Analytical representation

Pearson⁽ Reference Pearson ^{15 )}, a key figure in the development of statistics, wrote of the spurious correlation problem of ratios in 1897. He described the general situation where there are three component variables used to construct other (ratio) variables. In the present setting, let p be price of food per gram and d be energy density. The ratio variable, $r=p/d$ , is then price of food per gram divided by energy density. Pearson⁽ Reference Pearson ^{15 )} showed that even if there is no correlation between component variables, such as p and d, there still may be correlation between the constructed variables r and d and he defined this to be ‘spurious’ correlation. Following the literature⁽ Reference Pearson ^{15 –} Reference Brett ^{21 )}, this is the definition used here as well. Although straightforward, Pearson’s approach relies on a first-order approximation that may give misleading results⁽ Reference Brett ^{21 )}. While inspired by Pearson and others⁽ Reference Pearson ^{15 –} Reference Brett ^{21 )}, our approach is novel and does not require any approximation.

Assume that the possible relationship between the component variables p and d is represented in function notation as: $p={\mathop{\rm f}\nolimits} (d)$ . The ‘real’ proponents focus on the relationship between the price per gram divided by energy density $r=p/d$ and energy density d ⁽ Reference Drewnowski ^{3 –} Reference Drewnowski ^{9 )}. Substituting for p then gives: $r={\mathop{\rm f}\nolimits} (d)/d$ . The question is: what is the relationship between r and d? Note that even if there is no relationship between p and d (i.e. p remains constant as d changes), r will still decrease as d increases because the denominator of r will increase. However, more generally, using the quotient rule of calculus, it can be shown that r could be negatively, positively or not related to d. We utilize some basic mathematics to formalize this idea and develop the test.

As the analysis is working with ratios, log functions and operators are convenient; indeed the graphs in this literature are often reported on a log scale. Let the relationship $p={\mathop{\rm f}\nolimits} (d)$ be represented by the double logarithm regression model: $\ln p=\alpha {\plus}\beta \ln d{\plus}{\varepsilon}$ , where ‘ln’ is the natural logarithm operator, α is the unknown intercept, β is the unknown slope and ε is the disturbance term. If there is no relationship between $\ln p$ and $\ln d$ , then $\beta =0$ .

Now by definition, the price per gram divided by energy density is $r=p/d$ , so by the rules of logarithms: $\ln r=\ln (p/d)=\ln p{\minus}\ln d$ . Note the subtraction of $\ln d$ in the logarithmic form is due to the fact that energy density d is in the denominator of the price definition. Direct substitution for $\ln p$ yields:

$$\eqalignno{ \ln r=\alpha {\plus}(\beta {\minus}1)\ln d{\plus}{\varepsilon} \cr =\alpha {\plus}\lambda \ln d{\plus}{\varepsilon}, $$

where the second line just recognizes in a regression framework that only the slope $(\beta {\minus}1)$ can be estimated, so this slope coefficient is defined as $\lambda =(\beta {\minus}1)$ . So when a regression model like equation (1) is estimated, an estimate of the intercept α and an estimate of the slope λ will be obtained. The estimate of the slope λ, along with its t statistic or P value, will be used to draw inferences about whether the relationship between price and energy density is negative and significant. However, note that the value of λ (negative, zero or positive) is actually determined by the value of β relative to ${\minus}1$ .

A spurious test can be deduced from evaluating all the possible ways $\lambda =(\beta {\minus}1)$ in equation (1) can be negative and is summarized in Table 1. The only way λ can be negative and not spurious is for $\beta \,\lt \,0$ and in this case λ must be less than ${\minus}1$ (first row). If the value of β is such that $0\leq \,\beta \,\lt \,1$ , then the value of λ will be negative and in the range ${\minus}1\,\leq \,\lambda \,\lt 0$ (second row). However, this only occurs because the ${\minus}1$ in λ dominates the positive value of β and so the negative relationship is solely due to the fact that energy density is in the denominator of the definition of price and thus the relationship is spurious. In the final case, if $1\leq \beta $ , then $0\leq \lambda $ (third row) and there is no negative relationship anyway. Because the value of λ is really determined by the value β, whether or not there is a non-spurious (for simplicity, ‘real’) inverse relationship between price and energy density is ultimately determined by the regression of (log) price per gram v. (log) energy density.

Table 1 Spurious negative relationship summaryFootnote †

† β is the slope coefficient in the regression model: $\ln p=\alpha {\plus}\beta \ln d{\plus}{\varepsilon}$ , where p is the price of food per gram and d is energy density. λ is the slope coefficient in the regression model: $\ln r=\alpha {\plus}\lambda \ln d{\plus}{\varepsilon}$ , where r is price per energy density and, as discussed in the text, we know $\lambda =(\beta {\minus}1)$ .

