Long-Term Weather Conditions and County Farm Value

We first investigate the historical pattern of the relationships between the county average of farm value and its weather conditions using scatter plots. This cross-sectional analysis is intended to show that county farm value has adapted to the permanent features of local weather over time in the United States. Although the range of temperature and precipitation is substantial in the United States, the results that follow do not specifically address the over-time instability of such relationships outside the United States.

For the six selected decades, the upper panel of Figure 1 plots the logarithm of each county's average farm value per acre against its decadal average of annual mean temperature (Fahrenheit), which is calculated for the 10 years prior to the year of census.Footnote ⁵ We also put a linear trend line and a lowess fit curve on each decade's scatter plot. The bivariate diagrams suggest that the relevance of temperature to farm value gradually changed across decades. High temperatures depressed farm value in the second half of the nineteenth century, but this negative association weakened throughout the early twentieth century. In recent decades, farm value has been (marginally) increasing with temperature. In addition, a quadratic relationship is evident in the late nineteenth century, with a peak of around 50^oF. However, this inverse U-shape relationship has attenuated over time and appears non-significant in recent decades.

Notes: Each weather variable on the x-axis denotes the 10-year average of annual weather values prior to each census year. The y-axis denotes the logarithm of the county average farm value per farmland acre. Solid curves are lowess fit curves, and dotted lines are linear fit lines. Sources: Authors' calculations based on farm statistics found in the historical census records (Haines and ICPSR Reference Haines2010) and Kriging-interpolated weather variables. Details are provided in Appendices 1 and 2.

Figure 1 LOG COUNTY AVERAGE FARM VALUE PER ACRE BY 10-YEAR AVERAGE TEMPERATURE AND PRECIPITATION

A similar historical pattern is observed between county farm value and decadal averages of annual accumulated precipitation, which is presented in the lower panel of Figure 1. An inverse U-shape relationship is observed until the early twentieth century. For the counties whose decadal average of annual accumulated precipitation was below about 35 inches, farm value increased with precipitation. However, a high level of precipitation above this threshold depressed farm value. The nonlinear pattern indicates a negative correlation between county farm value and precipitation in the late nineteenth century, and the negative slope became flat and non-significant throughout the early twentieth century. The attenuation of the negative relationship and inverse U-shape relationship accelerated toward the late twentieth century; county farm value has been rapidly increasing with precipitation levels in recent decades.

This bivariate cross-sectional analysis shows that (a) adaptation to hot and wet weather can be clearly observed if we look at adaptation across longer time periods and that (b) the pattern of adaptation has occurred very gradually. However, this hedonic approach does not determine whether this adaptation to permanent weather conditions resulted from a change in the climate effect or a change in the effect of other local agricultural, socioeconomic, or demographic characteristics that happen to be correlated with weather variables.

Fixed-Effects Model

As a complementary approach, we use a fixed-effects model and compare it with the cross-sectional results described earlier. Equation (1) estimates the historical pattern of the effect of long-term weather on farm value, controlling for state- and year-specific improvements in agricultural technologies and time-invariant county factors:Footnote ⁶

(1)

where Y_ijt is the logarithm of county i (in state j)'s average farm value per acre measured at census year t, W_ijt is the decadal average of each weather variable (temperature or precipitation) in county i, X_ijt are vectors of county-level agricultural controls and constant terms, D_t are dummies indicating year t, δ_t are year fixed effects, δ_jt are state-by-year fixed effects, and δ_i are county fixed effects. The latter two sets of fixed effects appear only in some specifications, as noted later. As county-level controls, we use county population density, the ratio of white population to county population, the ratio of farmland to total available county area, and the estimated number of farmers per farmland acre. Sources and the construction of each control variable are discussed in Appendix 2. Equation (1) considers the impact of cross-decade variation in weather within a county and focuses only on the linear relationship between county farm value and weather variables. In the estimation model, the reference year is 1870. The coefficients β_t estimate the extent to which the response of farm value at census year t to local temperature or precipitation differed from its level in 1870. Finally, the equation is estimated using weighted ordinary least squares regressions. We calculated standard errors of estimated weather values using the Kriging process and used the inverse of the standard errors as regression weights.

