2.1. Comparative Statics

In this section, we analyze the impact of a reduction in the U.S. tariff (τ ^U ) and changes in productivities (i.e., changes in ω ^C relative to ω ^U ) on quantities and number of firms. The general functional forms used in the previous section do not lend themselves to comparative static analytical solutions. However, we can ascertain the sign of the comparative statics using linear demand and cost functions that are commonly found in the literature (Markusen and Venables, Reference Markusen and Venables1988). These solutions are too long to report, and thus we provide only the interpretation of the comparative static results.

In response to U.S. tariff reduction, China will export more apple juice to the United States $\left( \frac{dq^{CU}}{d\tau ^{U}}<0\right)$ , leading to lower U.S. price and firm-level profits. As a result, U.S. firm-level quantity will decline $\left( \frac{dq^{UD}}{d\tau ^{U}}>0\right)$ , but it will export more $\left( \frac{dq^{UR}}{d\tau ^{U}}<0\right)$ . The total U.S. firm-level sales will be lower $\left( \frac{dq^{UD}}{d\tau ^{U}}+ \frac{dq^{UR}}{d\tau ^{U}}>0\right)$ because the direct effect (first term) is larger than the indirect effect (second term). With lower prices and firm-level sales, some firms will incur loss and exit the industry $ \left( \frac{dN^{U}}{d\tau ^{U}}>0\right)$ . The reduction in the U.S. tariff will cause the price received by Chinese firms to increase. With higher exports and price, revenue will increase, causing more Chinese firms to enter $\left( \frac{dN^{C}}{d\tau ^{U}}<0\right)$ . Because it is more lucrative to export to the United States, China will divert its exports from the EU $\left( \frac{dq^{CE}}{d\tau ^{U}}>0\right)$ to the United States. Similar comparative static results and interpretations for productivity changes are also possible.

2.2. Welfare Analysis

In this section, we examine the impacts of a reduction in the U.S. tariff and productivity changes on U.S. and Chinese welfare. U.S. welfare comprises consumer surplus, producer surplus, and tariff revenues:

(9) \begin{equation} W^{US}=\underset{{\rm CS}}{\underbrace{\left\lbrace \dint p^{US}\left( Q^{US}\right) dq^{US}-p^{US}\left( Q^{US}\right) Q^{US}\right\rbrace }}+\underset{ {\rm PS}}{\underbrace{N^{U}f^{U}}}+\underset{{\rm TR}}{\underbrace{\tau ^{U}Q^{CU}}}{\rm ,} \end{equation}

where total U.S. consumption is given by Q^US = Q^UD + Q^CU . Consumer surplus (CS) is the area under the demand curve minus the expenditure. Firm-level producer surplus (PS) is total revenue minus variable cost, which is equal to total fixed cost given that profits are zero under free entry and exit. Then, industry-level producer surplus is the number of firms times fixed cost (N^Uf^U ). Tariff revenue (TR) is per unit tariff times volume of imports.

Because consumer surplus is zero as there is no domestic consumption, Chinese welfare comprises only producer surplus:

\begin{eqnarray*} W^{C}=\underset{{\rm PS}}{\underbrace{f^{C}N^{C}}}{\rm .} \end{eqnarray*}

As in the case of U.S. producer surplus, the industry-level Chinese producer surplus is the number of firms times the fixed cost.

2.2.1. Welfare Analysis of Reduction in U.S. Tariff

We totally differentiate equation (9) with respect to τ ^U to determine the effects of a reduction in the U.S. tariff on U.S. welfare. The change in U.S. welfare is given by

(10) \begin{equation} \frac{dW^{US}}{d\tau ^{U}}=\underset{{\rm CS(-\rm )}}{\underbrace{- \frac{\partial p^{US}}{\partial Q^{US}}\frac{\partial Q^{US}}{\partial \tau ^{U}}Q^{US}}}+\underset{{\rm PS(+\rm )}}{\underbrace{f^{U}\frac{ \partial N^{U}}{\partial \tau ^{U}}}}+\underset{{\rm TR(?\rm)}}{ \underbrace{Q^{CU}\left( 1+\frac{\partial Q^{CU}}{\partial \tau ^{U}}\frac{ \tau ^{U}}{Q^{CU}}\right) }}{\rm .} \end{equation}

Chinese exports to the United States increase due to a reduction in the U.S. import tariff, resulting in a lower U.S. apple juice price. Due to this lower price, U.S. consumption rises, leading to a gain in consumer surplus. However, this lower price reduces profitability of U.S. apple juice processors, causing firms to exit and resulting in producer surplus loss. As imports increase, the change in tariff revenues could be positive or negative depending on whether the import demand curve is inelastic or elastic. Hence, the net welfare effect is ambiguous. However, because the United States is a net importing country, the gain in consumer surplus will most likely outweigh the losses in producer surplus and tariff revenues, if any, and U.S. welfare is likely to increase.

