INNOVA Research Journal, ISSN 2477-9024

Methane emissions, economic growth and agriculture: evidence of

environmental kuznets curve for Argentina

Emisiones de metano, crecimiento económico y agricultura: evidencia de la

curva ambiental de kuznets para Argentina

Jessica Lissette Sánchez Cruz

Luis Eduardo Solis Granda

Manuel Leonardo Perrazo Viteri

Universidad Estatal de Milagro-UNEMI, Ecuador

Autor para correspondencia: lsolisg@unemi.edu.ec; mperrazov@unemi.edu.ec;

jsanchezc5@unemi.edu.ec

Fecha de recepción: 10 de abril de 2018 - Fecha de aceptación: 15 de septiembre de 2018

Abstract: This paper provides evidence of the existence of an Environmental Kuznets Curve

(EKC) in the long-run for Argentina from 1970 to 2012 which is the country with most production

of meat in the region. There is a dynamic relationship between methane emissions, economic

growth and agriculture activities. The autoregressive distributed lag methodology was used to test

for cointegration in the long-run. Furthermore, we used the vector error correction model to test

for causality and to verify the predictive value of independent variables. In fact, a quadratic

relationship was found between methane emissions and economic growth. The effect of agriculture

was the only unexpected, and that is because the reduction of methane emissions thanks to suitable

policies related to the use of technology in agriculture activities.

Key words: environmental kuznets curve; ardl; Argentina; methane emissions, gdp; agriculture

JEL Code: C32, Q01, Q50, Q51, Q56

Resumen: Este documento proporciona evidencia de la existencia de una curva ambiental de

Kuznets (EKC) a largo plazo para Argentina desde 1970 hasta 2012, que es el país con mayor

producción de carne en la región. Existe una relación dinámica entre las emisiones de metano, el

crecimiento económico y las actividades agrícolas. La metodología de retraso distribuido

autorregresivo se utilizó para probar la cointegración a largo plazo. Además, utilizamos el modelo

de corrección de errores vectoriales para probar la causalidad y verificar el valor predictivo de las

variables independientes. De hecho, se encontró una relación cuadrática entre las emisiones de

metano y el crecimiento económico. El efecto de la agricultura fue el único inesperado, y esto se

debe a la reducción de las emisiones de metano gracias a políticas adecuadas relacionadas con el

uso de la tecnología en las actividades agrícolas.

Palabras clave: curva de kuznets ambiental; ardl; argentina; emisiones de metano; pib; agricultura

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Introduction

The Kuznets Curve was proposed by Simon Kuznets in 1955. He found that there was an

existence of a quadratic relationship between economic growth and income inequality. Inequality

rises up along with economic growth until a turning point in which the trend inverts (Kuznets,

1

955). The same explanation was used to describe the environmental degradation relating a Green

House Gases (GHG) such as carbon dioxide (CO2), methane (CH4) or Nitrous Oxide (N2O) with

an economic growth variable such as Gross Domestic Product. As long as a country increases its

gross domestic product, its GHG emissions will increase as well, until a turning point in which

technology makes a country more efficient in the way the anthropogenic activities are done and

the emissions of those gases start to reduce (Kraft and Kraft, 1978).

Since Kuznets discovery, several different countries were studied to provide empirical

evidence of the existence of an EKC. Besides GDP, other variables related to environmental

degradation were included in the models over time, including foreign trade (Hossain, 2011),

urbanization (Zhang and Cheng, 2009) and energy consumption (Saboori and Sulaiman, 2013).

There are few studies that demonstrate an EKC with a methane emissions and GDP per

capita relationship, but in this paper we are going to show that GDP per capita and agriculture have

an inverted U-shaped relationship.

As shown in figure 1, methane emissions are the second largest GHG emissions in the

world (IPCC, 2014),and they are principally generated as a result of agriculture and livestock

farming activities. Argentina is one of the largest producers of meat in the region (INTA, 2014)

with around 51 million cattle. Agriculture is the third principal economic activity in Argentina,

accounting for around 10% of the total gross domestic product (MECON, 2012).

