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The Berkelmans–Pries dependency function: A generic measure of dependence between random variables

Published online by Cambridge University Press:  23 March 2023

Guus Berkelmans*
Affiliation:
Centrum Wiskunde & Informatica
Sandjai Bhulai*
Affiliation:
Vrije Universiteit (VU)
Rob van der mei*
Affiliation:
Centrum Wiskunde & Informatica Vrije Universiteit
Joris Pries*
Affiliation:
Centrum Wiskunde & Informatica
*
*Postal address: Department of Stochastics, P.O. Box 94079, 1090 GB Amsterdam, Netherlands
***Postal address: Department of Mathematics, De Boelelaan 1111, 1081 HV Amsterdam, Netherlands. Email: [email protected]
****Postal address: Department of Stochastics, Science Park 123, 1098 XG Amsterdam, Netherlands. Email: [email protected]
*Postal address: Department of Stochastics, P.O. Box 94079, 1090 GB Amsterdam, Netherlands
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Abstract

Measuring and quantifying dependencies between random variables (RVs) can give critical insights into a dataset. Typical questions are: ‘Do underlying relationships exist?’, ‘Are some variables redundant?’, and ‘Is some target variable Y highly or weakly dependent on variable X?’ Interestingly, despite the evident need for a general-purpose measure of dependency between RVs, common practice is that most data analysts use the Pearson correlation coefficient to quantify dependence between RVs, while it is recognized that the correlation coefficient is essentially a measure for linear dependency only. Although many attempts have been made to define more generic dependency measures, there is no consensus yet on a standard, general-purpose dependency function. In fact, several ideal properties of a dependency function have been proposed, but without much argumentation. Motivated by this, we discuss and revise the list of desired properties and propose a new dependency function that meets all these requirements. This general-purpose dependency function provides data analysts with a powerful means to quantify the level of dependence between variables. To this end, we also provide Python code to determine the dependency function for use in practice.

Type
Original Article
Copyright
© The Author(s), 2023. Published by Cambridge University Press on behalf of Applied Probability Trust

1. Introduction

As early as 1958, Kruskal [Reference Kruskal14] stated that ‘There are infinitely many possible measures of association, and it sometimes seems that almost as many have been proposed at one time or another’. Many years later, even more dependency measures have been suggested. Yet, and rather surprisingly, there still does not exist consensus on a general dependency function. Often the statement ‘Y is dependent on X’ means that Y is not independent of X. However, there are different levels of dependency. For example, random variable (RV) Y can be fully determined by RV X (i.e. $Y(\omega)=f(X(\omega))$ for all $\omega \in \Omega$ and for a measurable function f), or only partially.

But how should we quantify how much Y is dependent on X? Intuitively, and assuming that the dependency measure is normalized to the interval [0, 1], we would say that if Y is fully determined by X then the dependency of Y with respect to X is as strong as possible, and so the dependency measure should be 1. On the other side of the spectrum, if X and Y are independent, then the dependency measure should be 0; and, vice versa, it is desirable that dependence 0 implies that X and Y are stochastically independent. Note that the commonly used Pearson correlation coefficient does not meet these requirements. In fact, many examples exist where Y is fully determined by X while the correlation is zero.

Taking a step back, why is it actually useful to examine dependencies in a dataset? Measuring dependencies between the variables can lead to critical insights, which will lead to improved data analysis. First of all, it can reveal important explanatory relationships. How do certain variables interact? If catching a specific disease is highly dependent on the feature value of variable X, research should be done to investigate if this information can be exploited to reduce the number of patients with this disease. For example, if hospitalization time is dependent on a healthy lifestyle, measures can be taken to try to improve the overall fitness of a population. Dependencies can therefore function as an actionable steering rod. It is, however, important to keep in mind that dependency does not always mean causality. Dependency relations can also occur due to mere coincidence or as a by-product of another process.