Because of higher exports, profitability of Chinese firms goes up, which results in entry of more firms into the Chinese apple processing industry. Thus, the change in Chinese welfare is

\begin{equation*} \frac{dW^{C}}{d\tau ^{U}}=\underset{\left( -\right) }{\underbrace{f^{C} \frac{\partial N^{C}}{\partial \tau ^{U}}}}<0{\rm .} \end{equation*}

Because a reduction in U.S. tariff increases the number of firms in China, Chinese welfare will rise.

2.2.2. Welfare Analysis of a Change in Chinese Productivity

Due to economic reforms and foreign direct investment in food processing, Chinese firms acquire modern processing technology, leading to an increase in apple juice production. The effect of this increase in Chinese productivity on U.S. welfare is

(11) \begin{equation} \frac{dW^{US}}{d\omega ^{C}}=\underset{{\rm CS(}+{\rm )}}{\underbrace{- \frac{\partial p^{US}}{\partial Q^{US}}\frac{\partial Q^{US}}{\partial \omega ^{C}}Q^{US}}}+\underset{{\rm PS(-)}}{\underbrace{f^{U}\frac{ \partial N^{U}}{\partial \omega ^{C}}}}+\underset{{\rm TR(+)}}{ \underbrace{\tau ^{U}\frac{\partial Q^{CU}}{\partial \omega ^{C}}}} . \end{equation}

With higher output, Chinese processors augment their exports to the United States, which lowers the U.S. apple juice price, leading to higher U.S. consumption and hence a gain in consumer surplus. As a result of imports from China, the sales of U.S. processors decline and their profits go down. This results in the exit of U.S. firms from the apple juice industry and causes producer surplus to decline. As imports rise, tariff revenue accrued to the U.S. government increases. Because the United States is a net importer, the net change in U.S. welfare is likely to be positive as the gain in consumer surplus and tariff revenues will offset the producer surplus loss.

With an increase in exports due to higher production, more firms enter the Chinese industry. The change in Chinese aggregate producer surplus due to a rise in productivity is given by

\begin{equation*} \frac{\partial PS^{C}}{\partial \omega ^{C}}=\underset{\left( +\right) }{ \underbrace{f^{C}\frac{\partial N^{C}}{\partial \omega ^{C}}}}>0{\rm .} \end{equation*}

We can also analyze the effect of tariff and productivity changes on U.S. apple juice importing countries’ and EU welfare. However, due to space limitation, we are not reporting these analytical results, but we do provide the empirical results in the next section.

3.1. Empirical Model

Because China exports to the United States and EU, and the United States sells in the domestic market and exports, the four supply relations for the empirical model are specified by rewriting the first-order conditions (equations 3–6) as

(12) \begin{equation} p^{US} =\frac{\partial C^{U}\left( \cdot \right) }{\partial q^{UD}}+\psi ^{US}\xi ^{US}p^{US} \end{equation}

(13) \begin{equation} p^{R} =\frac{\partial C^{U}\left( \cdot \right) }{\partial q^{UR}}+\psi ^{UR}\xi ^{UR}p^{R} \end{equation}

(14) \begin{equation} p^{US} =\frac{\partial C^{C}\left( \cdot \right) }{\partial q^{CU}} +t^{U}+\psi ^{CU}\xi ^{US}p^{US}+\tau ^{U} \end{equation}