Those are the reasons that motivate us to study the Argentinian case and found the existence

of an EKC for the period of 1970 to 2012.

Figure 1: Total annual anthropogenic GHG emissions by gases 1970–2010

Source: IPCC, 2014

The methodology used is an autoregressive distributive lag (ARDL) bounds testing

approach to cointegration with a series time analysis from 1970 to 2012. Results show an EKC for

the short-run as well as for the long-run. As expected, agriculture is statistically significant;

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however, in the long run has a negative impact on emissions, due to Argentinian environmental

policies and the incremental technology used for those activities.

The rest of the paper is organized as follows: Section 2 explains the environmental and

economic situation of Argentina. Section 3 defines the theoretical and modeling framework.

Section 4 presents the methodology to be used. Section 5 shows the empirical results. Section 6

concludes.

Argentine Context.

Argentina is a South American country with a population of 41.45 million people, of which

almost 10% are rural population (WBG, 2013). Argentina is the third largest economy in South

America, just behind Brazil and Chile. Its average growth rate of real gross domestic product

(GDP) per capita was 2.55% between 1980 and 2012, as shown in figure 2 (MECON, 2012).

Argentina has a Gini coefficient of 0.423 (WBG, 2013) and a Score of 0.836 in human

development (United Nations Development Program, 2014). Both scores are improving over time,

illustrating the improvement in Argentinian living conditions as a result of economic growth.

Figure 2: Graphic representations of GDP pc, Gini Index, HDI and Methane emissions for Argentina

In the environmental context, Carbon Dioxide (Co2) is the GHG most produced because

of the human activity, but in this paper we’re going to focus on the second GHG most emitted,

methane (CH4). Methane, in general, is generated as a result of anthropogenic activities,

principally agriculture. According to the World Bank Group data, Argentina and Brazil produce

the most meat in the region, and also emit the most methane from livestock farming activities.

Agriculture and livestock farming contribute 44% of total GHG emissions in the country,

just behind the energy sector (Berra, 2000) with 48% of total methane emissions. Of the total GHG

emissions, 30% comes from livestock farming, and 95% of that comes from cattle (IICA, 2015).

Livestock farming contributes to the methane emissions from enteric fermentation and excretions

of animals. These last two are also a source of nitrous oxide, just as nitrogen-fixing fodder. In

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agricultural activities, these emissions occur as a result of nitrogen-fixing crops, including

soybeans and Stubble. Commercial fertilizers also contribute to the emission of nitrous oxide,

while rice cultivation generates methane emissions. Finally, burning Stubble produces nitrous

oxide emissions, other nitrogen oxides, carbon monoxide and methane.

Even though methane is the second largest GHG in Argentina, its emissions have been

reduced as a result of an increase in the technology used in agriculture and livestock farming, as

shown in figure 2.Argentina had to apply Innovative processes and change macroeconomics

policies in order to let the rural population to begin a process of economic and productive recovery.

This growth is accompanied by sustainable development policies for agricultural and rural sector.

The Agri-Food and Agribusiness Strategic Plan (PEA2) and the Smart Agriculture Plan (AI) were

created in order to generate a more efficient, competitive and sustainable production. Promoting

smart agriculture involves developing active policies in the agricultural sector to harmonize

production and environmental systems, while at the same time representing the Argentine

government's response to the challenge of food security in the context of climate change.

Theoretical and modeling framework

The EKC hypothesis indicates that the relationship between economic growth and

environmental degradation has an inverted U shape.In the short-run, the economic growth of a

country has a negative impact on the environment seen in the rising part of the curve; but in the

long-run, when the economy reaches its highest point of income, known as the turning point, the

curve descends, illustrating the positive impact of economic growth on the environment.

The model is structured as follows

Ln (Et)=β_(0 )+ β_1 Ln(Yt)+β_2 〖(Ln (Yt))〗^2+ β_3 〖(Ln (Yt))〗^3+β_4 Ln 〖(Z〗_t)+μt

Where the dependent variable is an indicator of environmental contamination measured in

logarithms, β0, β1, β2, β3 are the parameters to be estimated, Y is the per capita income in

logarithms, Z is the vector of additional variables, also measured in logarithms and finally μ is the

error term.