Each panel in Figure 2 graphically presents the coefficient β_t for temperature and precipitation. Dotted lines represent the results of estimating equation (1) including only year fixed effects from three types of fixed effects; dashed lines represent the results with additional control for state-by-year fixed effects; solid lines represent the estimation results with county fixed effects.Footnote ⁷

Notes: We ran the weighted regressions of the logarithm of county average farm value on the 10-year average of annual mean temperature or annual accumulated precipitation prior to each census year, standard controls, and their interactions with the dummies that indicate the 1880–2000 census years, per equation (1). Thus, the reference year is 1870. Each panel is the graphical presentation of regression coefficients of each weather variable. The dotted and dashed lines are the estimation results that employ year and state-by-year fixed effects, respectively; the solid lines additionally employ county fixed effects. The detailed regression results with county fixed effects are reported in Appendix Table 3 in Appendix 3. Sources: Authors' calculations.

Figure 2 TREND OF THE ESTIMATED EFFECT OF LONG-TERM TEMPERATURE AND PRECIPITATION ON COUNTY FARM VALUE PER ACRE

Figure 2 shows that the effect of variation in long-term temperature and rainfall on farm value rapidly changed until the mid-twentieth century. The increasing trend of β_t over the years implies that high temperatures and rainfall became more beneficial to farm value as time passed. Then, β_t remains stable after the period between 1960 and 1970, suggesting that adaptation to hot and rainy weather slowed in recent decades. The estimated coefficients depend on the use of fixed effects. County fixed-effects models estimate smaller effects of cross-decade variation in weather on farm value relative to 1870 levels than do the year or state-by-year fixed-effects models. Accordingly, a slower adaption to hot and rainy weather is estimated when county fixed effects are used. This means that the historical pattern observed in Figure 1 can be explained largely by non-weather unobservable county characteristics that are correlated with county weather conditions.Footnote ⁸

Measuring Adaptation to the Weather across Centuries

The key findings noted earlier are as follows: the effect of hot and rainy weather on farm value substantially changed over the past two centuries, and the turnover of the historical pattern occurred chiefly throughout the first half of the twentieth century. Thus, if we compare the effect between the beginning (late nineteenth century) and end (late twentieth century) periods of the sample time window, the magnitude of the adaptation can be estimated more accurately.

For the comparison, we select two periods: 1870 to 1900 and 1970 to 2000. In columns (1) and (2) of Table 1, we run weighted regressions of county farm value on decadal weather variables, the standard controls used earlier, and state dummies (in other words, state fixed effects) for each century. Column (3) estimates the significance of the difference in marginal effects between the two centuries by examining interactions between all control variables and a dummy that indicates the census year in the nineteenth century (D ₁₉). The estimation model also controls for century-by-state fixed effects. Panels A and B estimate the marginal effect of temperature (denoted by T in Table 1) and precipitation (P) on farm value, respectively. We report only the coefficients and standard errors for weather variables in Table 1. The results of columns (1) and (2) reflect the long-term relationship between decadal weather conditions and farm value shown in Figure 1. The coefficient of the weather variables interacted with D ₁₉ in column (3) shows that the cross-century change in the effect is statistically significant.

Table 1 CENTURY DIFFERENCE IN THE RESPONSE OF COUNTY FARM VALUE TO LONG-TERM WEATHER CONDITIONS

∗ = Significant at the 90 percent level.

∗∗ = Significant at the 95 percent level.

∗∗∗ = Significant at the 99 percent level.

