WPS8070 Policy Research Working Paper 8070 Fuel Efficiency Versus Fuel Substitution in the Transport Sector An Econometric Analysis Gal Hochman Govinda R. Timilsina Development Research Group Environment and Energy Team May 2017 Policy Research Working Paper 8070 Abstract The transport sector offers limited options to reduce green- analysis shows, like many previous studies, that an increase house gas emissions as compared with other sectors, such as in fuel prices would not have a large effect on transport power generation and industrial sectors. To understand the sector carbon dioxide emissions, due to limited substitution potential reduction of energy consumption and associated possibilities among fuels for transportation. The study also emissions through fuel substitution or transportation service finds that price-induced changes that lead to an increase demand reduction, this study estimates own- and cross- in the rate of adoption of fuel-efficient vehicles would price elasticities of various fuels used for transportation. The be more effective than a policy to cause fuel substitution. This paper is a product of the Environment and Energy Team, Development Research Group. It is part of a larger effort by the World Bank to provide open access to its research and make a contribution to development policy discussions around the world. Policy Research Working Papers are also posted on the Web at http://econ.worldbank.org. The authors may be contacted atgtimilsina@worldbank.org. The Policy Research Working Paper Series disseminates the findings of work in progress to encourage the exchange of ideas about development issues. An objective of the series is to get the findings out quickly, even if the presentations are less than fully polished. The papers carry the names of the authors and should be cited accordingly. The findings, interpretations, and conclusions expressed in this paper are entirely those of the authors. They do not necessarily represent the views of the International Bank for Reconstruction and Development/World Bank and its affiliated organizations, or those of the Executive Directors of the World Bank or the governments they represent. Produced by the Research Support Team Fuel Efficiency Versus Fuel Substitution in the Transport Sector: An Econometric Analysis* Gal Hochman and Govinda R. Timilsina† Keywords: emission intensity, fuel switching, cross-price elasticity, own-price elasticity, transportation sector JEL Code: Q4 * The authors would like to thank Scholastica Okoye for research assistantship, and Jon Strand, Sam Asher and Mike Toman for their valuable comments and suggestions. The views and interpretations are of authors and should not be attributed to the World Bank Group. Financial support from the Knowledge for Change (KCP) Trust Fund of the World Bank is acknowledged. † Gal Hoachman (gal.hochman@rutgers.edu) is an Associate Professor at Department of Economics, Rutgers University, New Jersey and Govinda Timilsina (gtimilsina@worldbank.org) is a Senior Economist, Development Research Group, World Bank; Washington, DC 1. Introduction Fossil fuels are the main anthropogenic source of greenhouse gas (GHG) emissions, and the transportation sector (including international aviation and marine transportation) contributes almost one-fourth of the current global GHG emissions from energy consumption and production activities (IEA, 2016b). More than 90% of the world’s transportation fuels is supplied by petroleum-based sources (IEA, 2016a). Unlike other sectors, such as power generation and industry, opportunities to substitute petroleum with other fuels are more limited in the transportation sector. The lower fuel substitution possibility leaves fewer options to respond to a fuel price increase: reducing demand in the short-run and adopting more energy efficient vehicles (i.e., vehicles that give higher kilometers per liter of fuel use) in the long-run. The latter is an outcome of technological change (Gales et al., 2007; Liao et al., 2007; Ma & Stern, 2008; Metcalf, 2008). In the long-run, drivers could also exercise fuel substitution potential through vehicle switching, for example, replacing gasoline-driven vehicles with diesel-driven vehicles if transport cost with diesel is lower as compared to that of gasoline. They can also use public transportation (bus, train) instead of driving cars. Some substitution of gasoline vehicles with compressed natural gas (CNG) vehicles has occurred in many countries, including developing countries, such as India, Pakistan and Bangladesh (Timilsina and Shrestha, 2009). However, the analysis of this paper suggests that the substitution of gasoline-driven vehicles with CNG-driven ones is mainly caused by policies (e.g., government mandates in India, heavy subsidies to natural gas in Pakistan and Bangladesh) rather than market forces. 