2.1. Propensity score matching

If there are observed variables that are correlated with productivity and efficiency, as well as with participation in FPCs, then failure to account for self-selection in FPC participation will lead to biased estimates of the impacts of FPCs on TE and income. PSM can be used to construct a control group of nonparticipants who share similar observable characteristics to farmers participating in FPCs to address selection bias arising from observed variables (González-Flores et al., Reference González-Flores, Bravo-Ureta, Solís and Winters2014; Todd, Reference Todd, Schultz and Strauss2008).

We generate propensity scores using a binary choice model that incorporates the observed variables hypothesized to influence farmers’ FPC participation decisions. The propensity scores are then used to identify a control group among the nonparticipants to match with the participant group (treatment group). There are a variety of algorithms in the literature for performing matches, including nearest-neighbor matching (NNM), caliper matching, radius matching, stratification matching, interval matching, kernel-based matching (KBM), and local linear matching (Caliendo and Kopeinig, Reference Caliendo and Kopeinig2008). Most of these algorithms limit the construction of matches to regions of common support, where the matches are sufficiently close. We tried NNM with caliper and KBM, which are two of the most popular algorithms, and selected NNM based on its better performance with our data.

With the treatment and control groups identified, the average treatment effect for the treated (ATT) can be estimated. The ATT is the average effect of treatment on those subjects (farms) who receive the treatment (FPC participation). The ATT is defined as

$$\tau _{ATT}^{PSM} = {E_{P\left( {\boldsymbol Z} \right)|I = 1}}\left\{ {E\left[ {{R_1}|I = 1,P({\boldsymbol Z})} \right] - E\left[ {{R_0}|I = 0,P({\boldsymbol Z})} \right]} \right\}$$. (1)

P( Z ) represents the propensity scores, where Z is a vector of variables hypothesized to influence the participation decision. R ₁ and R ₀ are outcomes (e.g., income) for the treatment and control groups, respectively. I = 1 indicates participation, and I = 0 indicates nonparticipation.

2.2. Sample selection-corrected group production frontiers

Following Huang, Huang, and Liu (Reference Huang, Huang and Liu2014) and Villano et al. (Reference Villano, Bravo-Ureta, Solis and Fleming2015), suppose that vegetable farmers are divided into two groups, FPC nonparticipants (group 0) and FPC participants (group 1), with all the farms in a given group sharing the same production frontier. The group sizes are N ₀ and N ₁, respectively. The group-specific SPFs can be written as

$${\rm ln}{Y_{ji}} = {\rm ln}\,{f^j}\left( {{{\boldsymbol X}_{ji}}} \right) + {\varepsilon _{ji}} = {\rm ln}\,{f^j}\left( {{{\boldsymbol X}_{ji}}} \right) + {v_{ji}} - {u_{ji}}$$. (2)

Y_ji is the output of farm i in the jth group (i = 1, …, N ₀ for j = 0; i = N ₀ + 1, …, N ₀ + N ₁ for j = 1). X _ji denotes a vector of production inputs, f^j(·) is the group-specific production technology, v_ji is a random error representing statistical noise and unobserved variables, u_ji ≥ 0 is a nonnegative random error representing technical inefficiency that is independent of v_ji, and ϵ_ji = v_ji – u_ji is a composite error. v_ji is assumed to be normally distributed with zero mean and group-specific variance $\sigma _{vj}^2$ . u_ji is assumed to follow a folded normal distribution (i.e., u_ji = |U_ji |), where U_ji is a normally distributed random variable with zero mean and group-specific variance $\sigma _{uj}^2$ . A farm’s TE is defined as

$$TE\,_i^j = {{{Y_{ji}}} \over {{f^j}\left( {{\boldsymbol X}_i} \right){e^{{v_{ji}}}}}} = {e^{ - {u_{ji}}}} \le 1$$. (3)

Technical inefficiency arises when a farm produces less than the maximum possible output from the inputs it employs. TE can be increased through better managerial decisions. This study focuses on FPCs as a vehicle for improving farms’ managerial ability.