Dependencies can also be used for dimensionality reduction. If Y is highly dependent on X, not much information is lost when only X is used in the dataset. In this way, redundant variables or variables that provide little additional information can be removed to reduce the dimensionality of the dataset. With fewer dimensions, models can be trained more efficiently.

In these situations a dependency function can be very useful. However, finding the proper dependency function can be hard, as many attempts have already been made. In fact, most of us have a ‘gut feeling’ for what a dependency function should entail. To make this feeling more mathematically sound, Rényi [Reference Rényi18] proposed a list of ideal properties for a dependency function. A long list of follow-up papers (see the references in Table 1) use this list as the basis for a wish list, making only minor changes to it, adding or removing some properties.

Table 1. A summary of desirable properties for a dependency function as stated in previous literature.

In view of the above, the contribution of this paper is threefold:

  • We determine a new list of ideal properties for a dependency function.

  • We present a new dependency function and show that it fulfills all requirements.

  • We provide Python code to determine the dependency function for the discrete and continuous case (https://github.com/joris-pries/BP-Dependency).

The remainder of this paper is organized as follows. In Section 2, we summarize which ideal properties have been stated in previous literature. By critically assessing these properties, we derive a new list of ideal properties for a dependency function (see Table 2) that lays the foundation for a new search for a general-purpose dependency function. In Section 3, the properties are checked for existing methods, and we conclude that there does not yet exist a dependency function that has all the desired properties. Faced by this, in Section 4 we define a new dependency function and show in Section 5 that this function meets all the desired properties. Finally, Section 6 outlines the general findings and addresses possible future research opportunities.

Table 2. New list of desirable properties for a dependency function.

2. Desired properties of a dependency function

What properties should an ideal dependency function have? In this section we summarize previously suggested properties. Often, these characteristics are posed without much argumentation. Therefore, we analyze and discuss which properties are actually ideal and which properties are believed to be not relevant, or even wrong.

In Table 1, a summary is given of 22 ‘ideal properties’ found in previous literature, grouped into five different categories. These properties are denoted by I.122. From these properties we derive a new set of desirable properties denoted by II.18; see Table 2. Next, we discuss the properties suggested in previous literature and how the new list is derived from them.

Desired property II.1. (Asymmetry.) At first glance, it seems obvious that a dependency function should adhere to property I.13 and be symmetric. However, this is a common misconception for the dependency function. Y can be fully dependent on X, but this does not mean that X is fully dependent on Y. Lancaster [Reference Lancaster15] indirectly touched upon this same point by defining mutual complete dependence. First it is stated that Y is completely dependent on X if $Y=f(X)$ . X and Y are called mutually completely dependent if X is completely dependent on Y and vice versa. Thus, this indirectly shows that dependence should not necessarily be symmetric, otherwise the extra definition would be redundant. In [Reference Lancaster15] the following great asymmetric example was given.

Example 2.1. Let $X\sim \mathcal{U}(0,1)$ be uniformly distributed and let $Y = -1$ if $X\leq \frac{1}{2}$ and $Y= 1$ if $X > \frac{1}{2}$ . Here, Y is fully dependent on X, but not vice versa.

To drive the point home even more, we give another asymmetric example.

Example 2.2. X is uniformly randomly drawn from $\{1,2,3,4\}$ , and ${Y \,:\!=\, X \,(\mathrm{mod}\,2)}$ . Y is fully dependent on X, because given X the value of Y is deterministically known. On the other hand, X is not completely known given Y. Note that ${Y=1}$ still leaves the possibility for ${X=1}$ or ${X=3}$ . Thus, when assessing the dependency between variable X and variable Y, Y is fully dependent on X, whereas X is not fully dependent on Y. In other words, ${\text{Dep} (X, Y) \neq \text{Dep} (Y, X)}$ .

In conclusion, an ideal dependency function should not always be symmetric. To emphasize this point even further, we change the notation of the dependency function. Instead of $\text{Dep} (X, Y)$ , we will write $\text{Dep} (Y \mid X)$ for how much Y is dependent on X. Based on this, property I.13 is changed into II.1.