2 The substitution possibilities among fuels is the key driver to a successful implementation of market-based policy instruments in reducing GHG emissions from the transportation sector. This is because the higher are substitution possibilities among the transportation fuels, the larger would be the efficacy of market-based instruments. The substitution possibilities between fuels or between modes of transportation can be measured in terms of elasticity of substitutions. In addition, by comparing estimates of partial elasticities of substitution (a measure of fuel switching) with that of total elasticities of substitution (a measure of both fuel switching as well as changes in total fuel use), the importance of alternative market mediated policies can be evaluated. The benefits of a policy that affects the relative prices of fuels, and thus drives fuel-switching, can be compared with those of a policy that promotes fuel-efficiency. Several existing studies have focused on estimating price elasticity of transportation fuels, particularly gasoline. For example, studies such as Dahl and Sterner (1991), Dahl (2012), Espey (1998), Kayser (2000) and Holmgren (2007) estimated that the short-run own-price elasticity of gasoline spans a range between -0.08 and -0.54. Other studies, such as Burke and Nishitateno (2013), estimated the long-run own-price elasticity of gasoline to vary between −0.2 and −0.5. Existing studies have also compared the long-run elasticity of car travel with long-run own-price elasticity and reported the former is lower than the latter because of increase in fuel efficiency.3 For example, Dargay (2007) finds that the elasticity of car travel to fuel prices in the long-run was 3 The average miles per gallon of the light-duty vehicle fleet in the United States increased from 14.9 miles in 1980 to 20 miles in 2020 and further to 21.4 miles in 2014. Similarly, the average miles per gallon of the new light-duty vehicle fleet increased from 24.3 miles in 1980 to 28.5 miles in 2000 and further to 36.4 miles in 2014 (US Bureau of Transportation Statics, https://www.rita.dot.gov/bts/sites/rita.dot.gov.bts/files/publications/national_transportation_statistics/html/table_04_ 23.html). 3 only -0.14, which is lower in magnitude as compared to the lowest magnitude of long-run own price elasticity of gasoline reported by the literature. There also exist some studies that estimate both own-price elasticities and cross-price elasticities of fuels used in the transport sector. For example, Serletis et al. (2010) estimate own and cross price elasticities of four fuels, fuel oil, electricity, gasoline and diesel, using data from selected OECD countries. The main objective of our study is to compare two specific policies in the transport sector, fuel efficiency improvement and fuel switching, to reduce GHG emissions. To do this, we estimate own and cross price elasticities for various OECD countries. For this purpose, we used a translog cost function, which is widely used in the literature (see e.g., Berndt & Woods,1975; Fuss, 1977; Griffin, 1977; Pindyck, 1979; Uri, 1979; Hall, 1986) for the estimation. First, we hold the total demand for fuel in the road transportation sector constant and calculate the Allen partial elasticities of substitution (Uzawa, 1962). We then use these Allen partial elasticities to calculate the partial own- and cross-price elasticities of the various fuels in different OECD countries. In the second step, we relax the assumption that total demand for fuel in the road transportation sector is constant, and estimate total own- and cross-price elasticities. While the estimated values of partial cross- price elasticity measure fuel switching possibilities, the differences between partial and total own- price elasticities estimate the effect of fuel efficiency improvements and the reduction in energy consumption in the transportation sector. Some existing literature (Greening et al. 1999; Greening, 2004; Lu et al. 2007; Paravantis and Georgakellos, 2007; Timilsina and Shrestha, 2008 and Timilsina and Shrestha, 2009) has used the identity approach to compare the roles of various factors, such as change in fuel mix, improved fuel efficiency, change in transportation modes, etc. in influencing the historical trends of transport sector energy consumption or CO2 emissions from this sector. Although the identity approach