To deal with biases from unobserved variables (e.g., managerial ability) within an SPF formulation, we employ the procedure introduced by Greene (Reference Greene2010), which is a sample selection correction for the stochastic frontier model. In this procedure, there is a probit sample selection equation:

$${I_i} = Probit\left[ {\bf \alpha '{\boldsymbol Z}_i} + {\omega _i} \right].$$ (4)

I_j = 1 if farm i participates in an FPC, and I_i = 0 if it does not participate. As previously, Z_i is a vector of variables hypothesized to influence the participation decision, α is a vector of parameters, and ω_i is a normally distributed error term with zero mean and unit variance. In the estimation of the SPF for nonparticipants, v _{0 i} and ω_i are assumed to follow a bivariate normal distribution with correlation coefficient ρ ₀. Similarly, in the estimation of the SPF for participants, v _1i and ω_i are assumed to follow a bivariate normal distribution with correlation coefficient ρ ₁. The parameters ρ ₀ and ρ ₁ capture the presence or absence of selection bias from unobserved variables.

2.3. Metafrontier production function

After estimating the group-specific SPFs, we perform a likelihood ratio test to determine whether the TEs for the two groups can be explained by a common technology. If the null hypothesis of a common technology is rejected, and it is rejected with our data, the estimation can proceed following a metafrontier framework (Battese, Rao, and O’Donnell, Reference Battese, Rao and O’Donnell2004).

We use a procedure developed by Huang, Huang, and Liu (Reference Huang, Huang and Liu2014) to estimate the metafrontier. It involves quasi–maximum likelihood estimation of the following equation:

$${\rm ln} \,{\hat f^j}\left( {{\boldsymbol X}_{ji}} \right) = ln{f^M}\left( {{\boldsymbol X}_{ji}} \right) + v_{ji}^M - u_{ji}^M$$. (5)

${\hat f^j}\left( {{\boldsymbol X}_{ji}} \right)$. is the SPF estimate given previously of the frontier for farm i in group j, f^M ( X _ji ) is the metafrontier production function to be estimated, $v_{ji}^M = {\varepsilon _{ji}} - {\hat \varepsilon _{ji}}$ is the error from the SPF estimation, and $u_{ji}^M \ge 0$ is a nonnegative error representing the gap between group j's production frontier and the metafrontier. $u_{ji}^M$ is assumed to be truncated normal—that is,

$$u_{ji}^M\sim{N^ + }[{\mu ^M}\left( {{\boldsymbol S}_{ji}} \right),{\left( {\sigma _u^M} \right)^2}]$$. (6)

S _ji is a vector of variables representing the production environment for farm i in group j. The vector S _ji can include the services provided by FPCs to participants.

The gap between group j’s production frontier and the metafrontier is known as the technology gap ratio (TGR), which is defined as

$$TGR_i^j = {{{f^j}\left( {{X_{ji}}} \right)} \over {{f^M}\left( {{X_{ji}}} \right)}} = {e^{ - u_{ji}^M}} \le 1$$. (7)

The TGR can be attributed to a farmer’s choice of a technique, which in our case is either participating or not participating in an FPC. Defined as the gap between group-specific production frontiers to the metafrontier, TGRs can also be seen as the result of technological change. Because FPCs are hypothesized to assist farmers in attaining a better production environment through access to agricultural innovation systems and modern value chains, this gap can also be referred to as an environment-technology gap ratio. A farm’s metatechnical efficiency (MTE) is defined as its TE relative to the metafrontier, and is related to TE and the TGR as

$$MTE\,_i^j = {{{Y_{ji}}} \over {{f^M}\left( {{\boldsymbol X}_{ji}} \right){e^{v_{ji}^M}}}} = TGR_i^j \times TE_i^j \le 1.$$ (8)

4.1. Propensity score matching

Probit estimates of the sample selection equation (4) are in Table 2. These results are used to generate propensity scores. Farm operators with a senior high school education are more likely to participate in FPCs, which is consistent with the literature (e.g., Wollni and Zeller, Reference Wollni and Zeller2007) and is often attributed to the greater ability of more educated farmers to access, process, and act on new information. Farms with ordinary greenhouses or fewer crop rotations per year are more likely to participate in FPCs. These farms face more risk because they are more limited in their ability to change production plans based on the weather or market situation. For them, participating in an FPC may be a risk-reduction strategy. Farms located in the Beijing-Tianjin-Hebei region are more likely to participate, which makes sense because the greater economic development and clustering of agribusinesses in this region mean that FPCs have more to offer participants.

Table 2. Probit estimates of farmer professional cooperative participation

Note: Asterisks (***, **, and *) denote significance at 1%, 5%, and 10% levels, respectively.