Desired property II.2. (Range.) An ideal dependency function should be scaled to the interval [0, 1]. Otherwise, it can be very hard to draw meaningful conclusions from a dependency score without a known maximum or minimum. What would a score of 4.23 mean without any information about the possible range? Therefore, property I.1 is retained. A special note on the range for the well-known Pearson correlation coefficient [Reference Press, Teukolsky, Vetterling and Flannery17], which is $[{-}1,1]$ : The negative or positive sign denotes the direction of the linear correlation. When examining more complex relationships, it is unclear what ‘direction’ entails. We believe that a dependency function should measure by how much variable Y is dependent on X, and not necessarily in which way. In summary, we require $0\leq\text{Dep} (Y \mid X)\leq 1$ .

Desired property II.3. (Independence and dependency 0.) If Y is independent of X, it should hold that the dependency achieves the lowest possible value, namely zero. Otherwise, it is vague what a dependency score lower than the dependency between two independent variables means. A major issue of the commonly used Pearson correlation coefficient is that zero correlation does not imply independence. This makes it complicated to derive conclusions from a correlation score. Furthermore, note that if Y is independent of X, it should automatically hold that X is also independent of Y. In this case, X and Y are independent, because otherwise some dependency relation should exist. Thus, we require $\text{Dep} (Y \mid X)=0\iff X\text{ and }Y\text{ are independent}$ .

Desired property II.4. (Functional dependence and dependency 1.) If Y is strictly dependent on X (and thus fully determined by X), the highest possible value should be attained. It is otherwise unclear what a higher dependency would mean. However, it is too restrictive to demand that the dependency is only 1 if Y is strictly dependent on X. Rényi [Reference Rényi18] stated ‘It seems at the first sight natural to postulate that $\delta(\xi, \eta) = 1$ only if there is a strict dependence of the mentioned type between $\xi$ and $\eta$ , but this condition is rather restrictive, and it is better to leave it out’. Take, for example, $Y\sim \mathcal{U}(-1,1)$ and $X\,:\!=\, Y^2$ . Knowing X reduces the infinite set of possible values for Y to only two ( $\pm\sqrt{X}$ ), whereas it would reduce to one if Y was fully determined by X. It would be very restrictive to enforce $\text{Dep} (Y \mid X) < 1$ , as there is only an infinitesimal difference compared to the strictly dependent case. Summarizing, we require $Y=f(X)\rightarrow \text{Dep} (Y \mid X)=1$ .

Desired property II.5. (Unambiguity.) Kruskal [Reference Kruskal14] stated ‘It is important to recognize that the question “Which single measure of association should I use?” is often unimportant. There may be no reason why two or more measures should not be used; the point I stress is that, whichever ones are used, they should have clear-cut population interpretations.’ It is very important that a dependency score leaves no room for ambiguity. The results should meet our natural expectations. Therefore, we introduce a new requirement based on a simple example. Suppose we have a number of independent RVs and observe one of these at random. The dependency of each random variable on the observed variable should be equal to the probability it is picked. More formally, let ${Y_1,Y_2,\dots,Y_N, \text{and}\ S}$ be independent variables, with S a selection variable such that ${\mathbb{P}(S=i)=p_i}$ and ${\sum_{i=1}^N p_i=1}$ . When X is defined as ${X = \sum_{i = 1}^{N} \textbf{1}_{S = i} \cdot Y_i}$ , it should hold that ${\text{Dep} (Y_i \mid X) = p_i}$ for all ${i\in \{1,\dots, N\}}$ . Stated simply, the dependency function should give the desired results in specific situations where we can argue what the outcome should be. This is one of these cases.

Desired property II.6. (Generally applicable.) Our aim is to find a general dependency function, which we denote by $Dep(X\mid Y)$ . This function must be able to handle all kinds of variables: continuous, discrete, and categorical (even nominal). These types of variables occur frequently in a dataset. A general dependency function should be able to measure the dependency of a categorical variable Y on a continuous variable X. Stricter than I.912, we want a single dependency function that is applicable to any combination of these variables.