Notes: We estimate the century difference in the response of county farm value to long-term weather conditions. For the regressions, we select the representative periods of two centuries: the decades ending with 1870, 1880, 1890, and 1900 for the nineteenth century, and the decades ending with 1970, 1980, 1990, and 2000 for the twentieth century. The long-term weather conditions are measured by the 10-year average of annual mean temperature (T) and annual accumulated precipitation (P) from each census year, respectively. T_m and P_m denote the sample mean of temperature and precipitation variables, respectively. D ₁₉ denotes the dummy variable that indicates the census years in the nineteenth century (in other words, 1870, 1880, 1890, or 1900). In all the regression models, we control for each county's population density, ratio of white populations, ratio of farmland to total county area, and number of farmers per farmland acre in each census year. Columns (1) and (2) estimate the marginal effect of weather on farm value in each century. Columns (3) and (4) estimate whether the marginal effect is significantly different across the centuries by pooling both centuries and adding the interaction terms between weather variables and D ₁₉, per equation (2). However, we use different fixed-effect models in columns (3) and (4). Weighted regressions are used in all the estimations, where the regression weight is the inverse value of the weather estimates' standard errors. Panels A and B employ temperature and precipitation, respectively; Panel C employs both variables together. The table reports only the coefficients of key variables. The standard errors of regression coefficients, reported in parentheses, are clustered on county.

Sources: Authors' calculations.

Column (4) uses state-by-year fixed effects rather than state-by-century fixed effects and also controls for county fixed effects, as follows:

(2)

where i, j, and t denote county, state, and census year, respectively. This slightly changes the marginal effect of weather in each century and the magnitude of its difference across centuries (β in equation [2]). However, the difference remains significant and similar to that seen in Figure 2.

The purpose of the analysis throughout is not to characterize the agricultural and policy determinants of farm productivity but rather to assess instability in the weather–productivity relationship over time, which we argue measures adaptation (defined broadly) over the centuries. Many endogenous factors affect farm productivity, such as government policies and investments, local infrastructure like railroads, and so on. Of course, fixed-effects models absorb all the fixed county-level and state-by-year characteristics, be they endogenous or exogenous (Figure 2 and Table 2 show similar coefficients with or without such fixed effects). However, our use of additional controls is limited by several considerations. First, few potential control variables are consistently measured across the censuses. Second, because of a lack of plausible instruments, we would not be able to correct the endogeneity problems for the policy and infrastructure variables, which are likely biased by reverse causality and omitted variables. Third and most importantly, such factors are investments in adapting to circumstances, including the climate. We would not want to remove such adaptation from the estimates, because they are part of the story.Footnote ⁹

Table 2 CENTURY DIFFERENCES IN THE RESPONSE OF COUNTY FARM OUTPUT VALUE TO SHORT-TERM WEATHER CONDITIONS

∗ = Significant at the 90 percent level.

∗∗ = Significant at the 95 percent level.

∗∗∗ = Significant at the 99 percent level.

Notes: We estimate the century differences in the response of county farm output value to short-term weather conditions. The short-term weather conditions are measured by the annual mean temperature (T) and accumulated precipitation (P) in the census year. The specification in each regression is the same as in Table 2. The standard errors of regression coefficients, reported in parentheses, are clustered on county.

Sources: Authors' calculations.

The two weather variables are frequently interrelated. For example, southern counties' climates are characterized not only by high temperatures but also by wet and humid weather. The impact of one weather component on farm value can be compounded by another. We consider this issue in Panel C by running a regression for county farm value on decadal temperature and precipitation and the demeaned interaction of the two weather variables. Other specifications are the same as those used in Panels A and B across the columns. In terms of the coefficients in column (4), which uses stricter controls, the interaction effect and its change over the century appear small or less significant.

To gain a better sense of the implications of the estimated coefficients, we imagine two counties with different levels of annual mean temperature: 55.4^oF for the average county and 62.5^oF for a hot county, which is one standard deviation higher than the mean temperature.Footnote ¹⁰ We assume that the levels of precipitation and other agricultural conditions are identical between counties and across centuries. Then, using the coefficient of T×D ₁₉ in column (4) of Panel C, the cross-century difference in farm value as a ratio (in other words, the level of farm value in the late twentieth century relative to that in the late nineteenth century) is estimated to be 13.7 for the average county and 19.1 for the hot county.Footnote ¹¹ Because there is little difference in county farm value by local temperature today, this simulation suggests that adaptation occurred more rapidly in hotter areas over time. Similarly, using the coefficient of P×D ₁₉ in column (4) of Panel C, the cross-century difference in farm value as a ratio is estimated to be 1.6 for a county with average annual precipitation (41.4 inches) and 1.9 for a wet county with 51.9 inches of annual precipitation, which is one standard deviation higher than the average precipitation. The rate of adaptation seems to be smaller than is that of temperature. However, it still suggests that adaptation to precipitation was evident in wetter areas.

