4.1. Book of Business

Equation (1) defines the net return, NR, on the crop insurance company’s book of business, B

(1) $$N{R_B} = \;\mathop \sum \nolimits_{i = 1}^n \left[ {{P_{ij}} - Max\left\{ {0,\;\left\{ {R{G_{ij}} - \;{f_1}{y_i}} \right\}} \right\}} \right],$$

where $N{R_B}$ represents that the net return calculates as the difference between the total indemnities paid by the RP policies out of the total premium received. ${P_{ij}}$ is the premium paid by farm i for coverage level j, n is the number of farms, $R{G_{ij}}$ is the revenue guarantee for farm i for coverage level j, f ₁ is the future price at harvest, and y _i is the actual yield for farm i. The revenue guarantee for RP, $R{G_{ij}},\;$ is defined in equation (2) $as\;$

(2) $$R{G_{ij}} = {C_{ij}} \times {y_{gi}} \times Max\left( {{f_0}{,f_1}} \right).$$

The revenue guarantee for RP ( $R{G_{ij}})$ is calculated as the product of the higher of projected price, f ₀ , or harvest price, f ₁ , approved yield, y _gi , for farm i, and chosen coverage level, C _ij . The approved yield, ${y_g}$ , is an average of a crop producer’s yield over a minimum of 4 years and a maximum of 10 years. Projected and harvest prices for a corn RP policy are determined by calculating the monthly average of the December future contract’s daily prices during February and October, respectively.Footnote ³ An indemnity, ${I_{ij}}$ , is paid when the revenue guarantee exceeds the actual revenue:

(3) $$\left\{ {\matrix{ {{I_{ij}} \gt 0\;if\;{C_{ij}}Max\left( {{f_0},{f_1}} \right){y_{gi}}{\rm{ }} \gt {f_1}{y_i}} \cr {{I_{ij}} = 0\;if\;{C_{ij}}Max\left( {{f_0},{f_1}} \right){y_{gi}} \le {f_1}{y_i}} \cr } } \right\}.$$

We first discuss when a crop insurer transfers the price risks of RP policies using only option contracts. Next, we discuss the scenario where the crop insurer uses both options and reinsurance through the SRA.

4.2. Hedging Through the Option Market

This study assumes that the crop insurer will buy a mix of both put and call options to hedge the price risk of corn RP policies. For RP policies, the lower harvest price results in the indemnity payment based on the projected price even if the actual yield is higher than the APH yield. If prices do not decline, the RP policy effectively becomes a yield insurance policy providing a revenue guarantee at the harvest price. As RP protects both downside and upside price risks, this study assumes that a crop insurer offering RP policies buys a mix of put and call options at a strike equal to the projected price, f ₀ , and at a cost equal to the option premium. At the same strike price, both call and put options would be at-the-money simultaneously. Otherwise, when a crop insurer buys a put option in-the-money and when the strike price is greater than the projected price, a call option with the same strike price will be out-of-the-money vice versa. At-the-money puts and calls conceptually reduce all price risk. However, out-of-the-money options would be cheaper, and hedgers might sometimes take that approach—less risk protection but at a lower fair price. The result is that the hedge ratios found in these results represent an upper bound on the hedge ratio.

The insurer offering corn RP policies will exercise either the put options when the harvest price of the December corn future contract falls below the projected price protecting against the price decrease or the call options when the harvest price of the corn December future contract rises above the projected price protecting against the increased liability that will trigger indemnity when yields decline in a sufficient magnitude. The net returns from put (NP) and call (NC) options are given below:

(4) $$NP = {h_P} \times Max\left[ {0,\left( {{f_0} - {f_1}} \right)} \right] \times {Q_P} - {h_P} \times {Q_P} \times P{P_0},$$

(5) $$NC = {h_C} \times Max\left[ {0,\left( {{f_1} - {f_0}} \right)} \right] \times {Q_C} - {h_C} \times {Q_C} \times C{P_0},$$

where PP ₀ and CP ₀ represent put and call option premiums, respectively, Q _P and Q _C equal the total quantity hedged through put and call options, and h _P (h _C ) is the percentage of Q _P (Q _C ) that is hedged.