has 4 been widely used to investigate national and sectoral energy and emission intensities (Ang and Zhang, 2000), it simply examines trends and does not use statistical techniques to establish the relationship between the changes in energy or emission intensities and the factors that might have caused the changes. Second, the approach does not account for changes in fuel prices and their potential roles on the changes in energy consumption and corresponding emissions. The results from our study suggest that alternative mode of transportation, including the electrification of vehicle fleets, have not reached the threshold where the population at large is willing to adopt these alternative technologies to the internal combustion engine. Thus, improving fuel efficiency and increasing distance per unit of fuel use of current transportation modes has major implications for the emissions generated by the transportation sector in the short to medium run. The study presents a new way to represent fuel efficiency improvement through own price elasticities, and to compare, using estimated values of elasticities of transportation fuels, the key policy instruments to reduce GHG emissions from the transport sector. Moreover, the estimated values of own and cross price elasticities using a long time series of data from all OECD countries can be used in models for energy demand forecasts in the transport sector and economy-wide, as well as in sectoral models, to assess impacts of climate change mitigation policies. The paper is organized as follows. Section 2 of this study describes the empirical framework used to estimate the partial (total) own- and cross-price elasticities. The data utilized are presented in section 3. In section 4, the own- and cross-price elasticity estimates are presented and the policy implications of the results are discussed. We offer policy discussion and concluding remarks in section 5. 5 2. Methodology We developed an empirical model to estimate the responsiveness of various fuels in the transportation sector to changes in price. Following Fuss (1977) and Pindyck (1979), we start with a model that employs a translog cost function that is homothetically separable in its inputs (a similar framework is employed in Berndt and Woods (1975), Griffin (1977), Uri (1979), and Hall, (1986)). Because the translog cost function is homotehtically separable, we can focus only on the energy input in the transportation sector, estimate the sensitivity to changes in prices, and better understand the effect of prices on fuel switching. Technically, assume transportation services from different modes (e.g., road, rail, air, water) are produced using energy/fuels (F) as well as non-energy inputs (i.e., capital (K), labor (L), and materials (M)). 4 Let F denote the set of the different types of fuels used in the transportation sector; that is, ∈ ≡ gasoline, diesel, natural gas, LPG, electricity We restrict the structure of production as follows: Assumption 1: The production function is weakly separable in its aggregate inputs. Assumption 1 suggests that the marginal rates of substitution between the various fuels used in the transportation sector are independent of other aggregate inputs (capital, labor, and materials). This assumption leads to aggregate energy price indexes for the transport sector. To 4 Capital costs include rental value of vehicles, labor costs are the driver’s costs, and materials are operation and maintenance costs. 6 this end, Halvorsen and Ford (1978) used translog cost functions and tested the separability of energy from other inputs, focusing on the individual two-digit industries in the United States. They found that the separability holds for four of the eight industries in the United States. Assumption 2: Energy aggregates are homothetic in the various components. Assumption 2 suggests a two-step optimization process that results in the model’s solution. In the first step, the optimal fuel mix that yields the energy input is derived, and then input use is optimized across the various aggregate inputs (energy, capital, labor, and materials). Assumptions 1 and 2, then, suggest the following aggregate country-level transportation production function: = ∈ , , , where T(.) is a homothetic function of the F fuels, and H(.) is a smooth function. Given the production structure assumed, the study henceforth focuses on the function T(.). Assume that firms take prices as given and let PE denote the aggregate price index of energy used for transportation, which is homothetic and not a function of quantity. Let small letters denote the log of