Short-Term Weather Fluctuations and Farm Output Value

In this subsection, we employ an alternative measure of farm productivity: the value of county farm output. This measures how the growth of crops is affected by local weather conditions.Footnote ¹² Unfortunately, farm output value is not available in the census years of 1910, 1920, and 1930. Thus, we use the panel regression described by equation (2), which compares 1870–1900 to 1970–2000, and to which we add state-by-year and county fixed effects. In addition, agricultural production depends more on weather conditions in the year of production (in other words, short-term weather conditions) than decadal weather conditions. Thus, we estimated the short-term weather variables as average temperature and accumulated precipitation in one year before each census year.Footnote ¹³

In Table 2, we examine the marginal effect of short-term weather conditions on county farm output value and its change over the centuries. The regression model and specification in each cell are the same as those used in Table 1. The main findings are that hot and rainy short-term weather was less favorable for producing agricultural output in the late nineteenth century than it was in the late twentieth century and that the adaptation of farm output value to weather occurred more-or-less steadily across decades.Footnote ¹⁴ Moreover, the magnitude of the adaptation to the weather (in other words, the difference in marginal effect across the centuries) is similar to what we estimated using farm value and long-term weather variables in the previous subsection. Again, these results suggest that a forecast of the impact of climate change during one century made with data from the prior century would be problematic.

Robustness

In Table 3, we test the significance of the agricultural adaptation with alternative weather variables and by scale of agriculture. First, we employ alternative weather variables in columns (2) and (3). Crops are cultivated even in winter in some regions, and most of the precipitation comes from the rainy winter season in others. However, weather conditions in winter are less significant for agriculture in many regions. To reflect this fact, we control for annual and decadal average weather variables calculated only for the months of March to October in column (2). On the other hand, we employ average weather variables calculated over the whole time horizon (1860–2000) in column (3) to eliminate the bias caused by the noisy nature of temperature and precipitation. The estimation results in both models are similar to those of the baseline estimation in column (1).

Table 3 ALTERNATIVE WEATHER VARIABLES AND INFLUENCE OF LARGE-SCALE AGRICULTURAL COUNTIES

∗ = Significant at the 90 percent level.

∗∗ = Significant at the 95 percent level.

∗∗∗ = Significant at the 99 percent level.

Notes: We estimate the level of agricultural adaptation to weather, which we examined in Tables 1 and 2, using alternative weather variables, specification, or county groups, as explained in the head of columns. Panels A and B estimate the relationship between county farm value and decadal weather variables, and Panels C and D regard county farm output value and annual weather variables. The specification of each regression is the same as for column (4) of Panel A or B in Tables 1 and 2, where we adopted the baseline results in this table. We report only the coefficient of weather variables interacting with the dummy variable indicating the census years in the nineteenth century. Because column (3) uses the average weather variables calculated for the whole time horizon, the estimation of short-term weather variables in Panels C and D is unfeasible. The regression weights, except in column (4), are the inverse value of the decadal, annual or centurial weather estimates' standard errors, which is calculated from the Kriging estimation. The standard errors of regression coefficients, reported in parentheses, are clustered on county.

Sources: Authors' calculations.