The end-of-period wealth, W _e , depends on net returns from holding RP policies and net returns from any put or call positions:

(6) $${W_e} = {W_0} + N{R_B} + NP + NC.$$

4.3. Hedging By Combining Both SRA And Options

The next scenario considered is where an insurance company would combine the use of options with reinsuring using the SRA. We assume the company transfers a certain percentage of its net losses in exchange for an equal percentage transfer of interest in premium in each state by assigning its policies to the commercial fund of the SRA. As per the provisions of the 2016 SRA, the company must retain at least a 35% interest in premium and potential net losses in each state, with the remainder ceded to the FCIC. Let ret represent the percent interest in premium and potential net losses that the insurer retains. We assume that the insurer retains the same percentage of the book of business in each state for simplicity.

The loss ratio is the total of indemnities paid divided by the total premiums for all RP policies. Mathematically, the loss ratio, LR as defined in equation (7), is

(7) $$LR = {{\sum\nolimits_{i = 1}^m {} \sum\nolimits_{j = 1}^n {\left[ {{I_{ij}}} \right]} } \over {\sum\nolimits_{i = 1}^m {} \sum\nolimits_{j = 1}^n {\left[ {{P_{ij}}} \right]} }}.$$

After accounting for the retention provision, the insurer’s end-of-period wealth, ${W_e},$ is calculated as in (8). The amount of premiums, underwriting loss, and gain retained by the Commercial Fund company are calculated as described in the Appendix:

(8) $${W_e} = {W_0} + ret(N{R_B} + NP + NC).$$

4.4. Utility Function

Based on end-of-period wealth, a CRRA utility function is given by

(9) $$U\left( {{W_e}} \right) = {{W_e^{\left( {1 - R} \right)}} \over {\left( {1 - R} \right)}}\,{\rm{for}}\,R \ne 1,$$

(10) $$U\left( {{W_e}} \right) = ln{W_e}\ {\rm{for}}\ R = 1,$$

where R is the degree of relative risk aversion.

The objective function that maximizes the expected utility is expressed as

(11) $$Ma{x_{{h_P},\;{h_C}}}\;U\left( {{W_e}} \right) = \int\!\!\!\int U\left( {{W_e}} \right)f({y_{i,}}\;{f_i})d{y_i}\;d{f_i}.$$

The certainty equivalent $C{E_R}$ based on the above utility function is as follows:

(12) $$C{E_R} = {e^{U\left( {{W_e}} \right)}}\;if\;R = 1$$

(13) $$\;C{E_R} = {\left[ {U\left( {{W_e}} \right)\left( {1 - R} \right)} \right]^{{1 \over {1 - R}}}}\;\;if\;R \ne 1.$$

As the crop insurer does not know the actual yield, we assume that the insurer is hedging a certain percentage of the value of one million bushels of corn using options. We conduct the grid search for hedging percentages that maximize the certainty equivalent, from 1 to 100% at every 0.5%. The hedging percentage resulting in the highest certainty equivalent is deemed optimal.

5.1. Calculating Representative Farm Yields

To simulate the farm yields, we use the county yield data for corn from USDA’s National Agricultural Statistics Service (NASS) and employ the yield variability model formulated by Coble, Dismukes, and Thomas (Reference Coble, Dismukes and Thomas2007). Steps use to simulate farm yields are as follows:

1. 1. A linear time trend is estimated using the regression function (15) for 265 counties in 31 states having a complete yield data series from 1985 to 2017:

(15) $$\widehat {{y_{ti}}} = {b_0} + {b_1} \times {t_i}$$

where $\widehat {{y_{}}}$ , ${b_0}$ and ${b_1}$ are the estimated values of the actual yield $y$ at time t for the ith farm,

intercept, and the slope coefficient.