Results of balancing tests for PSM are shown in the Appendix (Table A1). We tried two popular matching algorithms, NNM with caliper and KBM, and NNM was selected based on its superior performance with better-matched and balanced samples. Figure 1 presents the distribution of support for the treated (participants) and untreated (nonparticipants) using the NNM results. The samples are balanced with only 14 nonparticipants (4%) off support (i.e., not matched with the participants in terms of their propensity scores), and none of the participants off support (not matched with the nonparticipants). This implies that selection bias from observables is not a major issue with our data. After removing the 14 nonparticipants who are off support, the samples for the SPF and metafrontier estimations became 150 participants and 287 nonparticipants (437 total).

Figure 1. Distribution and common support for propensity score matching.

4.2. Sample selection-corrected group production frontiers

The sample selection-corrected, group-specific SPF estimation results using matched samples are shown in Table 3. The results in Table 3 indicate that there are important differences between the SPFs for participants and nonparticipants, suggesting that FPCs change the production technologies used by their member farms. We ran a likelihood ratio test of a null hypothesis of equality in production function parameter values between participants and nonparticipants, and the null hypothesis was rejected (X ² = 86.52, P < 0.001).

Table 3. Sample selection-corrected stochastic production frontier model estimates using matched samples

Notes: The variables used in the estimation are normalized by their geometric means, so that the first-order estimates are partial output elasticities with respect to individual inputs at geometric mean values. Asterisks (***, **, and *) denote significance at 1%, 5%, and 10% levels, respectively.

The variables used in the estimation of the Table 3 results were normalized by their geometric means, so that the first-order estimated coefficients on the inputs (estimates of the $\beta _p^k$ in equation 9) are partial output elasticities with respect to individual inputs when evaluated at their geometric mean values. For example, the estimated partial output elasticity of land at the sample geometric means for participants is about 0.6. The sum of the partial output elasticities for participants is greater than 1 (about 1.2), indicating increasing returns to scale per greenhouse. For nonparticipants, the sum of the partial output elasticities is significantly less than 1 (about 0.6), indicating decreasing returns to scale per greenhouse.

For both participants and nonparticipants, the estimated coefficient on the log squared of fertilizer is positive and statistically significant, which indicates that the partial output elasticity of fertilizer increases as fertilizer use increases. For participants, the estimated coefficient on the log squared of land is positive and statistically significant, indicating that the partial output elasticity of land increases as farm size increases. The significant positive coefficient on the land-fertilizer interaction term for participants suggests a complementary relationship between these two inputs, in the sense that an increase in one of these two inputs will raise the partial output elasticity of the other. The significant positive coefficient on the land-labor term for nonparticipants points to a similar complementary relationship for those two inputs. The sample mean estimate of the partial output elasticity of labor is about 0.60 and statistically significant for participants, but only about 0.12 and not statistically significant for nonparticipants. For land, the estimated partial output elasticity is about 0.51 for participants and statistically significant, versus 0.04 and not statistically significant for nonparticipants. This suggests that FPCs help participants get a greater percentage boost in output than nonparticipants from additional land or labor.

The estimated partial output elasticity for other inputs (seeds, water, electricity, and primary processing fees) is about 0.23 and statistically significant for nonparticipants, whereas it is close to zero and not statistically significant for participants. This suggests that FPC participants may be maximizing output with respect to these other inputs, which in turn suggests an allocative inefficiency because these inputs have a cost. At sample geometric means, the estimated marginal product of other inputs for nonparticipants is about 1.7 but is not statistically different at the 5% significance level from its allocatively efficient value of 1. Similarly, the estimated marginal product of fertilizer for participants (1.5) is not statistically different from 1 at the 5% level. However, for nonparticipants, the estimated marginal product for fertilizer (2.0) is significantly different from 1 at the 5% level. Other studies (e.g., Chen, Huffman, and Rozelle, Reference Chen, Huffman and Rozelle2009) have also found significant departures from allocative efficiency in Chinese agriculture.

The estimate of the selectivity from unobservables parameter for participants (ρ ₁) is not statistically significant. However, the estimate of this parameter for nonparticipants (ρ ₀) is statistically significant at the 10% level, which suggests that estimating the SPF model within a sample selection framework is justified. The estimate of ρ ₀ is negative, implying that the selection bias is negative, with unobserved factors positively predisposing farms toward FPC participation that also tend to reduce their output. Managerial ability is often cited as an example of an unobserved variable in these contexts (e.g., Bravo-Ureta, Greene, and Solís, Reference Bravo-Ureta, Greene and Solís2012; Huang, Huang, and Liu, Reference Huang, Huang and Liu2014; Villano et al., Reference Villano, Bravo-Ureta, Solis and Fleming2015). In this case, if it is managerial ability, farms with weaker management skills, and therefore less output, may be looking at FPC participation to compensate for this. Ma and Abdulai (Reference Ma and Abdulai2016) also found negative selection bias in their study of FPCs for apple farms in China.