Second, the extent of agriculture varies across counties and decades. More agricultural counties can be more active in adapting to weather than small-scale agricultural counties. Thus, the relationship between agricultural outcomes and weather could be influenced by counties with large-scale agriculture. To test this possibility, we conduct three additional analyses. In column (4), we run weighted regressions with the ratio of farmland to total county area in each census year as regression weights. This up-weights counties that are more agricultural. The result is similar to that of the baseline estimation. Alternatively, we restrict the regressions to counties with large-scale agriculture both in 1870 and 2000 in column (5) and those with small-scale agriculture in both census years in column (6). In both columns, we utilize the average ratio of county farmland in each census year to divide large- from small-scale agriculture. In columns (5) and (6), the adaptation is substantially estimated not only for large-scale agricultural counties but also small-scale ones. In particular, the adaptation in the relationship between annual temperature and farm output value is estimated more substantially for small-scale agricultural counties, suggesting that the adaptation to weather widely occurred across the broad scale of agriculture.

Third, some may argue that a substantial response to extreme weather conditions would be to not settle the regions with extreme conditions. In this case, many unsettled areas, particularly in earlier sample years, could skew the analysis by resulting in high farm value per farmland acre even though county land was not valuable on average. Then, the value per farmland acre could fall over time as more places become tolerable due to technological adaptation. We may not be able to completely test and reflect this possibility. Considering data limitations, one way of testing is to employ farm value or output value per county area rather than those per farmland acre.

The results of using those alternative dependent variables are reported in column (2) of Table 4. The coefficients of precipitation interacted with the nineteenth century dummy are estimated to be somewhat smaller than those of the baseline estimation in Panels B and D. This may suggest that much farmland in the late nineteenth century was unsettled or not valuable. If the pattern was more frequent in dry counties (more land-improved) than in wet counties (less land-improved), the nineteenth-century slope of agricultural outcomes per county acre against average precipitation would be flatter than as seen in Figure 1; however, this pattern seems to be less likely in terms of temperature. The estimated coefficients of temperature in column (2) are similar to those of the baseline.

Table 4 ALTERNATIVE MEASURES OF FARM PRODUCTIVITY

∗ = Significant at the 90 percent level.

∗∗ = Significant at the 95 percent level.

∗∗∗ = Significant at the 99 percent level.

Notes: In this table, we employ alternative measures of county farm value and output value. Column (2) uses county farm value or output value per county acre rather than per county farmland acre. In column (3), to reflect the potential double counting of farm output value, we re-calculated county farm output value by excluding 50 percent of corn production and all hay production for nineteenth-century censuses and 15 percent of corn production and all hay production for twentieth-century censuses. We discounted crop values by 10 percent in column (4). Columns (3) and (4) use only the data for 1870, 1900, 1970, and 2000 due to data limitation. Other specification of estimation is the same as that of Table 3. The regression weights are the inverse value of the decadal, annual or centurial weather estimates' standard errors, which is calculated from the Kriging estimation. The standard errors of regression coefficients, reported in parentheses, are clustered on county.

Sources: Authors' calculations.

Finally, there could be a measurement error problem due to double counting in farm output value. Regarding this issue, the 1880 census volume states the following (U.S. Bureau of Census 1883, p. 26):

The double-counting problem can be partially addressed by constructing separate crop and livestock output measures. However, it seems to be difficult to reflect the double counting problem in our estimation systematically. Calculating a county's total value of farm output was based on farmers' reports in the census. Because farmers generally report only the value of their ultimate product, we are not able to calculate the value of duplications. Handling the double-counting problem becomes more complex at the county level because feed crops produced in a county are not always consumed in the same county.

In addition, as farms are less specialized, the double-counting problem is more serious; thus, the problem would be greater for data in the nineteenth and early twentieth centuries (Gardner Reference Gardner2009). As discussed earlier, about 46.6 percent of corn production was estimated as the proportion of double counting; the ratio declined to 14.2 percent in the 1982 agricultural census and to 13.9 percent in the 1992 census.Footnote ¹⁶

We can partially test how double counting may affect our estimation. First, we recalculated county farm output values reflecting the potential double-counting problem.Footnote ¹⁷ We assume that 50 percent of corn production was used for feeding livestock in the late nineteenth century, and 15 percent in the late twentieth century, following the discussion earlier. We also assume that hay would be used only for feeding livestock. Second, we discount county crop value by 10 percent in calculating total farm output value.Footnote ¹⁸ Columns (3) and (4) in Table 4 employ recalculated farm output values as dependent variables. Their results are comparable to the baseline results, even though only data for 1870, 1900, 1970, and 2000 were used due to data limitations.