1. 2. Predicted yields for 2019 are computed using the estimated parameters of the linear trend regression. The 2019 predicted yield for each county is used as the approved yield for each representative farm.

2. 3. We assume that the representative farm has a mean yield equal to the predicted county yield and the yield variability consistent with the average riskiness of farms participating in the corn RP insurance program (Coble, Dismukes, & Thomas, Reference Coble, Dismukes and Thomas2007).

3. 4. To calculate yield variability, first, we estimate the residuals from the linear time trend model used in step 1. Then we search for a multiplier (k) that will inflate county yield variability to a level consistent with RMA county base rates to depict the representative farms’ yield accurately (Coble, Dismukes, & Thomas, Reference Coble, Dismukes and Thomas2007):

$${d_f} = {d_c}*k$$

where ${d_f}$ is farm yield deviation from expectation, ${d_c}$ is county yield deviation from expectation (i.e., the residuals), and k is a multiplier or inflation factor that accounts the variability between the county and average farm yields (Coble, Dismukes, & Thomas, Reference Coble, Dismukes and Thomas2007). Inflation factor is found out by conducting a grid search from 1 to 5 by interval of 0.2 that results in a variance that closely approximates the RMA county base rates.

1. 5. These inflated residuals (also known as farm yield deviation) are then added to the 2019 predicted yields to generate detrended yields, which represent actual yields, for the representative farms.

5.2. Future Price Calculation

For simulating prices, we use the Commodity Research Bureau’s (CRB) the national-level daily corn future prices from 1985 to 2018. Steps for simulating prices are as follows:

1. 1. Following the approach used by RMA to set the projected price, the daily closing future prices for the December contract for corn are obtained for all trading days in February, and a mean value is computed.

2. 2. Likewise, the harvest price is calculated as the mean price for all trading days in the month prior to the December contract expiration month. The simple difference between the harvest price and the projected price is the price change from planting to harvest time.

3. 3. The historical harvest prices are then normalized to the 2019 price level using equation (16):

(16) $${f_1}_{2019} = {f_{{0_{2019}}}}\left( {\;{{{f_{1t}}} \over {{f_{0t}}}}} \right)$$

that represents the product of the 2019 projected price ( ${f_{{0_{2019}}}})$ and the ratio of the historical harvest price $\left( {{f_{1t}}} \right)$ to the historical projected price $\left( {{f_{0t}}} \right)$ for each year.

5.3. Indemnities, Premiums, and Liability Simulation

After calculating yields and prices, we simulate the indemnity payment that reflects the amount by which revenue guarantee exceeds the actual revenue. Steps for simulating indemnity are given below:

1. 1. Before calculating the revenue guarantee, we first calculate the acreage weighted average corn coverage level for RP in each county using the 2018 summary of RMA business data.

2. 2. Then, we estimate revenue guarantee for RP policies as a higher of projected or harvest price times approved yield times weighted average corn coverage level.

3. 3. After estimating the revenue guarantee, actual revenue for RP policies is calculated as actual yields times harvest price.

4. 4. Finally, the RP indemnities for each representative farm are calculated by subtracting actual revenue from the revenue guarantee.

While computing the indemnity’s components (weighted average corn coverage level, revenue guarantee, and actual revenue) for each county representative farm, we draw yields and prices for every farm simultaneously to maintain the empirical price-yield correlation.

Steps for simulating premium and liability are as follows:

1. 1. Actual premium is a function of various factors, such as price volatility, producer choice of coverage level, unit structure, crop rotation, and varying acreage over time. However, under the terms of the 1994 Crop Insurance Reform Act, the expected loss ratio of an insurance program must not be more than one indicating the projected amount of premiums at least equal indemnities. Thus, we simulate the actuarially fair premium for each representative farm to be equal to the yearly average of indemnities simulated for each farm.

2. 2. The liability for each farm is calculated as the product of the 2019 projected price, weighted average corn coverage level, and 2019 predicted yield of each farm.