(15) \begin{equation} p^{E} =\left( 1+\tau ^{E}\right) \left( \frac{\partial C^{C}\left( \cdot \right) }{\partial q^{EU}}+t^{E}\right) +\psi ^{CE}\xi ^{EU}p^{E}{\rm ,} \end{equation}

where ψ ⁱ is the firm-level conjectural elasticity (e.g., $\psi ^{US}=\frac{\partial \left( Q^{UD}+Q^{CU}\right) }{\partial q^{UD}}\frac{ q^{UD}}{\left( Q^{UD}+Q^{CU}\right) }$ for a U.S. domestic firm), ξ ⁱ is the flexibility of demand in the ith market (e.g., $\xi ^{US}=-\frac{\partial p^{US}\left( Q^{UD}+Q^{CU}\right) }{ \partial \left( Q^{UD}+Q^{CU}\right) }\frac{\left( Q^{UD}+Q^{CU}\right) }{ p^{US}\left( Q^{UD}+Q^{CU}\right) }$ for the U.S. market). The conjectural elasticities vary from zero to one. Markup (ψ ⁱ ξ ^US p^US, i = US, CU) depends on conjectural elasticities, demand flexibility, and price.

We specify demand and cost functions and consider the conjectural elasticities to derive supply relations. The marginal cost functions for U.S. and Chinese processors are given by

(16) \begin{equation} \frac{\partial C^{UD}}{\partial q^{UD}} =\frac{\partial C^{U}}{\partial q^{UR}}=\frac{\lambda _{0}^{UD}}{\omega ^{US}}+\lambda _{1}^{UD}\frac{ \left( q^{UD}+q^{UR}\right) }{\left( \omega ^{US}\right) ^{2}}{\rm ,} \end{equation}

(17) \begin{equation} \frac{\partial C^{C}}{\partial q^{CU}} =\frac{\partial C^{C}}{\partial q^{CE}}=\frac{\lambda _{0}^{C}}{\omega ^{C}}+\lambda _{1}^{C}\frac{\left( q^{CU}+q^{CE}\right) }{\left( \omega ^{C}\right) ^{2}}{\rm ,} \end{equation}

where λs are marginal cost coefficients and ωs are productivity parameters. Next, we specify the U.S. demand function

(18) \begin{equation} p^{US}=\mu _{0}^{US}-\mu _{1}^{US}\left( Q^{UD}+Q^{CU}\right) \rm{,} \end{equation}

the demand for U.S. apple juice exports

(19) \begin{equation} p^{R}=\mu _{0}^{R}-\mu _{1}^{R}Q^{UR}\rm{,} \end{equation}

and the European demand for Chinese apple juice

(20) \begin{equation} p^{E}\left( Q^{CE}\right) =\mu _{0}^{E}-\mu _{1}^{E}Q^{CE}\rm{,} \end{equation}

where μs are demand coefficients.

Using the redefined first-order conditions (equations 12–15), marginal cost functions (equations 16 and 17), demand functions (equations 18–20), and conjectural elasticities, the system of four supply relations and two zero-profit conditions can be written as follows:

Supply relations:

\begin{equation*} \pi _{q^{UD}}^{US}=\mu _{0}^{US}-\mu _{1}^{US}\left( N^{U}q^{UD}+N^{C}q^{CU}\right) -\mu _{1}^{US}q^{UD}-\frac{\lambda _{0}^{UD} }{\omega ^{US}}-\lambda _{1}^{UD}\frac{q^{UD}+q^{UR}}{\left( \omega ^{US}\right) ^{2}}=0 \end{equation*}

\begin{equation*} \pi _{q^{UR}}^{US}=\mu _{0}^{R}-\mu _{1}^{R}N^{U}q^{UR}-\mu _{1}^{R}q^{UR}- \frac{\lambda _{0}^{UD}}{\omega ^{US}}-\lambda _{1}^{UD}\frac{q^{UD}+q^{UR} }{\left( \omega ^{US}\right) ^{2}}=0 \end{equation*}

\begin{eqnarray*} \pi _{q^{CU}}^{C}&=&-\mu _{1}^{US}q^{CU}+\left( \mu _{0}^{US}-\mu _{1}^{US}\left( N^{U}q^{UD}+N^{C}q^{CU}\right) -\tau ^{U}\right) -\frac{ \lambda _{0}^{C}}{\omega ^{C}}\nonumber\\ &&-\lambda _{1}^{C}\frac{q^{CU}+q^{CE}}{\left( \omega ^{C}\right) ^{2}}-t^{U}=0 \end{eqnarray*}

\begin{equation*} \pi _{q^{CE}}^{C}=\frac{1}{\left( 1+\tau ^{E}\right) }\left( \mu _{0}^{E}-\mu _{1}^{E}N^{C}q^{CE}-\mu _{1}^{E}q^{CE}\right) -\frac{\lambda _{0}^{C}}{\omega ^{C}}-\lambda _{1}^{C}\frac{q^{CU}+q^{CE}}{\left( \omega ^{C}\right) ^{2}}-t^{E}=0 \end{equation*}