This work suggest in the equation 1 that methane emissions (CH4) depend on GDP, square

of GDP (GDP^2) and the agriculture (AGRI) for the period 1970-2012 in the case of Argentina.

〖

CH〗_4=f(GDP,〖GDP〗^2, AGRI)

(1)

The model would be as follows:

Ln (〖CH〗_4) =β_ (0) + β_1 Ln (GDP) +β_2 〖 (Ln (GDP)) 〗^2+β_3 Ln (AGRI) +μt

2)

(

The theory suggests that in order to get an EKC, this should have the following relationship:

〖

β〗_1> 0, β_2<0 which have the shape of an inverted U. It is expected thatβ_GDP>0 andβ_

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(GDP^2) <0; the sign of β_AGRI>0 if we assume that activities concerning agriculture are handled

without any significant technological improvement during the period analyzed.

The data on all variables come from World Development Indicators (WDI). The methane

emissions (〖CH〗_4) is proxied by Methane emissions (kt of CO2 equivalent), the GDP per

capita (constant 2005 US$) and AGRI is for Agriculture, value added (% of GDP).

Methodology

ARDL Bounds Testing of Cointegration

The application of the ARDL bounds testing approach to cointegration developed by

Pesaran and Pesaran (1997), Pesaran et al. (2000, 2001) allows us to examine the long-run

relationship between methane emission, economic growth and the agricultural.

The methodology used is the Auto regressive model with distributed lags which was

proposed by Pesaran et al. (2001), which provides better results for small samples as proposed by

Haug (2002), less than 50 data samples, such as the proposed case. This model also can be applied

without investigation the order of integration, but a requirement is that they should not be at second

difference I(2). The ARDL model provides better results with this type of samples, compared to

traditional approaches to cointegration, like Engle and Granger Granger (1987), Johansen and

Juselius (1990) and Phillips and Hansen (1990). Laurenceson and Chai (2003) affirm that another

advantage of ARDL limit testing is that the model is not restricted model error correction (ECM),

and has sufficient flexibility to accommodate lags that capture the data generating process in a

general framework of specification.

The unrestricted model is indicated as follows:

∆

ln 퐶퐻 = 훼 + 훽_퐺_퐷_푃푙푛ꢀꢁꢂ_푡₋₁+ 훽

2

푙푛ꢀꢁꢂ^ꢃ

+ 훽

푙푛ꢄꢀꢅꢆ_푡₋₁

퐴퐺푅퐼

푚

4푡

0

퐺퐷푃

푡−1

푝

푞

+

∑ 훼 ∆푙푛퐶퐻

+ ∑ 훼 ∆푙푛ꢀꢁꢂ + ∑ 훼 ∆푙푛ꢀꢁꢂ^ꢃ

4푡−푖 푗 푡−푗 푘

푡−푘

푖

푖ꢇ1

ꢉ

푗ꢇ0

푘ꢇ0

+

∑ 훼 ∆푙푛ꢄꢀꢅꢆ + 휇_푡

(3)

ꢈ

푡−ꢈ

ꢈ

In order to determine whether there is cointegration of the variables, it is necessary to use

the critical values tabulated by Pesaran et al. (2001), where the null hypothesis of no cointegration

is β_GDP=β_(GDP^2 )=β_AGRI=0 and the alternative hypothesis that represents cointegration of

the variables is β_GDP≠β_(GDP^2 )≠β_AGRI≠0. With this, we can obtain the F-calculated which

is compared with the upper and lower critical bound values from Pesaran et al. (2001). Another

option is to use the critical values proposed by Narayan (2005) as these are more appropriate for

small samples, as in our case. If the value of F-calculated exceeds the critical value, then we have

evidence that the variables are cointegrated. On the other hand, if the F-statistic is less than the

critical value, we cannot reject the null hypothesis of no cointegration. Finally, if the calculated F-

statistic is between lower and upper critical bounds, the cointegration decision is not conclusive.