In addition to sample selection SPF models, it is also possible to follow Bravo-Ureta, Greene, and Solís (Reference Bravo-Ureta, Greene and Solís2012) and Villano et al. (Reference Villano, Bravo-Ureta, Solis and Fleming2015) in estimating so-called conventional SPF models on the matched data, with an inverse Mills ratio variable (λ) included to account for sample selection (i.e., a Heckman-type correction). As Greene (Reference Greene2010) indicates, the conventional approach is inferior to the sample selection SPF approach, but it still yields a feasible consistent estimator of the production function parameters. We estimated three models using the conventional approach: one pooled model of both participants and nonparticipants, one for only participants, and one for only nonparticipants.Footnote ⁷ The estimates of λ were all statistically significant, which again suggests that there is unobserved selection bias that should be controlled.

4.3. Metafrontier production function

Table 4 presents estimates of the parameters of the stochastic metafrontier (SMF). Again, the first-order estimated coefficients (the $\beta _p^k$ in equation 9) are partial output elasticities with respect to individual inputs when evaluated at their geometric mean values. The sum of the partial output elasticities is less than 1 (about 0.8), indicating decreasing returns to scale along the metafrontier. Similar to the group-specific SPF results, the estimated marginal products for fertilizer (1.7) and other inputs (1.4) are both greater than 1, and in this case, both are statistically different from 1 at a 5% significance level. Also similar to the group-specific SPF results, the partial output elasticity of fertilizer increases as fertilizer use increases, and land has complementary relationships with labor and fertilizer.

Table 4. Estimates of the stochastic metafrontier

Notes: The variables used in the estimation of the technical structure model are normalized by their geometric means, so that the first-order estimates are partial output elasticities with respect to individual inputs at geometric mean values. Asterisks (***, **, and *) denote significance at 1%, 5%, and 10% levels, respectively. FPC, farmer professional cooperative.

Results show that two of the FPC services can help its member farmers reduce the technical inefficiency component of the model. The estimated coefficient for FPC materials purchasing and FPC-enabled access to marketing channels is negative and statistically significant, indicating that these services can help make the member farmers’ group production frontier closer to the metafrontier to get better TGRs. The estimated coefficient for FPC guidance on technologies is also negative but not statistically significant. This result may come from the fact that although new technologies were applied to increase output and/or reduce costs, the producers are not able to fully master each new technique before an even newer, better one becomes available and is adopted, so the overall effect of the technology guidance from FPCs is not obvious.

4.4. Impacts of farmer professional cooperative participation

Estimated gaps in TE and income for FPC participants and nonparticipants are presented in Table 5. These estimated gaps are based on the sample selection SPF model results in Table 3 and the SMF results in Table 4, which in turn are based on the matched samples of FPC participants and nonparticipants. The income gap is defined as the difference in output value between the fitted group-specific frontier and the metafrontier. The income gap is always negative, and a smaller absolute value for the income gap means a better output performance.

The figures in Table 5 indicate that FPC participants outperform nonparticipants on average in TE, MTE, and the income gap. In comparison of group-specific TE, most FPC participants are closer to their SPF with an average group-specific TE of 0.72, whereas that of nonparticipants is 0.66. This result indicates that FPCs can help their participants to reduce the inner TE gap through relative uniform production arrangements. The average TGR for participants (0.96) is statistically significantly higher than that of nonparticipants (0.89), which means the group-specific production frontier for participants is closer to the metafrontier than the production frontier for nonparticipants with the help of the FPC services. This result also indicates that the performance of technological change for participants is better than nonparticipants. Therefore, FPC participants have a better overall average MTE (0.69) than nonparticipants (0.59). In terms of income, the gap for participants and nonparticipants [−¥3,134 − (−¥7,594) = ¥4,460] is sizeable and is equal to about one-sixth (18%) of mean income per greenhouse for nonparticipants.

Table 5. Technical and income gaps between participants and nonparticipants

Notes: The income gap is defined as the difference in output value between the fitted group-specific frontier and the metafrontier and is always negative. A smaller absolute value for the income gap means a better output performance. Asterisks (***, **, and *) denote mean differences between participants and nonparticipants, which are significant at 1%, 5%, and 10% levels, respectively. MTE, metatechnical efficiency; TE, technical efficiency; TGR, technology gap ratio.