the variable, pf denotes the log of price of fuel f, ∈ , c denotes the log of cost function, and define the share equations as = ⁄ . Then, the steps employed in estimating the parameters used to calculate the various elasticities and the transportation energy price index are as follows: 1) First, we estimated the fuel shares: = +∑ ∈ , for , ∈ (1) 7 We estimated Eq. (1) assuming the following restrictions (which are the outcome of Assumptions 1 and 2): (a) , = , (b) ∑ ∈ =1 (c) ∑ ∈ , =∑∈ , =0 2) Next, we used the estimated parameters and , for , ∈ to calculate the aggregate energy price indexes of the transportation sector for the various countries. To calculate the aggregate energy-price indexes, the following equation was employed: = +∑ ∈ +∑∈ ∑ ∈ , (2) When calculating Eq. (2), we normalized such that the aggregate energy price index for the United States in 2010 is 1. The parameters estimated in step (1) are, then, used to estimate the partial own- and cross- elasticities. To this end, we first calculate the Allen partial elasticities and then use these estimates to calculate the partial elasticities of interest. Following Uzawa (1962), when calculating the Allen partial elasticities of substitution, the translog cost function suggests the following: = + for ≠ , (3) = + 1− Then, the partial own- and cross-price elasticities of demand, respectively, are = ; = for ≠ , (4) These are partial price elasticities that only account for substitution among fuels assuming that total energy consumed by the transportation sector is constant. 8 When allowing total energy to change with changes in fuel price, the responsiveness of quantities to a given price change is much larger. The total elasticity is defined as = + (5) That is, total elasticity is the sum of the partial elasticity plus ‒ called the cost effect, which is the outcome and change in amount of energy consumed. The empirical analysis suggests that the cost effect is important in the transportation sector; that is, the use of policy to increase fuel efficiency in the transportation sector is likely to reduce GHGs (measured through pricing effect within a given fuel) and this effect is of similar magnitude to that of policy that promotes wide adoption of electric vehicles (i.e., substitution effect among fuels). Thus, the analysis suggests that the cheaper and more cost-efficient policy should be adopted. This is further explained in Figure 1, which depicts the derived demand for fuel f. Start at point A. The demand for fuel f is DD, but the curve HH captures the substitution effect holding total energy constant. Now, increase the price of fuel f from Pf0 to Pf1. This increase in the fuel price results in fuel switching (holding total energy constant) and a move along the HH curve to point B. Because the price of fuel f increases in relation to other fuels, the quantity demanded for fuel f declines. However, the increase in fuel f’s price also yields a reduction in total energy consumed, leading to a further decline in the quantity of fuel f demanded. The increase in the price of fuel f results in the energy price index increasing further, making energy consumption more expensive and total energy demand in the transportation sector decline. This latter effect results in a move from point B to point C in Figure 1. The statistical analysis above suggests that demand for fuel f is as sensitive to changes in the energy price index as to the substitution effect among fuels. 9 Figure 1. Fuel savings versus fuel switching Technically, the total own- and cross-price elasticities per fuel are calculated as: = + ∙ (6) = + ∙ ≠ where denotes the own-price elasticity of the aggregate energy use in the transportation sector, whose value we take from Pindyck (1979). These elasticities enable us to assess how changes in fuel prices affect total fuel consumption, as well as fuel switching. 3. Data The empirical analysis used annual country data on amounts of various fuels consumed by the transportation sector across countries as well as their prices. 