal of

Economics and Financial Issues, 2015, 5(2), 603-612.

Hamilton, J. D. (1983). Oil and the macroeconomy since World War II.  Journal of political

economy, 91(2), 228-248.

Hamori, S., (2008). Empirical Analysis of the Money Demand Function in Sub-Saharan Africa.

Economics bulletin, 15, 1-15

Hamori Shigeyuki and Hamori Naoko, (2008). Demand for Money in the Euro Area. Economic

System, 32, 274-284

Hossain, A. A. (2010). Monetary targeting for price stability in Bangladesh: How stable is its money

demand function and the linkage between money supply growth and inflation?. Journal of Asian

Economics, 21(6), 564-578.

Hueng, C. J. (2000). The impact of foreign variables on domestic money demand: Evidence from the

United Kingdom. Journal of Economics and Finance, 24(2), 97-109.

McKinnon, R. I., Radcliffe, C., Tan, K. Y., Warga, A. D., & Willett, T. D. (1984). International

influences on the US Economy: Summary of an exchange. The American Economic

Review, 74(5), 1132-1134.

Miles, M. A. (1978). Currency substitution, flexible exchange rates, and monetary independence.  The

American Economic Review, 68(3), 428-436.

Mohanty, D., & Mitra, A. K. (1999). Experience with monetary targeting in India.  Economic and

Political Weekly, 123-132.

Mundell, R. (2000). Currency areas, exchange rate systems and international monetary reform. Journal

of Applied Economics, 3(2), 217-256.

Mundell, R. A. (1971). Monetary theory: inflation, interest, and growth in the world economy (No. 332

MUN).

Narayan, P. K. (2007). Is money targeting an option for Bank Indonesia?. Journal of Asian Economics,

32

18(5), 726-738.

Nell, K. S. (2003). The stability of M3 money demand and monetary growth targets: The case of South

Africa. Journal of Development Studies, 39, 151–180.

Nwafor, F., Nwakanma, H., Nkansah, P., & Thompson, F. (2007). The quantity theory of money in a

developing economy: Empirical evidence from Nigeria. African Economic and Business

Review, 5, 1–9.

Owoye, O. and Onafwora, O., (2007). M2 Targeting, Money Demand and Real GDP Growth in

Nigeria. Journal of business and public affairs, 1(2), 1-20.

Payne, J. E. (1992). Money growth and interest rate volatility and the demand for money. Journal of

Economics and Finance, 16(1), 103-114.

Percival, D.B., and Walden, A.T. (2000). Wavelet Methods for Time Series Analysis. Cambridge

University Press, Cambridge.

Poole, W. (1970). Optimal choice of monetary policy instruments in a simple stochastic macro

model. The Quarterly Journal of Economics, 84(2), 197-216.

Sahin, A. (2013). Estimating money demand function by a smooth transition regression model: an

evidence for Turkey.  Working Papers 791, Economic Research Forum.

Shin, Y., Yu, B., & Greenwood-Nimmo, M. (2014). Modelling asymmetric cointegration and dynamic

multipliers in a nonlinear ARDL framework. In Festschrift in Honor of Peter Schmidt (281-

314). Springer, New York, NY.

Siddiki J., (2010). Demand for money in Bangladesh: a cointegration analysis, Applied Economics, 32,

1977-1984.

Singh, P., and M. K. Pandey. (2009). “Structural Break, Stability and Demand for Money in India”.

ASRC Working Paper 2009/07.

Sriram, S. S. (2002). Determinants and stability of demand for M2 in Malaysia. Journal of Asian

Economics, 13(3), 337-356.

Ramachandran, M. (2004). Do broad money, output, and prices stand for a stable relationship in

33

India?. Journal of Policy Modeling, 26(8-9), 983-1001.

Rao, B. B. and Kumar S., (2009.b). A panel data approach to the demand for money and the effects of

financial reforms in the Asian. Economic Modelling, Vol. 26, pp. 1012-1017

Rao, B. B., & Kumar, S. (2009.a). Cointegration, structural breaks and the demand for money in

Bangladesh. Applied Economics, 41(10), 1277-1283.

Rao, B. B. F., & Bajpai, D. K. (1995). The relationship between the price level, money and output in

India. Sydney: University of New South Wales.

Rao, M. R., & Ramachandran, R. (2003). The stability of relationship between M3 money, output and

prices in India. In Proceedings of the 39thAnnual Conference of Indian Econometric Society.

Rose, A. K. (1985). An alternative approach to the American demand for money.  Journal of Money,

Credit and Banking, 17(4), 439-455.

Yu, H. and Pei-Tha G., (2009). An empirical analysis of the money demand function in ASEAN-5.

International Research Journal of Finance and Economics, 33, 1450-2887

34