After calculating indemnities, premiums, and liabilities at farm levels, we aggregate total indemnities, premiums, and liabilities by year after weighting them with 2018 county net acreages giving more weights to counties with more acreages planted. Net acreage, as per RMA, is defined as the number of acres reported as being planted adjusted by the insured’s share in the commodity. The aggregation by year further preserves the empirical correlation between prices and yields across space.

The aggregated total indemnity and premium are normalized using a ratio of 4.02 million dollars (maximum possible amount of liability, calculated as 2019 projected price times one million bushels, that could be incurred by the insurer) to liability. In other words, the premium received and indemnity paid by the insurance company represents certain percentages of the liability for insuring a million bushels of corn.

5.4. Option Payout

After simulating the company book of business’s net return for every year, we compute option payout. If a crop insurer wants to protect against its exposure to both the upside and downside price risk of RP, as mentioned before, it must purchase some combination of put and call options.

The insurer knows the expected yields, but actual production is unknown. Therefore, we assume that the crop insurer is hedging a certain percentage of the value of one million bushels of corn using options. We conduct the grid search for hedging percentages that maximize the certainty equivalent, at every 0.5% for each year when put and call options are mixed (200 scenarios). In other words, for every year, we assume that the crop insurer could employ, for example, one of the following hedging strategies:

1. 1) the combination of a put option hedging zero percent of one million bushels and the call options hedging from 0 to 100% by an increment of 0.5%,

2. 2) the combination of a put option hedging 0.5% of one million bushels and the calls hedging from 0 to 100% by an increment of 0.5%,

3. 3) the combination of a put option hedging 1% of one million bushels and the calls hedging from 0 to 100% by an increment of 0.5% so on.

Thus, for every year, we have 40,401 combinations of put and call options. Each year’s option payouts are calculated using (4) and (5) for put and call options, respectively. The put and call option premiums were calculated to be fair expected option premiums based on data from 1985 to 2017.

5.5. Calculation of End-Of-Period Wealth, Expected Utility, and Certainty Equivalent

After calculating the option payout, we compute the end-of period-wealth for every year and every combination of put and call options. The crop insurer’s initial wealth, W _0, is assumed to be 4,020,000 dollars, an amount equal to the value of the crop protected. When the SRA is not considered, as in (6), end-of-period wealth is a function of initial wealth, net return from the book of business, and net option return. When the SRA is combined with options, as in (8), the end-of-period wealth consists of initial wealth, and the net return on the retained book of business and net option return is adjusted by the retain percentage.

After computing the end-of-period wealth, we estimate the utility for the crop insurer using equations (9) and (10). We assign the value of 1, 2, and 3 for R to represent low-, moderate-, and high-risk aversion. For each risk aversion category, we estimate the yearly average utility for a given combination of put and call options to obtain the expected utility.

We then calculate the certainty equivalents for different relative risk aversions based on the expected utility estimates based on the expected utility estimates (12) and (13). The certainty equivalent reflects the crop insurer increased welfare from risk reduction due to hedging. A given combination of put and call that result in the highest certainty equivalent is deemed optimal hedge ratios.

5.6. Alternative Scenarios

This study simulates six different scenarios for RP and expected utilities for each scenario. These scenarios are presented in Table A1 in the appendix. Each scenario is a combination of region and risk management tools. The study regions cover the Corn Belt, outside the Corn Belt, and the United States as a whole. The risk management tools include a mix of put and call options and a mix of put and call options and SRA.