10 Energy consumed by the transportation sector was obtained from International Energy Agency (IEA) publications (IEA, 2014c, 2014d). To compare the various sources, the amount of energy consumed was converted to the same energy unit, terajoules (TJ). Prices of various fuels were obtained from the IEA (IEA, 2014e). The data included the consumer prices of the various fuels for the residential and industrial sectors. In the analysis, we used gasoline and diesel prices at the residential level and LPG, natural gas, and electricity prices at the industrial level. Although the prices of the residential and industrial levels are highly correlated, differences do exist. In the analysis, we ran the empirical models with prices both before and after tax and compared the results. All price data collected were converted to constant 2010 US dollars using the consumer price index. Since the fuel price data are available only for OECD countries with some exceptions, we had to limit our analysis for OECD countries only. The annual price data are 12-month averages of what end-users pay. These prices include transportation costs and reflect the actual price paid by end-users; the prices are net of rebates (IEA, 2014e). Considerable variations exist across countries when levying domestic taxes. Total tax revenues as a share of GDP among OECD countries in 2014 fluctuated between 19.8% and almost 50.9% (IEA, 2014e). Although in many European countries tax revenues exceed 40% of GDP, European countries generally provide much more extensive government support to their citizens. When comparing among OECD countries, the United States relies the least on taxes on goods and services, which averaged 17% of total 2013 tax revenues, whereas the average among OECD countries is 32.7% and Mexico collected about 49.8% of its tax revenues from consumption taxes and Chile collected 54%.5 Fuel taxes are no different. The after-rebate price of fuel to end-users 5 Data available at https://stats.oecd.org/Index.aspx?DataSetCode=REV (viewed March 28, 2016). 11 changed substantially across countries and policy affects the pass-through of crude oil prices (Kojima, 2009). To assess the robustness of the results, the estimation model was estimated twice: (i) wholesale price (i.e. prices using prices net of domestic taxes) and (ii) using retail prices (actual prices paid by domestic end-users including taxes). However, because the estimated parameters were similar and yielded similar elasticity estimates, we present the results when consumer prices (retail prices) are used. 4. Results Fuel switching, the substitution of one energy source for another, and the transition to cleaner fuels (e.g., from gasoline to CNG), may significantly affect emissions of the transportation sector. However, these benefits depend on the transportation sector’s willingness and flexibility to switch to clean technologies with low carbon footprints. Would a policy that incentivizes the adoption of more fuel-efficient technologies be more effective than a policy emphasizing fuel switching? To shed some new lights on this question, we estimate the own- and cross-price elasticities of the demand for various fuels in the transportation sector. While the cross-price elasticities reflect fuel substitution possibilities, differences between total own-price elasticities and corresponding partial own-price elasticities own-price elasticities indicate tendencies to adopt energy-efficient vehicles. Based on the estimated values of cross and own price elasticities, we assess the efficacy of incentivizing fuel switching versus fuel efficiency. We estimated various parameters using the system of equations described in section 2, assuming the production function is homothetically separable and employing pooled cross- sectional data. While using world prices the analysis began with Eq. (1). When estimating Eq. (1) 12 we ran a seemingly unrelated regression model, where the dependent variables were the shares of the different types of fuels (i.e., F) used in the transportation sector across the OECD countries. The analysis resulted in the various models being significant at a 0.01 significance level – the various specifications could not be rejected at the 1% significance level. The predicted values of the regressions of the fuel share equations (i.e., shares for LPG, natural gas, electricity, diesel, and gasoline) are depicted in Table 1, where the standard deviation is in parentheses. Table 1. Fuel share equations output Country LPG Natural Gas Electricity Diesel Gasoline Australia 0.012 0.081 0.045 0.480 0.382 (0.000) (0.002) (0.036) (0.003) (0.036) Austria 0.012 0.080 0.093 0.479 0.335 (0.002) (0.011) (0.002) (0.021) (0.010) Belgium 0.014 0.077 0.083 0.501 0.325 (0.003) (0.017) (0.035) (0.034) (0.030) Canada 0.016 0.127 0.085 0.392 0.381 (0.003) (0.018) (0.001) (0.029) (0.016) Chile 0.010 0.100 0.062 0.454 0.375 (0.001) (0.011) (0.017) (0.015) (0.023) Czech Republic 0.014 0.117 0.088 0.419 0.363 (0.002) (0.004) (0.006) (0.007) (0.010) Denmark 0.013 0.079 0.095 0.480 0.332 (0.002) (0.011) (0.001) (0.023) (0.011) Estonia 0.012 0.094 0.075 0.468 0.351 (0.004) (0.015) (0.032) (0.030) (0.037) Finland 0.021 0.094 0.117 