Significance of Weather Conditions in Early Life

Many studies have revealed that climate and climate change affect activities and the lifetime health of individuals by causing malnutrition from crop failure (Ó Gráda Reference Ó Gráda2007), spreading infectious diseases (Lafferty Reference Lafferty2009; Bleakley Reference Bleakley2007; Hong Reference Hong2007, Reference Hong2011, Reference Hong2013), distorting health conditions over the course of life (WHO, WMO, and UNEP 2003; Patz et al. Reference Patz, Campbell-Lendrum and Holloway2005), changing ecological systems (Thomas et al. Reference Thomas, Cameron and Green2003), and so on. They generally predict that the overall impact of climate change like global warming would be detrimental to human life. From an economic perspective, the channels noted earlier are closely related to the reduction of individuals' economic productivity.Footnote ¹⁹

Recently, Deschênes, Greenstone, and Jonathan Guryan (Reference Deschênes, Greenstone and Guryan2009) demonstrated that extreme temperature in utero can increase the risk of having babies with low birth weights (see also Murray et al. Reference Murray, O'Reilly and Betts2000; Lawlor, Leon, and Smith Reference Lawlor, Leon and Smith2005). Although further evidence is required, they suggest that this can be caused by the association between weather in utero and fetal nutrient intake and stress. The relationship between weather in utero and birth outcome is significant because adverse birth outcomes can affect life-time human capital accumulation (for example, schooling, disability, adult income), as suggested by the fetal origins hypothesis, which has been supported by many studies (Barker Reference Barker1994; Almond Reference Almond2006; Black, Devereux, and Salvanes Reference Black, Devereux and Salvanes2007). In addition, it has been reported consistently that maternal exposure to infectious diseases promoted by weather—most notably malaria—increases the probability of having babies with low birth weights (Desai et al. Reference Desai, Ter Kuile and Nosten2007) and that early-life exposure to malaria can reduce cognitive ability and thus the acquisition of human capital (Holding and Snow Reference Holding and Snow2001; Sachs and Malaney Reference Sachs and Malaney2002; Bleakley Reference Bleakley2010; Barreca Reference Barreca2010; Hong Reference Hong2011).

Cross-Sectional Evidence

In consideration of this mechanism, our study focuses on the significance of early-life weather for later economic outcomes and relevant changes throughout U.S. history. We first look for cross-sectional evidence demonstrating the relationship between weather and adult occupational income from a longer-term perspective using simple bivariate analysis. The adult income variable used is the average occupational income score by state-of-birth cohorts aggregated from the 1880 and 1900 to 1990 IPUMS. We limited individuals to white males born from 1860 to 1960 and observed during working ages (20 to 65) in the Census IPUMS of 1880 to 1990. Using the county weather variables imputed by the Kriging interpolation technique, we construct the 1860–2000 average of annual mean temperatures and annual accumulated precipitation by state. The weather variables represent the overall weather conditions that each cohort might have experienced in early life rather than at a specific point in time.

In Figure 3, we plot average adult occupational income score against long-term average weather variables in the state of birth by two cohort groups: 1860 to 1899 and 1931 to 1960. The figure shows that adult income among the cohort born before 1900 decreases with increasing temperature and precipitation in the state of birth.Footnote ²⁰ In other words, people who were born or had spent their early lives in hotter and wetter states attained lower paying occupations, on average, later in life. However, this relationship almost completely disappears for the cohort born after 1930; there is little difference in adult occupational income by early-life average weather conditions. (The y-axis scale is the same across cohorts for the same outcome; note the compression of the points for the later cohorts.) This suggests the possibility that technological adaptation took place throughout the early twentieth century, mitigating the adverse effects of high temperature and rainfall on individuals' economic productivity.