There is one exception to this generality. In the case that Y is almost surely constant, it is completely independent as well as completely determined by X. Arguing what the value of a dependency function should be in this case is similar to arguing about the value of $\frac{0}{0}$ . Therefore, we argue that in this case it should be either undefined or return some value that represents the fact that Y is almost surely constant (for example $-1$ , since this cannot be normally attained).

Desired property II.7. (Invariance under isomorphisms.) Properties I.1420 discuss when the dependency function should be invariant. Most are only meant for variables with an ordering, as ‘strictly increasing’, ‘translation’, and ‘scaling’ are otherwise ill-defined. As the dependency function should be able to handle nominal variables, we assume that the dependency is invariant under isomorphisms, see II.7. Note that this is a stronger assumption than I.1420. Compare Example 2.2 with Example 2.3. It should hold that $\text{Dep} (Y \mid X) = \text{Dep} (Y^{\prime} \mid X^{\prime})$ and $\text{Dep} (X \mid Y) = \text{Dep} (X^{\prime} \mid Y^{\prime})$ , as the relationship between the variables is the same (only altered using isomorphisms). So, for any isomorphisms f and g we require $\text{Dep} (g(Y) \mid f(X))=$ $\text{Dep} (Y \mid X)$ .

Example 2.3. Let X ′ be uniformly randomly drawn from $\{\circ, \triangle, \square, \lozenge \}$ , and $Y^{\prime} = \clubsuit$ if $X^{\prime} \in \{\circ, \square\}$ and $Y^{\prime} = \spadesuit$ if $X^{\prime} \in \{\triangle, \lozenge\}$ .

Desired property II.8. (Non-increasing under functions of X.) Additionally, $\text{Dep} (Y \mid X)$ should not increase if a measurable function f is applied to X since any dependence on f(X) corresponds to a dependence on X (but not necessarily the other way around). The information gained from knowing X can only be reduced, never increased by applying a function.

However, though it might be natural to expect the same for functions applied to Y, consider once again Example 2.2 (but with X and Y switched around) and the following two functions: $f_1(Y)\,:\!=\,Y \,(\mathrm{mod}\,2)$ and $f_2(Y)\,:\!=\, \lceil({Y}/{2}) \rceil$ . Then $f_1(Y)$ is completely predicted by X and should therefore have a dependency of 1, while $f_2(Y)$ is independent of X and should therefore have a dependency of 0. So the dependency should be free to increase or decrease for functions applied to Y. To conclude, for any measurable function f we require $\text{Dep} (Y \mid f(X))\leq$ $\text{Dep} (Y \mid X)$ .

2.1. Exclusion of Pearson correlation coefficient as a special case

According to properties I.21 and I.-22, when X and Y are normally distributed the dependency function should coincide with or be a function of the Pearson correlation coefficient. However, these properties lack good reasoning for why this would be ideal. It is not obvious why this would be a necessary condition. Moreover, there are many known problems and pitfalls with the correlation coefficient [Reference Embrechts, McNeil and Straumann4, Reference Janse, Hoekstra, Jager, Zoccali, Tripepi, Dekker and van Diepen11], so it seems undesirable to force an ideal dependency function to reduce to a function of the correlation coefficient when the variables are normally distributed. This is why we exclude these properties.

3. Assessment of the desired properties for existing dependency measures

In this section we assess whether existing dependency functions have the properties listed above. In doing so, we limit ourselves to the most commonly used dependency measures. Table 3 shows which properties each investigated measure adheres to.

