Introduction

Revenue programs in the commodity and crop insurance titles of the farm bill are arguably the most popular subsidized risk management tools available. The 2014 farm bill and the succeeding 2018 farm bill offer Agriculture Risk Coverage at the county level (ARC-CO) under the commodity title (Title I), while Revenue Protection (RP) crop insurance under the crop insurance title (Title XI) has been offered, in one form or another, since 1996 (Dismukes and Coble, Reference Dismukes and Coble2007). Roughly 92% of corn and 96% of soybean base acres were enrolled in ARC-CO (USDA-FSA, 2018), while 91% of corn and soybeans acres enrolled in traditional crop insurance programs (i.e., YP, RP, RP-HPE) were enrolled in Revenue Protection crop insurance (USDA-RMA, 2018).

ARC-CO,Footnote ¹ which will hereon be referred to as ARC, is paid on historical base acres, or acres of a specific commodity devoted to Title I programs, which may differ from actual planted acres used with RP insurance. Although crop insurance programs allow producers to purchase insurance policies at subsidized rates, producers may participate in commodity programs at no out-of-pocket cost. A producer’s RP insurance premium increases as the coverage level increases, which is due to the increasing probability of receiving a payment at higher coverage levels and the declining subsidy percentage (Figure 1). RP protects a producer’s gross revenue from dropping below a calculated revenue guarantee and is considered a “deep loss” program because it will cover all losses between a complete loss and the minimum indemnified loss associated with a coverage level. RP pays an indemnity equal to the difference between a producer’s actual revenue and the revenue guarantee. Conversely, ARC is a “shallow loss” program in that it has a relatively narrow, or shallow, coverage band of 76–86% of the county benchmark revenue. The potential overlap of RP and ARC is shown in Figure 2. If a producer chooses to be covered by ARC, a payment is made if the county crop revenue is between 76 and 86% of the county benchmark revenue (Agriculture Improvement Act, 2018, P.L. 113-79) and is subject to payment limits.

Figure 1. Traditional crop insurance subsidy schedule. The producer’s share of the premium paid is equal to one minus the subsidy percentage offered by the government. The subsidy schedule above follows that of both the basic and optional unit structures. Basic units consist of all a farmer’s owned and cash rented acres in the same county combined, but each crop is separate. Under optional units, each farm and crop are separately insured (e.g., a farmer with four farms in a county each has its own coverage). Data source: RMA Summary of Business, rma.usda.gov.

Figure 2. Overlap in traditional crop insurance and ARC. This figure depicts the coverage ranges (percentage of expected revenue) for Agriculture Risk Coverage (ARC) and Revenue Protection (RP) crop insurance. ARC is a shallow loss program with a range of 76–86% while insurance has a much broader range from 50–85%.

This article evaluates ARC and RP used in conjunction as an optimal risk management strategy. The question we aim to address is that in the presence of two similar revenue products, ARC and RP, why would a producer choose to enroll in a product that requires a premium? Our contribution to the literature is to determine the optimal coverage level of RP for a producer given that the producer has already signed up for ARC and to explore how base premium rates drive regional differences in enrollment choices in the U.S. Simulation models of optimal behavior under expected utility allow investigation of how risk levels, risk aversion, and other parameters affect optimal RP coverage levels given ARC is also being used as a risk management tool.

A history of RP coverage level enrollment since its introduction in 2011 shows that the 75% coverage level has been the most selected coverage level choice nationwide (Figure 3). In 2018, U.S. corn and soybean producers accounted for $2.6 billion in producer-paid premiums for RP insurance. Of this $2.6 billion, $1.2 billion (i.e., 44%) was associated with coverage levels that spanned the ARC coverage range. Furthermore, as will be established below, the additional producer-paid premium required for an increase in coverage (i.e., marginal premium) is greatest at coverage levels that are within the ARC coverage range. Another interesting aspect of RP purchase behavior is that producers in the relatively lower risk region of the Corn Belt opt for coverage levels within the ARC coverage range, while producers in relatively higher risk regions (e.g., the Mississippi Delta) do not; perhaps suggesting that this regionalFootnote ² distinction could be driven by base premium rates (Figure 4). The correlation between RP enrollment within the ARC coverage range and county base premium rates for corn and soybeans are −0.58 and −0.64, respectively.

Figure 3. RP coverage level enrollment 2011–2018. Since the inception of Revenue Protection (RP), the most popular RP coverage level choice across all states on the average is 75%. Data source: RMA Summary of Business; rma.usda.gov.

Figure 4. Comparison between the 2018 percentage of RP-ARC overlap and base premium rates for corn and soybeans. Despite facing a lower probability of crop loss, counties in the Corn Belt enroll in higher coverage levels (i.e., 80–85%). This may be driven by the relatively lower base premium rates faced by producers in this region. Conversely, we see counties in the Mississippi Delta with less percentages enrolled in buy-up coverage, despite facing a higher likelihood of crop loss. Data source: RMA Summary of Business; rma.usda.gov.