If the null hypothesis of no cointegration is rejected, the behavior of the variables in the short-run

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will be captured by the error correction term 〖 (ECT〗_ (t-1)) incorporated in equation 3as

follows:

푝

푞

푚

∆

ln 퐶퐻 = 훿 + ∑ 훿 ∆푙푛퐶퐻

+ ∑ 훿 ∆푙푛ꢀꢁꢂ + ∑ 훿 ∆푙푛ꢀꢁꢂ^ꢃ

4푡−푖 ꢃ푗 푡−푗 ꢊ푘

푡−푘

4푡

1

1푖

푖ꢇ1

ꢉ

푗ꢇ0

푘ꢇ0

+

∑ 훿 ∆푙푛ꢄꢀꢅꢆ

4ꢈ 푡−ꢈ

ꢈ

훾퐸퐶푇_푡₋₁+휇_푡

(ꢋ)

The coefficient of ECT (γ) indicates the speed of adjustment and shows how quickly the

variables return to the long-run equilibrium (Masih and Masih, 1997), that coefficient should be

negative and significant.

Finally, diagnostic tests are performed to check the suitability of the model, including the

Jarque-Bera normality test, Breusch-Godfrey serial correlation LM test, ARCH hetoscedasticity

test, Ramsey RESET test and cumulative sum/- squared (CUSUM/CUSUMSQ) test.

Causality Analysis

The presence of cointegration between variables implies that the causal relation must exist

at least in one direction; the ARDL model does not show what the causality direction is. In order

to explain the causality in the short run and long run of the variables it is necessary to apply a

vector error correction model (VECM) to examine for cointegrated variables.

VECM permits to analyze two forms of causality. One of them is the short-run causal

relationship and the other one is the long-run causal relationship. It is necessary, in order to get a

short-run granger-causal relationship, for the lagged differenced explanatory variables to be

significant. To get a long-run granger causal relationship, it is necessary for the lagged ECT to be

significant, as well. (Masih and Masih, 1996).

In this case, Estimate the residuals of the long-run model as a proxy of the ECT is the first

step. Then, as a second step, we need to estimate the VECM as follows:

∆

ln 퐶퐻₄_푡

ꢀꢁꢂ_푡

휇₁

^휏11,1 ^휏1ꢃ,1

휏 휏

1ꢊ,1 14,1

ꢌ

⌊

ꢍ

휇

ꢃ

휏

휏_ꢃ_ꢃ_,₁

휏

=

[ ] + ꢎ ꢃ1,1

ꢃꢊ,1 ꢃ4,1ꢏ

ꢃ

휇

ꢊ

∆

ꢀꢁꢂ

푡

ꢍ

^휏ꢊ1,1 휏_ꢊ_ꢃ_,₁

휏

ꢊꢊ,1 ꢊ4,1

휇₄

∆ꢄꢀꢅꢆ ⌋

푡

∆

ln 퐶퐻₄_푡₋₁

휎₁

휗₁

ꢌ

⌊

ꢍ

ꢀꢁꢂ_푡₋₁

ꢀꢁꢂ^ꢃ

휎

휗

ꢃ

+

[ ] 퐸퐶푇 + ꢐ ꢑ

휎

푡−1

∆

ꢊ

휗ꢊ

푡−1

ꢍ

^휎4

∆ꢄꢀꢅꢆ_푡₋₁

⌋

^휗4

Where the vector of ϑ t's is white noise.The σkare interpreted as the speed of adjustment

which represent the response of the dependent variable to deviations from the long-run

equilibrium.

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Empirical Results

According to Ouattara (2004), if a variable is integrated into I (2), then the F-statistic for

the cointegrating is inconclusive.It is necessary that the variables become stationary until I(1). We

use the ADF unit root test to check the stationarity of our variables. The results show that there are

not unit root problems. Table 1 indicates that all variables are non-stationary at level, but these

become stationary at the first difference.