0.456 0.311 (0.004) (0.006) (0.020) (0.007) (0.025) France 0.018 0.096 0.126 0.463 0.297 (0.001) (0.004) (0.007) (0.008) (0.012) Germany 0.014 0.104 0.096 0.442 0.345 (0.002) (0.017) (0.014) (0.030) (0.025) Greece 0.024 0.089 0.116 0.463 0.308 (0.002) (0.010) (0.028) (0.020) (0.024) 13 Hungary 0.022 0.100 0.113 0.441 0.324 (0.003) (0.010) (0.020) (0.020) (0.033) Ireland 0.011 0.104 0.063 0.446 0.375 (0.005) (0.004) (0.026) (0.004) (0.030) Israel 0.015 0.071 0.103 0.505 0.306 (0.004) (0.027) (0.039) (0.046) (0.062) Italy 0.015 0.079 0.129 0.496 0.281 (0.003) (0.016) (0.003) (0.033) (0.013) Japan 0.014 0.115 0.078 0.420 0.373 (0.005) (0.007) (0.018) (0.018) (0.010) Korea, Rep. 0.016 0.108 0.083 0.426 0.367 (0.003) (0.015) (0.003) (0.031) (0.015) Luxembourg 0.012 0.083 0.117 0.489 0.299 (0.005) (0.014) (0.019) (0.028) (0.028) Mexico 0.016 0.106 0.090 0.431 0.358 (0.003) (0.018) (0.002) (0.036) (0.016) Netherlands 0.016 0.088 0.127 0.478 0.291 (0.003) (0.017) (0.006) (0.034) (0.019) New Zealand 0.017 0.116 0.088 0.410 0.368 (0.001) (0.001) (0.001) (0.003) (0.001) Norway 0.018 0.049 0.131 0.542 0.260 (0.001) (0.007) (0.007) (0.012) (0.013) Poland 0.018 0.096 0.125 0.460 0.300 (0.001) (0.003) (0.006) (0.008) (0.011) Portugal 0.019 0.095 0.117 0.459 0.311 (0.004) (0.010) (0.019) (0.018) (0.024) Slovak 0.017 0.102 0.115 0.449 0.317 Republic (0.001) (0.003) (0.008) (0.007) (0.013) Slovenia 0.013 0.093 0.083 0.470 0.341 (0.004) (0.015) (0.036) (0.031) (0.040) Spain 0.016 0.100 0.111 0.456 0.317 (0.002) (0.003) (0.026) (0.005) (0.029) Sweden 0.019 0.078 0.083 0.489 0.331 (0.005) (0.019) (0.034) (0.037) (0.026) Switzerland 0.021 0.097 0.113 0.452 0.318 (0.005) (0.005) (0.027) (0.005) (0.031) Turkey 0.018 0.097 0.121 0.460 0.304 (0.002) (0.006) (0.008) (0.012) (0.015) United 0.025 0.087 0.131 0.467 0.291 14 Kingdom (0.001) (0.003) (0.002) (0.004) (0.004) USA 0.017 0.115 0.087 0.414 0.367 (0.002) (0.004) (0.010) (0.010) (0.006) The null hypothesis = 0 is rejected at the 1% significance level. The analysis also suggests that, on average, the share of LPG is about 1% of the fuels used in the transport sector in OECD countries, for electricity it is 6%, and natural gas about 10%. The shares of diesel and gasoline, on the other hand, are much larger, at 45% and 37%, respectively. We next calculate partial own- and cross-price elasticities of substitution. These elasticity numbers indicate how difficult it would be to reduce fuel consumption and substitution of high carbon intensive fuels with their low carbon intensive counterparts. We used the translog cost function to calculate the partial own-price (i.e., ) and cross-price (i.e., ) elasticities (i.e., Eq. (4)). The estimated average values of these elasticities among the 33 countries are presented in Table 2. Table 2. Estimated values of partial own- and cross-price elasticities LPG Natural gas Electricity Diesel Gasoline LPG -0.02 0.69 0.15 1.57 -0.43 Natural gas 0.11 -0.07 0.14 -0.68 0.53 Electricity -0.10 0.14 -0.10 0.41 0.25 Diesel 0.03 0.08 0.13 -0.21 0.29 Gasoline 0.01 0.12 0.10 0.37 -0.18 However, changes in fuel prices yield changes in the aggregate energy price index and thus total energy consumption. This assumption is relaxed when calculating total own- and cross-price elasticities while using Eq. (5). Total price elasticities account for the change in use of total energy consumed in the transportation sector, as well as inter-fuel substitution. The total own-price elasticity of substitution is depicted in Table 3. 15 These estimates are similar to those reported in the literature. For instance, Difiglio and Fulton (2000) concluded that the own-price elasticity of demand of gasoline is about -0.5, although Hughes et al. (2008) suggested that demand for gasoline became more inelastic after 2000 for the light-vehicle fleet. Fouquet (2012) documented a gradual decline in own-price elasticity in the United Kingdom: While in the 19th century the average long-run own-price elasticity was around -1.5, it was -0.6 in 2010. However, the elasticity is affected by price volatility, whereby in periods of high volatility quantity is less responsive to change in price than in periods of less volatility (Lin & Prince, 2013). Note that this paper goes beyond the existing studies by introducing additional fuels (i.e., electricity, LPG, and natural gas) used in the transport sector. Table 3. Estimated values of total own- and cross-price elasticities LPG Natural gas Electricity Diesel Gasoline LPG -0.03 0.51 -0.83 4.18 -1.55 Natural gas 0.09 -0.16 0.04 -1.01 0.26 Electricity -0.03 0.05 -0.19 0.04 -0.03 Diesel 0.02 -0.01 0.03 -0.57 