Our analysis separated the Corn Belt from the whole United States, because in major production regions for corn, there is empirical evidence of a natural hedge between farm yields and aggregate prices (Bulut et al. Reference Bulut, Schnapp and Collins.2011; Coble et al. Reference Coble, Miller, Zuniga and Heifner2004; Finger Reference Finger2012). Both yield and price components of crop revenue are random variables that are subject to systematic risk. The price risk is perfectly correlated for crop revenue policies with the same parameters. Here, parameters refer to both projected and harvest prices which are derived from the future markets. Sometimes, yield risk is also systematic if a positive correlation exists between yields on nearby farms due to spatially correlated weather events or disease (Holly Wang & Zhang Reference Holly Wang and Zhang2003). Since an inverse relationship exists between price and yield in the Corn Belt, a decrease in production can be offset by an increase in price. Yet, despite the natural hedge between yield and price, large decreases in harvest price or yields can sometimes result in large aggregate indemnity payments (Bulut et al., Reference Bulut, Schnapp and Collins.2011).

6.1. Summary Statistics

Table 1 summarizes the simulated variables’ means and their standard deviation. The means of projected and harvested future prices for the period 1985–2017 equal $3.232/bu. and $3.062/bu., respectively, and their standard errors are less than 1.5. Table 1 also provides information on the fair expected option premiums for put and call options which equal $349,612.12 and $179,903.03 with the standard errors of $ 357,562.28 and $ 423,031.23 when one million bushels of corn are hedged. The average simulated corn yields for the whole nation, outside the Corn Belt and the Corn Belt, equals 147.90, 142.86, and 167 bushels per acreage with standard deviation 45.23, 44.65, and 42.13.

Table 1. Summary statistics of simulated variables

Table 2. Optimal Hedge Ratios for RP when considering the option market only for a relative risk aversion coefficient of 2

Note: Tables A2 and A3 in the appendix show the optimal hedge ratios with risk aversion equal to 1 and 3.

Table 2 further suggests that the crop insurer would have to indemnify less when the policies are sold in the Corn Belt as compared to the other two study regions. This is obvious, as the prices are assumed to be the same in all three study regions, and yields are high in the Corn Belt. All things being equal, and the lower harvest price would result in less indemnity payment in the Corn Belt in comparison with the other two study regions. Premiums vary across years due to changes in price and liability. In all scenarios and all regions, mean premiums are equal to mean indemnities, as premium rates are set at an actuarially fair rate based on the simulated data.

Figure 1 depicts the simulated average yields for corn per acreage in the United States from 1985 to 2018. As you can see from this figure, the corn yield at each study region (i.e., national level, outside Corn Belt, and Corn Belt) shows a small decrease in yields from 1985 to 1990 and an increase in yields from 1991 onwards. However, in 2012, the yields for all three regions were significantly down. The 2012 simulated yields for all three regions are able to reflect the drought conditions in most of the corn-growing states that caused the corn production to decline rapidly.

Figure 1. Detrended yields by year.

Figure 2 represents the simulated price per bushels for corn over the periods, 1985–2018. The simulated data indicate that there were no appreciable changes in both prices until 2006 and then a steady increase in price until 2012 and a decrease in prices after 2012. Similarly, the projected prices seemed to be higher than the harvest prices until 2009, and after 2009, the harvest prices were higher until 2012, and after 2012, the projected prices were higher compared to the harvest prices.

Figure 2. Simulated prices by year.

Average simulated premiums and indemnities for each study region are shown in Figure 3. Figure 3 highlights that the average simulated premiums in all regions seem to be steady over the period. While individual premiums (as mentioned above) fluctuate across years due to changes in price and liability, the average premium received for the Corn Belt is slightly lower as compared to the national level and outside the Corn Belt. The average premium received for the national level is slightly higher as compared to the outside Corn Belt. Average indemnities paid in all three regions are steady over time. However, in 2012, the decline in yields was much lower than the increase in harvest price triggering a huge amount of indemnity payments in all three study regions.

Figure 3. Simulated premiums and indemnities by year.

6.2. Optimal Hedge Ratio Under Different Scenarios

Table 3 presents optimal hedge ratios and certainty equivalents under different scenarios when the degree of risk aversion equals two.Footnote ⁶ This study assumes that the crop insurer will buy a mix of both put and call options to hedge the price risk of corn RP policies. For RP policies, the lower harvest price results in the indemnity payment based on the projected price even if the actual yield is higher than the APH yield.