Table 3. Properties of previous dependencies functions (= property not satisfied, ${\checkmark}$ = property satisfied)

Although the desired properties listed in Table 2 seem not too restrictive, many dependency measures fail to have many of these properties. One of the most commonly used dependency measures, the Pearson correlation coefficient, does not even satisfy one of the desirable properties. Furthermore, almost all measures are not asymmetric. The one measure that comes closest to fulfilling all the requirements is the uncertainty coefficient [Reference Press, Teukolsky, Vetterling and Flannery17]. This is a normalized asymmetric variant of the mutual information measure [Reference Press, Teukolsky, Vetterling and Flannery17], where the discrete variant is defined as

\begin{align*}C_{XY}&= \frac{I(X,Y)}{H(Y)} = \frac{\sum_{x,y}p_{X,Y}(x,y) \log \left (\frac{p_{X,Y}(x,y)}{p_X(x) \cdot p_Y(y)} \right )}{- \sum_{y}p_Y(y) \log (p_Y(y))},\end{align*}

where H(Y) is the entropy of Y and I(X, Y) is the mutual information of X and Y. Note that throughout the paper we use the following notation: ${p_{X}(x)=\mathbb{P}(X=x)}$ , ${p_{Y}(y)=\mathbb{P}(Y=y)}$ , and ${p_{X,Y}(x,y)=\mathbb{P}(X=x,Y=y)}$ . In addition, for a set H we define ${p_{X}(H)=\mathbb{P}(X\in H)}$ (and similarly for $p_Y$ and $p_{X,Y}$ ).

However, the uncertainty coefficient does not satisfy properties II.5 and II.6. For example, if $Y\sim \mathcal{U}(0,1)$ is uniformly drawn, the entropy of Y becomes

\begin{align*} H(Y) = - \int_{0}^{1} f_Y(y)\ln(f_Y(y))\,\mathrm{d} y = - \int_{0}^{1} 1 \cdot \ln(1)\,\mathrm{d} y = 0.\end{align*}

Thus, for any X, the uncertainty coefficient is now undefined (division by zero). Therefore, the uncertainty coefficient is not as generally applicable as property II.6 requires.

Two other measures that satisfy many (but not all) properties are mutual dependence [Reference Agarwal, Sacre and Sarma1] and maximal correlation [Reference Gebelein5]. Mutual dependence is defined as the Hellinger distance [Reference Hellinger9] $d_h$ between the joint distribution and the product of the marginal distributions, defined as (cf. [Reference Agarwal, Sacre and Sarma1])

(3.1) \begin{align} d(X,Y) \triangleq d_h(f_{XY}(x,y), f_X(x)\cdot f_Y(y)). \end{align}

Maximal correlation is defined as (cf. [Reference Rényi18])

(3.2) \begin{align} S(X, Y)= \sup_{f,g} R(f(X), g(Y)), \end{align}

where R is the Pearson correlation coefficient, and where f, g are Borel-measurable functions such that R(f(X), g(Y)) is defined [Reference Rényi18].

Clearly, (3.1) and (3.2) are symmetric. The joint distribution and the product of the marginal distributions does not change by switching X and Y. Furthermore, the Pearson correlation coefficient is symmetric, making the maximal correlation also symmetric. Therefore, neither measure has property II.1.

There are two more measures (one of which is a variation of the other) which satisfy many (but not all) properties, and additionally closely resemble the measure we intend to propose. Namely, the strong mixing coefficient [Reference Bradley2],

\begin{align*} \alpha(X,Y)=\sup_{A\in\mathcal{E}_X,B\in\mathcal{E}_Y} \{ |\mu_{X,Y}(A\times B)-\mu_X(A)\mu_Y(B)| \},\end{align*}

and its relaxation, the $\beta$ -mixing coefficient [Reference Bradley2],

\begin{align*} \beta(X,Y)=\sup \Bigg \{\frac12\sum_{i=1}^I\sum_{j=1}^J|(\mu_{X,Y}(A_i\times B_j)-\mu_X(A_i)\mu_Y(B_j))| \Bigg \},\end{align*}

where the supremum is taken over all finite partitions $(A_1,A_2,\dots,A_I)$ and $(B_1,B_2,\dots,B_J)$ of $E_X$ and $E_Y$ with $A_i\in\mathcal{E}_X$ and $B_j\in\mathcal{E}_Y$ . However, these measures fail the properties II.1, II.4, and II.5.