Zero-profit equations:

\begin{eqnarray*} \pi ^{OUS} &=&\left( \mu _{0}^{US}-\mu _{1}^{US}\left( N^{U}q^{UD}+N^{C}q^{CU}+Q^{USO}\right) \right) q^{UD}+\left( \mu _{0}^{R}-\mu _{1}^{R}N^{U}q^{UR}\right) q^{UR} \\ &&-\lambda _{0}^{UD}\frac{q^{UD}+q^{UR}}{\omega ^{US}}-\frac{\lambda _{1}^{UD}}{2}\left( \frac{q^{UD}+q^{UR}}{\omega ^{US}}\right) ^{2}-f^{U}=0 \end{eqnarray*}

\begin{eqnarray*} \pi ^{OC} &=&\left( \mu _{0}^{US}-\mu _{1}^{US}\left( N^{U}q^{UD}+N^{C}q^{CU}\right) -\tau ^{U}\right) q^{CU}+\frac{\left( \mu _{0}^{E}-\mu _{1}^{E}N^{C}q^{CE}\right) }{\left( 1+\tau ^{E}\right) }q^{CE} \\ &&-\lambda _{0}^{C}\frac{\left( q^{CU}+q^{CE}\right) }{\omega ^{C}}-\frac{ \lambda _{1}^{C}}{2}\left( \frac{q^{CU}+q^{CE}}{\omega ^{C}}\right) ^{2}-t^{U}q^{CU}-t^{E}q^{CE}-f^{C}=0\rm{.} \end{eqnarray*}

Using the previous system of six equations, we solve for six unknowns (q^UD, q^UR, q^CU, q^CE, N^U , and N^C ) simultaneously using simulation analysis. Once we solve for these six endogenous variables, we can obtain the aggregate quantity by multiplying the firm-level quantity times the number of firms and prices by substituting the aggregate quantities into the demand functions.

3.2. Calibration and Data

For the simulation analysis, coefficients of the supply relations and demand functions are parameterized using prices, quantities, tariff, and transport cost data and demand, supply, and conjectural elasticities. For the calibration, all data are averaged over the five year period: 2005–2009. We assume Cournot competition at the industry level, which implies that $\frac{\partial \left( Q^{UD}+Q^{CU}\right) }{\partial Q^{i}} =1$ , and thus the conjectural elasticities are given by market shares $\psi ^{i}=\frac{Q^{i}}{Q^{UD}+Q^{CU}}$ .

U.S. apple juice production, total consumption, import, and export data were collected from U.S. Department of Agriculture, National Agricultural Statistics Service (2014) and the U.S. Census Bureau (2014). The United States exports apple juice to Canada, Mexico, and Japan. Chinese exports to the United States and EU were collected from FAOSTAT (Food and Agriculture Organization of the United Nations, Reference Fonsah and Muhammad2014).Footnote ² U.S. price data for apple juice concentrate were obtained from the Apple Processors Association (Reference Brander and Krugman2014). The prices in the EU and U.S. apple juice importing countries are calculated as the unit values (i.e., value of imports divided by quantity of imports). The U.S. antidumping duty on China was imposed in 1999 at 4.9 cents per gallon (WTO, 2014). The transportation cost data were calculated as the difference between free on board values and cost, freight, and insurance values of Chinese exports to the United States and the EU.

The conjectural elasticities for U.S. and Chinese firms’ sales in the United States are calibrated based on average market shares and are 0.22 and 0.71, respectively. The supply flexibilities of U.S. domestic supply and Chinese exports to United States are assumed at 1.00. Based on the conjectural elasticities, supply flexibilities, and price and quantity data, the slope and intercept parameters for the marginal cost function for U.S. processors are calculated as 0.004 and 0.07, and Chinese processors as 0.0006 and 0.06.

Mekonnen and Fonsah (Reference Mekonnen and Fonsah2011) estimated the U.S. import demand elasticity of apple juice as −0.63 (flexibility of −1.58). Similarly Andreyeva, Long, and Brownell (Reference Andreyeva, Long and Brownell2010) found that the demand elasticity for fruit juices is more elastic and ranges from −0.70 to −0.82 (flexibility of −1.43 to −1.23). Using these elasticity estimates as a basis, and along with price and quantity data, we compute the intercept and slope parameters of U.S. demand function as 1.99 and −0.002, respectively. Similarly, we construct demand function for U.S. exports with intercept 2.46 and slope −0.047, and EU demand function with intercept 2.48 and slope −0.01.