While recent literature has addressed other shallow loss programs, such as STAX and SCO (Yehouenou et al., Reference Yehouenou, Barnett, Harri, Coble and McIntosh2018; Cooper, Hungerford, and O’Donoghue, Reference Cooper, Hungerford and O’Donoghue2015; Luitel, Hudson, and Knight, Reference Luitel, Hudson and Knight2018; Bulut and Collins, Reference Bulut and Collins2014), none have addressed the prima facie behavioral anomalies illustrated in this article. Bulut and Collins (Reference Bulut and Collins2014) find that commodity area plans are only a limited substitute for risk protection with individual insurance plans due to yield basis risk and generally have no impact on crop insurance choices. Yehouenou, Barnett, and Coble (Reference Yehouenou, Barnett, Harri, Coble and McIntosh2018) analyze the STAX program for cotton using the expected utility theory. The work presented by Yehouenou, Barnett, and Coble (Reference Yehouenou, Barnett, Harri, Coble and McIntosh2018) focuses on determining the optimal coverage level of STAX paired with RP, which are both crop insurance programs. Importantly, overlap of RP and STAX is not allowed. They find that a standalone STAX program would not be a very effective alternative to farm-level crop insurance and suggest that cotton producers in Texas would benefit more from using STAX as a complement to their farm-level crop insurance.

Cooper, Hungerford, and O’Donoghue (Reference Cooper, Hungerford and O’Donoghue2015) study the interactions of shallow loss support programs and traditional federal crop insurance programs. In their research, it is assumed that the producer already has acres enrolled in 75% coverage RP, and they are making the decision to sign up for ARC or SCO, both found under Title I in the 2014 farm bill. Cooper, Hungerford, and O’Donoghue (Reference Cooper, Hungerford and O’Donoghue2015) simulate revenue payments per acre with different farm program election combinations, rather than explore different levels of RP coverage to find the optimal level of coverage paired with ARC.

In addition to the work on the 2014 farm bill, there has been much work done on the potential for overlap in the 2008 farm bill (Heerman et al., Reference Heerman, Cooper, Johansson and Worth2016; Bulut, Collins, and Zacharias, Reference Bulut, Collins and Zacharias2012; Cooper and O’Donoghue, Reference Cooper and O’Donoghue2011; O’Donoghue et al., Reference O’Donoghue, Effland., Cooper and You2011; Cooper, Reference Cooper2010; Zulauf, Schnitkey, and Langemeier, Reference Zulauf, Schnitkey and Langemeier2010). Bulut, Collins, and Zacharias (Reference Bulut, Collins and Zacharias2012) examine the interaction between crop insurance and other farm support programs and are more concerned with how producers will react to farm policy proposals, rather than what has already been enacted into public law. Related to this work, Cooper and O’Donoghue (Reference Cooper and O’Donoghue2011) also explore whether receiving benefits from multiple programs affects producers’ business decisions by analyzing the overlap between 2008 farm bill crop insurance (SURE) and commodity (ACRE) programs, similar to their 2014 farm bill counterparts RP and ARC.

There has been little research on ARC in general (Orden and Zulauf, Reference Orden and Zulauf2015), and more specifically, previous research has not considered optimal RP coverage level choices in the presence of simultaneous enrollment in the ARC program. Here, we evaluate these decisions among producers in both the Corn Belt and Mississippi Delta under Expected Utility Theory using data from the USDA National Agricultural Statistics Service (NASS), the USDA Risk Management Agency (RMA), and the Commodity Research Bureau (CRB). Price and yield data are simulated using a Phoon, Quek, and Huang procedure (Phoon, Quek, and Huang, Reference Phoon, Quek and Huang2004). Focusing on a representative farm in McLean County (Illinois) and in Bolivar County (Mississippi) we find that optimal coverage level choices are (1) within the ARC coverage range and (2) higher in relatively less risky regions. McLean County is centrally located in the Corn Belt (i.e., Illinois, Indiana, and Iowa), and Bolivar County is centrally located in the Delta (i.e., Arkansas, Louisiana, Mississippi, Tennessee).

Conceptual Framework

Our approach follows a similar Expected Utility setup as Coble, Heifner, and Zuniga (Reference Coble, Heifner and Zuniga2000) in which the choice variable is the quantity of production hedge given that the producer is already insured. Under the Expected Utility framework, the base model represents a risk-averse producer choosing the optimal level of RP coverage to buy where the choice variable is the coverage level. Assuming the von Neumann-Morgenstern axioms of behavior, the producer maximizes their expected utility. The assumption that the producer is risk-averse rather than risk-neutral implies its utility function strictly increasing, concave, and twice continuously differentiable.