The selection of the maximum lag length for each variable has been determined using the

SIC (Schwarz information criteria) in which the minimum value is taken. Table 2 presents several

of the combination sets of lags, including the one chosen for the model (1, 0, 0, 1).

The next step is the calculation of F-statistic cointegration, as shown in Table 3. The results

indicate that the calculated value is above the upper bound of 3.454 obtained through critical values

proposed by Narayan (2005). It is concluded thata cointegration relationship exists between

methane emissions, GDP, 〖GDP〗_2 and AGRI, when methane emissions is the dependent

variable. Table 3 also shows the results of the respective diagnostic tests.

The long-run estimates are reported in Table 4. The results show that the coefficients of the

variables are significant. While the values for GDP and GDP_2are the expected, the AGRI

coefficient is contrary to the expected. In this case heteroskedasticity and serial autocorrelation

was detected; we will work with robust errors of white and residues laggards one period to deal

with both problems respectively. All the coefficients are significant at 1%. The estimations in the

long-run show the existence of an EKC in Argentina. The methane emissions increase when

income does, until a turning point and then the emissions start to decrease while income continues

to rise.The long-run elasticity between methane missions and agriculture is -0.058%. This means

that a 1% rises in agriculture, the methane emissions decrease by -0.058%.

The short-run model is shown in Table 5. The AGRI variable is significant at 1% as the

error correction term, wherein the coefficient of the latter is shown negative; this confirms the

existence of the cointegrating equation. Moreover, the coefficient of ECT means that the

deviations from equilibrium methane are corrected by 28.18% within a year.

The causality based on VECM is reported in Table 6. There are two portion of this table.

The first portion is showing the short- run causality (F-statistic). The second portion presenting

the long-run causality indicated through significance of ECT (t-statistic). The short run causal

effects revealed that the agriculture is the only variable that has effect on methane emissions, The

short run causal effects revealed that the agriculture is the only variable that has effect on methane

emissions, while in the long run the results indicate that there is a bidirectional causality in all

variables.

To verify this, the variance decomposition was implemented, Table 7 shows the results

which indicates that; a change in one standard deviation in GDP, GDP2 and AGRI represents a

shock of the 26.23%, 22.10% and 30.71% respectively in CH4 emissions. Given that these shocks

are higher if it was contrary (0.23%, 0.22%, 10.52%), then there is an unidirectional Granger

causality of the variables to CH4.

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The CUSUM and CUSUMQ are used to check the stability of the coefficients for the short

and long-run. Figures 2 and 3 show that the coefficients are stable with a significance level of 5%.

The results suggest that the model can be used for policy proposal.

Table 1: Unitroot test

Variable

T-Statistics

P value*

ADF test at level with intercept and without trend

Ln CH4t

LnGDPt

Ln GDPt2

LnAGRIt

-2.0837

-0.6068

-0.5588

-2.8324

0.252

0.8580

0.8687

0.0624

ADF test at first difference with intercept and without trend

Δ Ln CH4t

Δ LnGDPt

Δ Ln GDPt2

Δ LnAGRIt

-4.9075

-5.0591

-5.0375

-6.6400

0.0002

0.0000

*MacKinnon (1996) considered P values

Table 2: Lag Length selection criteria

Lagcombination

SIC

F-statistic

2.1388

2.170226

2.785578

2.97092

2.475947

3.529861

2.555225

3.005556

4.021315**

2.960585

P value

(

2.2.2.2)

2.0.1.0)

2.0.0.2)

2.0.0.1)

2.0.0.0)

1.1.1.1)

1.0.1.0)

1.0.0.2)

1.0.0.1)

1.0.0.0)

-4.085603

-4.256634

-4.344973

-4.40326

-4.345665

-4.415757

-4.302162

-4.409142

-4.520785

-4.391765

0.0468

0.0507

0.014012

0.010657

0.030139

0.003156

0.025157

0.00998

0.001729

0.013467

SIC: Schwarz information criteria, **indicates statistical significance at 5% level

Table 3: Cointegrationtestsresults

Boundstesting to cointegration

Estimatedequation

Optimallagstructure

F-statistics

CH4=f(GDP, GDP2, AGRI)