Statistical testing framework for spurious correlation

The above logic indicates there are two equivalent ways to test for a spurious inverse relationship between the price per energy density and energy density using a one-sided t test: (i) use the regression equation $\ln r=\alpha {\plus}\lambda \ln d{\plus}{\varepsilon}$ and test

$$H_{0}^{\lambda } :\lambda \geq {\minus}1\,\,\,\,\,\,\,\,\,H_{a}^{\lambda } :\lambda \lt {\minus}1$$

or (ii) use the regression equation $\ln p=\alpha {\plus}\beta \ln d{\plus}{\varepsilon}$ and test

$$H_{0}^{\beta } :\beta \geq 0\,\,\,\,\,\,\,\,\,H_{a}^{\beta } :\beta \,\lt\, 0,$$

where the only difference in the estimating equations is the dependent variable (i.e. $\ln r$ v. $\ln p$ ). Equation (3) is obtained simply by using $\lambda =(\beta {\minus}1)$ in equation (2). It can be shown that the test statistics, and therefore P values, from both tests will be mathematically equivalent. In either case, the null hypothesis is that the relationship between price and energy density is a spurious negative relationship. This should make sense because, as shown in Table 1, the only way for the relationship to not be spurious (be ‘real’) is for $\lambda \lt {\minus}1$ , which is equivalent to $\beta \, \lt \, 0$ , and following standard statistical reasoning, the null hypothesis is the negation of the theoretical hypothesis of interest. If the null hypothesis is rejected in either form, the inverse relationship is deemed statistically non-spurious or simply real. However, if the null hypothesis is not rejected then there cannot be a real inverse relationship, rather the relationship is either a spurious inverse relationship or there is not an inverse relationship. Operationally, the most straightforward approach to determining if a significant inverse relationship is spurious or not is to simply estimate equation (1), note if the estimate of λ is negative, and then ask the software package to conduct the one-sided t test indicated by the null hypothesis in equation (2) and check the P value on this test. Following standard statistical testing procedures, if this P value is greater than a reasonable significance level (e.g. 0·05), the null hypothesis is not rejected and the inverse relationship is spurious; otherwise it is real. Alternatively, if the estimate of λ is non-negative (significant or not) then there is no inverse significant relationship anyway.

Data description

Data from the National Health and Nutrition Examination Survey (NHANES) 2003–04^{( 22 )}, the MyPyramid Equivalent Database 2·0 (MPED)⁽ Reference Bowman, Friday and Moshfegh ^{23 )} and the Center for Nutrition Policy and Promotion’s (CNPP) Food Prices Database 2003–04 (FPD)⁽ Reference Carlson, Lino and Juan ^{24 , 25 )} are utilized in the analysis. The years 2003–04 have the most recent data available for both food prices and cup- and ounce-equivalents.

The NHANES^{( 22 )} is a well-known multistage probability sample of non-institutionalized individuals living in the USA. The 24 h dietary recall data are used to generate a list of foods and calculate the average amount consumed by adults aged 19 years and older who report consuming that food. The 2003–04 sample includes 4578 adult participants with at least one complete dietary recall and for the data used in the present analysis there are 4430 individual foods.

The MPED⁽ Reference Bowman, Friday and Moshfegh ^{23 )} gives the number of cup- and ounce-equivalents in 100 edible grams of each food item. Vegetables, fruits and dairy products are measured in cup-equivalents, and grains and protein foods in ounce-equivalents^{( 26 )}. The MPED does not assign food items into food groups, since many food items have quantities of more than one food group.

US Department of Agriculture’s (USDA) CNPP developed the FPD for all foods reported consumed in the NHANES 2003–04. The database contains estimates of the price per edible 100 g, i.e. the price of the food after it is prepared. The retail price data for the FPD comes from Nielsen’s 2004 Homescan Panel data, a national panel of consumers who record their retail food purchases. Prices are national average prices in $US and include all package sizes and brands that were recorded by panel participants.

Foods were placed in groups following the method outlined by Carlson and Frazao⁽ Reference Carlson and Frazao ^{2 )}. Appendix Tables 11–15 of the Dietary Guidelines for Americans 2010 ^{( 1 )} suggest a standard portion size for vegetables, fruits, dairy, protein foods and grains. If the average amount of the food consumed was at least half of this standard amount, the food was classified into a food group (vegetables, fruit, grain, dairy and protein). The foods were further divided into the same subgroups used in the USDA Food Patterns (see Appendix 7, 8 and 9 of the Dietary Guidelines for Americans 2010 ^{( 1 )}). Of course some foods are a mixture of several food groups. For example, vegetable lasagne purchased at a retail establishment or prepared at home would contain a significant amount of vegetables, dairy and grains. Foods that met the standards for more than one group (say vegetables, dairy and grain) were classified as ‘mixtures’ and where possible were assigned to subgroups, such as vegetable-based mixtures, based on the more predominant group. Two other categories were also created, ‘mixed dishes’ and ‘moderation foods’. The distinction between ‘mixed dishes’ and ‘moderation foods’ is based on the level of saturated fat, added sugars and sodium. ‘Mixed dishes’ foods were allowed at least 4g of saturated fat, 600 mg of Na and 1·25 teaspoons of added sugars. Examples of mixed dishes are items like burritos, casseroles, pizza and soup. ‘Moderation foods’ were defined as any food with at least 480 mg Na, 1 teaspoon of added sugars and/or 3 g of saturated fat. Examples of ‘moderation foods’ are items like a baked potato with bacon and cheese, granola and fruit-flavoured low-fat yoghurt. Foods that did not contain sufficient amounts of any group were classified as ‘non-food group-based foods’. Please see Carlson and Frazao⁽ Reference Carlson and Frazao ^{2 )} for more details on the creation of these groups. In sum, there are twenty-five food groups. All of the following statistical analysis was done using the statistical software package STATA version 11·1.

For each of the twenty-five groups Table 2 shows summary statistics for both the price ($US/100 g) and energy density (4·184 kJ/100 g or equivalent kcal/100 g). All except two groups (Lean Red Meat and Fish) have a price less than $US 1 but, perhaps not surprisingly, there is a greater range of energy densities. The standard deviations within each group indicate a large degree of variability within each group for both price and energy density.

Table 2 Means and standard deviations per 100 g for price and energy density by food group