Table 3. Optimal Hedge Ratio for RP when mixing the options (Put & Call) with SRA for a relative risk aversion coefficient of 2

Note: Table A4 and A5 in the appendix show the optimal hedge ratios with risk aversion equal to 1 and 3.

As per Table 3, the optimal put and call option hedge ratios are 13.5 and 74% for the whole United States, 10 and 37% for the study regions outside the Corn Belt, and 14 and 100% for the Corn Belt. Call options seem to be more efficient in hedging the upside price risk when yields decline. In the Corn belt, the simulation indicates that call options could hedge up to 100% of one million bushels when the yield declines, thus protecting the crop insurer from losses of the increased revenue guarantee. Whereas put options are inefficient in hedging, the downside price risk for RP policies sold in all three study regions, as the optimal hedge ratios are very low. Combined, both options hedge the optimal quantities of 875,000, 470,000, and 1,140,000 bushels and the optimal liabilities of $ 3,517,500, $1,889,400, and $4,582,800 at the national level, outside the Corn Belt and the Corn Belt.

Tiwari (Reference Tiwari2017) had also examined whether the price risk of revenue policies could be hedged using options (i.e., put and call options separately) only. Her studies found quite a low optimal hedge ratio for both the options, thereby indicating the inefficiency of options to hedge the price risk of crop revenue policies. Furthermore, her assumption of hedging using put and call options separately instead of combinedly reflects insufficient hedging strategies that cannot provide complete coverage of price risk (i.e., both downside and upside price risk at the same time) to the insurer. Furthermore, Driedger et al., (Reference Driedger, Lysa and Milton2016) found that the hedge positions (that is, long futures, and long call options) increased yield insurance losses as compared to unhedged positions. By contrast, in our case, call options are effective in hedging the upside price risk that triggers indemnity payment when yield declines in sufficient magnitude.

Our findings are consistent with the unique nature of crop revenue insurance. When crop prices decline between planting and harvest, RP functions as revenue insurance. The analysis further suggests that the put options can reduce some risk exposure of a crop insurer due to a price decrease. This implies that for a risk-averse crop insurer, the price risk reduction of RP by put options would provide greater expected utility as compared to the unhedged position, all else being equal. Furthermore, when the price increases between planting and harvest, RP functions as a yield insurance policy indemnified at the harvest price (because both the revenue guarantee and the realized revenue are increasing with the price). Results show that the risk of increased revenue guarantee due to the price increase and yield decline can be hedged using call options. Call options perform better than put options in transferring RP loss, thus indicating that options are better in hedging upside price risk than the downside price risk.

This study also analyzes the strategies where options are mixed with the SRA to determine whether the downside price risk of RP could be hedged efficiently. Table 4 reports the optimal hedge ratio under different scenarios when a crop insurer tries to hedge RP’s price risk through the combination of options and the SRA. The combination of options and the SRA results in a zero optimal hedge ratio for each retention level for RP in all three regions. This suggests that the certainty equivalents for a crop insurer from the SRA alone at each retention level are higher than the combinations of SRA and options. The certainty equivalent from the SRA is higher, since the average end-of-period wealth from the SRA at each retention level is greater than the average end-of-period wealth from the combinations of the SRA and options. Certainty equivalent is derived from the expected utility, which in turn, is the function of end-of-period wealth. When options are combined with the SRA, the crop insurer has to bear the additional fixed costs of buying options and exchange the premium based on the retention level for risk exposure that decreases the end-of-period of wealth of the crop insurer.

Tables 3 and 4 further indicate that the average end-of-period wealth of a crop insurer from the SRA for each retention level is higher than the average end-of-period wealth when only options are used to hedge. This implies that a risk-averse crop insurer will prefer the SRA, which seems to guarantee the full protection against both price and yield risks in exchange for the premium, rather than the options where returns from hedge position are quite uncertain.