SIC: Schwarzinformationcriteria

3.532992***

Diagnosticcheck

R2

Adjusted-R2

F-statistics (P)

J-B Normality test

Breusch-Godfrey LM test [2]

0.5386

0.4047

4.0213

0.6934

1.5870

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ARCH LM test [2]

Ramsey RESET

CUSUM

0.6309

0.8098

Stable

CUSUMSQ

*

** The significant at 10% level. The optimal structure is determined by SIC

SIC: Schwarzinformationcriteria

Table4: Long run estimates

Dependent variable=Ln CH4t

Variable

Coefficient

Standard error

6.6444

T-statistic

-1.089042

2.933441*

-3.03114*

-3.702024*

Constant

-7.2360

4.5249

LnGDPt

1.5425

Ln GDP2t

-0.27157

-0.058341

0.089593

0.015759

LnAGRIt

Diagnosticcheck

R-squared

0.816254

-4.6340

-4.4272

41.0913

1.61607

1.2463

Akaikeinfocriterion

Schwarzcriterion

F-statistic

Durbin–Watson

Serial correlation LM [2]

ARCH test [2]

Normality test

Ramsey RESET test

0.0846

1.1439

0.4262

*1% level of significance

Table 5: Short run estimates

Dependent variable=Δ Ln CH4t

Variable

Coefficient

Standard error

0.003091

3.390862

0.199407

0.017582

0.085189

T-statistic

0.49142

0.379037

-0.363845

-1.530678

-3.308902*

Constant

Δ LnGDPt

Δ Ln GDPt2

Δ LnAGRIt

ECT(-1)

0.001519

1.285262

-0.072553

-0.026913

-0.281883

Diagnosticchecks

R-squared

0.491924

-4.988632

-4.696071

5.486531

1.903009

0.4643

Akaikeinfocriterion

Schwarzcriterion

F-statistic

Durbin–Watson

Serial correlation LM [2]

ARCH test [2]

Normality test

0.0222

0.3433

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Ramsey RESET test

1% level of significance

0.5945

*

Table 6: Causality results based on VECM.

Variable

Short Run (F-stat.)

Long run (t-stat.)

ECT

Δ ln(CH4)

Δ ln(GDP)

0.851638

4.075853)

Δ ln(GDP2)

0.870510

(0.240178)

2.766037

(0.639166)

-

Δ ln(AGRI)

15.41688***

(0.018777)

0.024518

(0.049969)

0.025557

(0.847712)

-

Δ ln(CH4)

Δ ln(GDP)

Δ ln(GDP2)

Δ ln(AGRI)

-

-2.132135**

(0.079872)

3.077004***

0.252556

(

3.794231

-

(

0.388378)

3.956387

2.752860

(184.0129)

0.000897

3.094094***

3.605982

(

6.588783)

0.939578

0.003157

-2.422722**

0.660550

(

1.206945)

* Significance at 5% level.

** Significance at 1% level.

(33.70782)

(1.986306)

*

Table 7: Error VarianceDecomposition

Variance Decomposition of Δln(CH4):

Period

S.E.

Δ ln(CH4)

100

Δ ln(GDP)

0

Δ ln(GDP2)

0

Δ ln(AGRI)

1

2

3

4

5

6

7

8

9

0.017924

0.025177

0.027707

0.030826

0.034713

0.039347

0.044972

0.051341

0.058277

0.065763

0

88.81764

85.75045

77.24769

65.94547

53.78145

42.47137

33.36988

26.35869

20.96539

0.014629

4.236748

10.8478

15.15791

18.36229

21.01229

23.16881

24.9032

26.22884

7.425548

6.785603

6.644078

8.530882

11.75429

15.28986

18.19393

20.39408

22.10349

3.742183

3.227198

5.260431

10.36573

16.10197

21.22648

25.26738

28.34403

30.70228

1

0

Variance Decomposition ofΔln(GDP):

Period

S.E.