Notes: This figure plots a proxy of adult income against the state-of-birth average temperature and precipitation for earlier- and later-born cohorts in the United States. We use the 1860–2000 average of annual mean temperature and annual accumulated precipitation by state. A cohort is defined by year of birth and state of birth. Data on native adult white males are drawn from the 1880 and 1900–1990 IPUMS, which span the years of birth 1860–1960. The outcome variable is the average occupational income score, transformed into natural logarithms. Cohorts are grouped into those born before 1900 (in the left plots) and those born after 1930 (in the right plots). The x-axis is the state-of-birth average temperature in the upper plots or precipitation in the bottom plots. The y-axis in each plot refers to the cohort group's average income score. State abbreviations are used to denote the position of each point. The solid line is the best-fit regression line between the points. Sources: Authors' calculations based on IPUMS dataset (Ruggles et al. Reference Ruggles, Genadek and Goeken2015) and Kriging-interpolated weather variables.

Figure 3 THE RELATION BETWEEN AVERAGE WEATHER CONDITIONS IN EARLY LIFE AND ADULT INCOME BY TWO COHORTS

The Diminishing Effect of Short-Term Weather Fluctuations

In addition to the historical change in the relationship between long-term weather in early life and adult income, we find instability in the effect of short-term weather fluctuations around the year of birth on adult income using fixed-effects models. The use of long-term average weather not only captures the effect of weather around the time of birth but also measures the accumulated or lifetime effect of weather if a large proportion of each state-of-birth cohort has lived in the same state for a considerable amount of time. The use of short-term weather variables can more clearly identify the effect of early-life weather on adult income.

In the following estimation model, we search for the specific point in time around birth at which weather conditions have significant effects on adult income by running a regression predicting the cohort average occupational income score from annual mean temperature and accumulated precipitation at the year of birth, at the three years after birth, and at two years before birth, per equation (3):

(3)

where the subscripts j, k, and t denote state of birth, year of birth, and census year, respectively.

The regression is conducted for cohort samples defined by state of birth and year of birth from 1860 to 1960. The model also contains dummies for each cell of state of birth times census year (δ_jt ), and dummies for each cell of year of birth times census year (δ_kt ). These fixed effects will capture omitted and unmeasured characteristics in state of birth, year of birth, and census year that might commonly affect those in a given cohort.

We summarize the key results of the regression for equation (3) in Figure 4. The y axis in each plot displays the estimated regression coefficient on the interaction of the indicated weather variable and a dummy for the calendar year minus year of birth—thus, β_l or γ_l ; the x axis in each plot denotes the calendar year minus the year of birth. The error bars reflect 95 percent confidence intervals for each coefficient.

Notes: This figure summarizes regressions of cohort outcome on early-life weather conditions, per equation (3) in the text. Short-term weather variable is annual mean temperature or accumulated precipitation in each state. A cohort is defined by year of birth and state of birth. Data on native adult white males are drawn from U.S. censuses of 1880 and 1900–1990, which span the years of birth 1860–1960. The outcome variable is, at the cohort level, the occupational income score transformed into natural logarithms. The x-axis in each plot refers to the calendar year minus the year of birth. The y-axis in each plot displays the estimated regression coefficient on the interaction of the indicated weather variable (temperature or precipitation) and a dummy for the calendar year minus year of birth. The error bars reflect 95 percent confidence intervals for each coefficient. Sources: Authors' calculations.