0.005 Gasoline -0.006 0.02 0.004 0.003 -0.47 How sensitive are these results to the choice of the own-price elasticity of aggregate energy (i.e. )? Figure 2 depicts the total own-price elasticity on average, while reducing the elasticity of aggregate energy by 25% as well as increasing it by 25%. The outcomes suggest that the results do not vary much for LPG, natural gas and electricity, but that we do observe a more significant increase in the elasticities of diesel and gasoline (recall that the own-price elasticity of aggregate energy is multiplied by the share of the fuel in the transportation sector, and that the shares of diesel and gasoline are significantly larger than those of the other three fuels). 16 Figure 2. Sensitivity analysis on total own-price elasticity in the transportation sector for alternative values of aggregate energy elasticity LPG NG Electricity Diesel Gasoline 87 0 -0.1 -0.2 -0.3 -0.4 -0.5 -0.6 -0.7 75% of -0.85 (-0.6375) -0.85 125% of -0.85 (-1.0625) How did these elasticities change over time? To answer this question, we split the sample into two subsamples while dropping the years 2005-2007; that is, we re-estimated the various parameters and recalculated the elasticities twice: The first estimates limited the data to the years 2000-2004, whereas the second focused on 2008-2012. We then compared total own-price elasticities for the five transportation fuels across the three estimates; that is, for the samples including data for 2000-2004, 2008-2012, and for the whole sample (Figure 3). Our results offer support that the elasticity of gasoline is becoming more inelastic with time. Similar trends are observed for electricity. However, the analysis suggests a different trend for natural gas and diesel, where the estimates suggest the elasticity increased with time. To this end, natural gas and diesel fuels are employed by the power sector and used in heavy duty vehicles. In addition, the consumption of natural gas and diesel has been expanding substantially during the investigated period. 17 Figure 3. Total own-price demand elasticity in the transportation sector for alternative time periods LPG NG Electricity Diesel Gasoline 87 0 -0.1 -0.2 -0.3 -0.4 -0.5 -0.6 -0.7 2000-2004 All sample 2008-2012 5. Concluding remarks This paper aims to compare the efficacies of two important policies to reduce GHG emissions from the transport sector: (a) fuel efficiency improvement, and (b) fuel substitution. For this purpose, we estimated, using a translog cost function, the partial as well as total own-price elasticity and cross-price elasticity using 15 years’ time-series data from 33 industrialized economies. While most existing studies (e.g., Greening, 2004; Lu et al. 2007; Timilsina and Shrestha, 2008; Timilsina and Shrestha 2009) have used a decomposition approach to understand the role of various factors, such as energy efficiency improvement and fuel switching, on changes in transport sector CO2 emission intensities, this study uses an econometric approach, which is 18 richer in analytical terms, as this technique captures the effects energy prices on its demand and associated CO2 emissions. Our study first provides additional estimations of own and cross-price elasticities of fuels used for transportation, thus further making these elasticity numbers available for transport sector and economy-wide models for transportation policy analysis. Our results together with findings from the existing studies suggest that price elasticities of transportation fuels are relatively low due to limited substitution possibilities among fuels for transportation. Based on the estimated values of own and cross-price elasticities, this study concludes that in the industrialized economies a GHG mitigation policy for the transport sector would be more effective if it aims to improve vehicle efficiency and reduce miles traveled per unit of fuel consumption. Historical data suggest that the existing fuel pricing policies are not yet capable for a large-scale switching from existing fleets to electric vehicles. This finding also implies that if the governments encourage fuel switching, they should either significantly increase prices of transportation fuels to internalize their environmental damages or adopt regulatory policies that would mandate switching of fuels, such as employed in India to switch vehicles from gasoline to LPG. In Norway, the government is implementing an aggressive policy to wean drivers off fossil fuels and usher in the use of electric vehicles (currently at 2%, the highest in the world). 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