To explain the model, the utility function is broken down into equations for average crop revenues, RP indemnities, RP producer paid premiums, and ARC payments. Average crop revenues are found by the following equation:

(1) $$\tilde{R}_{i}=\tilde{P}^{{\rm Cash}}\tilde{Y}_{i}-C$$

where $\tilde R$ _i is the stochastic average crop revenue per planted acre for representative farm i, $\tilde P$ ^Cash is the stochastic cash price received, $\tilde Y$ _i is the stochastic farm-level yield for representative farm i, and C are total costs (in dollars) of production per acre, which differ by representative farm (see Table S6 in Online Appendix).

RP indemnities are calculated using the equation below:

(2) $$I_{i}={\rm MAX}\left\{\left[\left({\rm MAX}\left(F^{s},\tilde{F}\ \!^{f}\right)Y_{i}^{{\rm APH}}\phi \right)-\tilde{F}\ \!^{f}\tilde{Y}_{i}\right],0\right\}$$

where I _i is the RP indemnity per planted acre for representative farm i, F ^s is the spring futures price, $\tilde F$ ^f is the stochastic futures price in the fall, Y _i ^APH is the APH (Actual Production History) yield for farm i, and $\phi$ is the RP coverage level chosen by the producer. RP producer paid premiums can be found with the following equation:

(3) $$M_{i}=\phi F^{s}Y_{i}^{{\rm APH}}A_{i}\left(\phi \right)\left(1-S\left(\phi \right)\right)$$

where M _i is the RP producer paid premium per planted acre for farm i, A _i (ϕ) is the actuarially fair base premium rate, which is a function of the coverage level, faced by farm i, and S(ϕ) is the subsidy as a function of coverage level.

ARC payments are calculated using the equation below:

(4) $${\rm AR}{\rm C}_{i}=\left(0.85\right)A_{i}^{B}{\rm MIN}\left\{{\rm MAX}\left[\left(ZP^{O}Y_{C}^{O}-\tilde{P}^{{\rm MYA}}\tilde{Y}_{C}\right),0\right],0.1P^{O}Y_{C}^{O}\right\}$$

where ARC _i is the total amount of ARC payment for farm i, A _i ^B is the number of base acres devoted to a specific commodity for farm i, P ^O is the Olympic Average price per bushel, Y _C ^O is the Olympic Average county yield for county C, $\tilde P$ ^MYA is the stochastic MYA (Marketing Year Average) price per bushel, $\tilde Y$ _C is the stochastic county yield for county C, and Z is the ARC payment rate.Footnote ³

To model a producer deciding to choose an optimal RP coverage level, the above components (equations 1–4) are incorporated into an equation that forms the objective expected utility function below:

(5) $$\matrix{ {E\left( U \right) = \mathop {MAX}\limits_\phi \int_{{{\tilde P}^{{\rm{Cash}}}}} {\int_{{{\tilde P}^{{\rm{MYA}}}}} {\int_{{{\tilde F}^f}} {\int_{{{\tilde Y}_i}} {\int_{{{\tilde Y}_C}} U } } } } [A_i^P\left( {{{\tilde R}_i} + {I_i} - {M_i}} \right)} \hfill \cr {\quad \quad \quad \quad + {\rm{AR}}{{\rm{C}}_i}]f\left( {{{\tilde P}^{{\rm{Cash}}}},{{\tilde P}^{{\rm{MYA}}}},{{\tilde F}^f},{{\tilde Y}_i},{{\tilde Y}_C}} \right)d{{\tilde P}^{{\rm{Cash}}}}d{{\tilde P}^{{\rm{MYA}}}}d{{\tilde F}^f}d{{\tilde Y}_i}d{{\tilde Y}_C}} \hfill \cr } $$

where A _i ^P is the total planted acres for farm i, and f(⋅) is a joint probability distribution of prices and yields.

Producers are assumed to maximize a constant relative risk aversion (CRRA) utility function:

(6) $$U={W^{1-\alpha } \over 1-\alpha} $$

where W is the initial wealth and α > 1 is a risk aversion parameter, which is set initially at α = 2.

For each scenario, the certainty equivalent (CE) calculated is given by:

(7) $${\rm CE}=\left[\left(1-\alpha \right)E\left(U\right)\right]^{1 \over 1-\alpha }$$

It is important to note that the CE is the dollar amount that would render the producer indifferent between receiving the dollar amount with certainty by using ARC and/or RP, or taking the gamble using no risk products. The largest CE indicates the optimal risk management choice between RP and ARC. Results were generated for scenarios with different combinations of RP coverage levels, premium structures (i.e., actuarially fair and subsidized), and the inclusion of ARC payments.