Figure 4 SHORT-TERM WEATHER FLUCTUATIONS AROUND YEAR OF BIRTH AND OCCUPATIONAL INCOME IN ADULTHOOD

The main finding is that adult occupational income scores have been highly associated with cross-year weather fluctuations for specific years in early life. Weather conditions before birth do not have meaningful effects. The year in which temperature has the most substantial, significant effect on adult occupational income is one year after birth; the effect declines over the next two years. The effect of precipitation is most substantial at the year of birth and then becomes non-significant.Footnote ²¹

Because the state-of-birth fixed effects capture state-specific climatic characteristics, the earlier estimation measures the effect of within-state across-year variation in weather conditions around birth. Although many studies suggest a negative effect of hot and wet weather in utero on birth outcomes, some studies have found a positive association between hot/wet weather in early life and conditions at birth through improvement in maternal nutritional status (Costa Reference Costa2004). From the perspective of the fetal origins hypothesis, the positive effect of temperature on birth outcomes can lead to a higher level of human capital accumulation and thus adult income (Maccini and Yang Reference Maccini and Yang2009; Barreca Reference Barreca2010).

Following this line of research, it is interesting that meaningful associations among weather, nutrition in utero, birth outcome, and later outcome are frequently found in studies of historical experiences and developing countries. This association might be attenuated in modern, developed countries by a sufficient year-round food supply, public programs, and technological adaptation. This suggests that the coefficients presented in Figure 4 may vary across cohorts. To investigate this possibility, we look at how the effect of short-term weather fluctuations on adult income has changed across cohorts.

We measure this long-term pattern by estimating equation (3) with a 40-year-wide moving window. The sample for each regression includes cohorts born 20 years before and after the target year; the target years are thus between 1880 and 1940. Figure 5 presents the estimated regression coefficient for the interaction between the indicated weather variable and a dummy for the year chosen according to the results in Figure 4 (in other words, one year after the year of birth for temperature and the year of birth for precipitation). We also add the 95 percent confidence intervals for each coefficient.

Notes: We estimated equation (3) for a 40-year-wide moving window so that the sample for each regression includes white-male cohorts born 20 years before and after the target year. Regarding weather variables, we only control for temperature in the period one year after birth and precipitation at the year of birth according to the results in Figure 4. The x-axis in each plot refers to the average year of birth for cohort samples used. The y-axis in each plot displays the estimated regression coefficient on the interaction of the indicated weather variable (temperature or precipitation) and a dummy for the year chosen as explained above. The error bars reflect 95 percent confidence intervals for each coefficient. Sources: Authors' calculations.

Figure 5 THE DIMINISHING EFFECTS OF EARLY-LIFE WEATHER FLUCTUATIONS ON OCCUPATIONAL INCOME IN ADULTHOOD

The result shows that the effect of short-term weather fluctuations diminished across cohorts. The effect is generally positive among cohorts born in the second half of the nineteenth century, and its across-cohort variation is substantial. However, as the target year approaches 1910 to 1920, the magnitude, significance, and across-cohort variation of the effect attenuate. Weather in early life became less relevant to adult income.

In the upper panel of Figure 5, the estimated coefficient of temperature for 1890 suggests that a one-degree increase in annual mean temperature at age 1 (from its state average) resulted in a 2.4 percent increase in adult income (measured by occupational income score) during the 1870 to 1910 period. The coefficient for 1930 implies that a one-degree increase in annual mean temperature led to a 0.47 percent increase in adult income during the 1910 to 1950 period, but the result is statistically insignificant. Similarly, in the lower panel of Figure 5, the coefficient of precipitation for 1890 suggests that a one-inch increase in annual accumulated precipitation at the year of birth (from its state average) resulted in a 0.7 percent increase in adult income during the 1870 to 1910 period. That of 1930 implies that a one-inch increase in precipitation led to a 0.12 percent increase in adult income during the 1910 to 1950 period, but the result is statistically insignificant.

The pattern of attenuation over time in Figure 5 is similar to what we observe in the cross-sectional analysis using long-term weather variables, although the role of weather in early life is estimated differently between the two analyses. Moreover, it is worthwhile to remind that the diminishing effect of weather was similarly found in the analysis of farm productivity in the previous section. The findings thus far suggest that adaptation to weather significantly occurred throughout the early twentieth century, not only in the agricultural sector but also at the individual level. Once again, we see different coefficients estimated over the course of U.S. history. In this case, the more dated coefficients drastically overstate the impact of climate and human capital.