Δ ln(CH4)

1.563922

1.027026

0.714228

0.655445

0.554025

0.44595

Δ ln(GDP)

98.43608

92.07062

81.57238

67.73927

56.40919

49.53755

45.51527

42.92245

Δ ln(GDP2)

0

Δ ln(AGRI)

0

1

2

3

4

5

6

7

8

0.052967

0.08043

0.097611

0.115068

0.132993

0.149031

0.163801

0.178447

0.589216

2.705943

8.614837

14.96274

19.17593

21.70486

23.28829

6.313138

15.00745

22.99045

28.07405

30.84058

32.41067

33.47794

0.369199

0.311324

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9

1

0.193417

0.20885

0.265764

0.228767

41.00211

39.42088

24.37428

25.21497

34.35784

35.13538

0

Variance Decomposition of Δln(GDP2):

Period

S.E.

Δ ln(CH4)

1.522484

1.051577

0.736277

0.651917

0.541912

0.433508

0.357789

0.301136

0.256776

0.220851

Δ ln(GDP)

98.45155

91.77875

81.07585

67.13369

55.7987

Δ ln(GDP2)

0.02597

Δ ln(AGRI)

0

1

2

3

4

5

6

7

8

9

0.89965

1.37085

1.668548

1.972737

2.2856

0.792375

3.071479

9.100331

15.45998

19.63881

22.12314

23.66076

24.70324

25.5043

6.377295

15.11639

23.11406

28.19941

30.9681

32.53871

33.60297

34.47663

35.24587

2.566035

2.824543

3.080823

3.34263

3.6124

48.95958

44.98036

42.43513

40.56335

39.02898

1

0

Variance Decomposition of Δln(AGRI):

Period

S.E.

Δ ln(CH4)

3.651318

6.481976

6.827817

7.68437

Δ ln(GDP)

0.68262

Δ ln(GDP2)

17.82866

12.27059

13.41201

15.83099

18.44538

19.85527

19.93336

19.67769

19.56565

19.63535

Δ ln(AGRI)

77.8374

1

2

3

4

5

6

7

8

9

0.163402

0.197369

0.203531

0.208048

0.215282

0.220193

0.222258

0.223702

0.225526

0.228005

9.538751

11.42669

11.0265

71.70868

68.33348

65.45814

61.41675

58.8075

8.958847

9.68185

11.17903

11.65538

12.23311

12.65993

12.97685

13.33153

10.08876

10.36469

10.50875

10.51623

57.74477

57.29769

56.94875

56.51688

1

0

Figure3: Plot of cumulative sum of recursive residuals

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1

0

.4

.2

.0

.8

.6

.4

.2

.0

-

0.2

0.4

-

1

980

1985

1990

1995

2000

2005

2010

CUSUM of Squares

5% Significance

Figure 4:Plot of cumulative cum of squares of recursive residuals

Conclusion and policy implications

The objective of this paper was to empirically examine the short-run and long-run

relationships of methane emissions, GDP per capita, and agriculture in Argentina for the period of

1

970-2012. Using the ARDL model proposed by Pesaran et al, (2001) we observed that the

coefficients of the variables GDP and 〖GDP〗^2 were positive and negative respectively,

suggesting the existence of an inverted curve U-shape. Assuming that there is indeed an

Environmental Kuznets Curve (EKC) in Argentina, and considering the publication of Stern et al.

(1996), we cannot conclude that economic growth can improve the environment, but we should

consider policies that have been established in Argentina to achieve sustainable development.

Contrary to expectations, the coefficient of agriculture variable was negative; this can be

justified with the technological innovations employed in the agricultural sector in this country, the

Agri-Food and Agribusiness Strategic Plan (PEA2) and the Smart Agriculture Plan (AI).

Countries whose economic policies induce a rapid expansion of income and employment may

experience serious environmental damage unless appropriate environmental regulations are taken

Dasgupta (2002). Martin (2002) came to the same conclusion, that the Environmental Kuznets

Curve can only be expected when the respective measures are taken.

The existence of ECK in Argentina shows changes of a growing economy in which

appropriate technologies have been implemented to reduce the environmental impact.

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