3.3. Simulation

We analyze the impact of U.S. tariff reduction and an increase in Chinese productivity relative to U.S. productivity on prices, production, trade, market structure, and welfare through simulation analysis. Table 1 reports the simulation results.

Table 1. Impacts of Tariff Elimination and Productivity Changes

U.S. Tariff Reduction: For this analysis, we run two scenarios: baseline with the U.S. tariff in place and an alternate scenario with a 50% reduction of the U.S. tariff. We compare the results of the alternate scenario with the baseline scenario to analyze the impacts of this trade policy. Removal of the tariff by the United States causes China to increase its exports to the United States. With the increase in imports, U.S. apple juice price declines by 19.00%. Due to cheaper imports, the profitability of U.S. processors is affected, U.S. firm-level sales in the United States fall by 32.22%, and the number of firms declines by 43.51%. As U.S. firms face competition in the domestic market, they divert their sales to foreign countries. U.S. firm-level exports increase by 31.95%. However, the aggregate U.S. exports decline by 25.60% because of the fall in the number of firms. As a result, the sum of domestic and export sales falls. With a lower price, consumption in the United States increases, and hence consumer surplus goes up $96.32 million. Because the number of U.S. firms declines, the total producer surplus loss is $30.79 million. Due to reduction of the tariff, tariff revenues fall by $11.93 million. This results in a net welfare gain of $53.60 million.

As China finds it more profitable to sell in the U.S. market, Chinese firms reallocate their exports from the EU to the United States. In addition, the number of Chinese firms goes up by 29.80%. Consequently, Chinese aggregate apple juice exports to the United States increase by 42.78%. Even though firm-level exports to the EU decline, the aggregate exports to the EU rise by 12.66%. As more firms enter Chinese apple juice production, the aggregate producer surplus in China rises by $45.77 million.

Increase in Chinese Productivity: For this analysis, we consider two simulation scenarios: baseline with no changes in productivity and an alternate scenario with a 10% increase in Chinese processors’ productivity relative to U.S. processors’ productivity. We compare the results of the alternate scenario with the baseline scenario to analyze the impact of a Chinese productivity increase. China increases its apple juice production and hence exports more to the United States. Chinese firm-level and aggregate exports to the United States rise by 3.52% and 7.60%, respectively. Because of the higher exports from China, the price of apple juice in the United States decreases by 2.53%, which reduces the profit of U.S. processors. This affects the sales of domestic processors in the United States, and firm-level supply declines by 4.65%. As a result, U.S. aggregate domestic sales fall by 14.48%, which causes the number of U.S. firms to decline by 10.31%. Due to the loss in market share in the United States, U.S. firms augment their exports by 5.87%. However, aggregate exports fall by 5.05% because of the lower number of U.S. firms (10.31%).

Consumption in the United States increases as a result of the lower price, leading to a gain in consumer surplus of $12.05 million. Because of the additional Chinese exports, U.S. producers lose $7.30 million. With higher imports, tariff revenues increase by $12.55 million. Because the United States experiences a gain in both consumer surplus and tariff revenues, the total welfare gain is $17.30 million.

Because Chinese processors find it profitable to produce and export, the total exports to the United States rise, and new firms also enter the industry (3.94%). Because of the productivity increases, Chinese total exports to the EU also rise by 3.69%. The aggregate producer surplus in China increases by $6.05 million. These results corroborate the comparative static theoretical results of the welfare analysis.

Sensitivity Analysis: Table 2 reports the results for a 20% increase and a 20% decrease in the demand elasticities for both tariff and productivity simulation scenarios. The results show that changes in demand elasticities do not alter the simulation results significantly. For instance, changes in the U.S. price range from −18.87% to −18.99% in the tariff scenarios. U.S. firm-level domestic sales also range from −31.24% to −32.71%. For the productivity scenarios, the results are also fairly stable. For instance, the U.S. price change ranges from −0.50% to −3.64%. In general, the lower demand elasticity values slightly dampen the impacts.

Table 2. Sensitivity Analysis for U.S. and European Union (EU) Demand Elasticities