4. The Berkelmans–Pries dependency function

After devising a new list of ideal properties (see Table 2) and showing that these properties are not fulfilled by existing dependency functions (see Table 3), we will now introduce a new dependency function that will meet all requirements. Throughout, we refer to this function as the Berkelmans–Pries (BP) dependency function.

The key question surely is: What is dependency? Although this question deserves an elaborate philosophical study, we believe that measuring the dependency of Y on X is essentially measuring how much the distribution of Y changes on average based on the knowledge of X, divided by the maximum possible change. This is the key insight on which the BP dependency function is based. To measure this, we first have to determine the difference between the distribution of Y with and without conditioning on the value of X times the probability that X takes on this value (Section 4.1). Secondly, we have to measure what the maximum possible change in probability mass is, which is used to properly scale the dependency function and make it asymmetric (see Section 4.2).

4.1. Definition of the expected absolute change in distribution

We start by measuring the expected absolute change in distribution (UD), which is the difference between the distribution of Y with and without conditioning on the value of X times the probability that X takes on this value. For discrete RVs, we obtain the following definition.

Definition 4.1. (Discrete UD.) For any discrete RVs X and Y,

\begin{equation*} \text{UD} (X, Y)\,{:\!=}\,\sum_{x} p_X(x) \cdot \sum_{y} \vert p_{Y\vert X=x}(y) - p_Y(y)\vert . \end{equation*}

More explicit formulations of UD for specific combinations of RVs are given in Appendix B. For example, when X and Y remain discrete and take values in $E_X$ and $E_Y$ , respectively, it can equivalently be defined as

\begin{equation*} \text{UD} (X, Y)\,{:\!=}\,2\sup_{A\subset E_X \times E_Y} \Bigg \{\sum_{(x,y)\in A}(p_{X,Y}(x,y)-p_X(x) \cdot p_Y(y)) \Bigg \}.\end{equation*}

Similarly, for continuous RVs, we obtain the following definition for UD.

Definition 4.2. (Continuous UD.) For any continuous RVs X and Y,

\begin{equation*} \text{UD} (X, Y)\,{:\!=}\,\int_{\mathbb{R}}\int_{\mathbb{R}}\vert f_{X,Y}(x,y)-f_X(x)f_Y(y)\vert \,\mathrm{d} y \,\mathrm{d} x. \end{equation*}

Note that this is the same as $\Delta_{L_1}$ [Reference Capitani, Bagnato and Punzo3].

In the general case, UD is defined in the following manner.

Definition 4.3. (General UD.) For any ${X\,:\, (\Omega,\mathcal{F},\mu)\rightarrow (E_X,\mathcal{E}(X))}$ and $Y\,:\, (\Omega,\mathcal{F},\mu)\rightarrow (E_Y,\mathcal{E}(Y))$ , UD is defined as

\begin{equation*} \text{UD} (X, Y) \,{:\!=}\,2\sup_{A\in\mathcal{E}(X)\bigotimes\mathcal{E}(Y)} \{ \mu_{(X,Y)}(A)-(\mu_X {\times}\mu_Y)(A) \},\end{equation*}

where ${\mathcal{E}(X)\bigotimes\mathcal{E}(Y)}$ is the $\sigma$ -algebra generated by the sets ${C\times D}$ with ${C\in\mathcal{E}(X)}$ and ${D\in\mathcal{E}(Y)}$ . Furthermore, $\mu_{(X,Y)}$ denotes the joint probability measure on ${\mathcal{E}(X)\bigotimes\mathcal{E}(Y)}$ , and ${\mu_X \times \mu_Y}$ is the product measure.

4.2. Maximum UD given Y

Next, we have to determine the maximum of UD for a fixed Y in order to scale the dependency function to [0, 1]. To this end, we prove that, for a given Y, X fully determines $Y \Rightarrow \text{UD} (X, Y) {\geq} \text{UD} (X^{\prime}, Y)$ for any RV X ′.

The full proof for the general case is given in Appendix C.4, which uses the upper bound determined in Appendix C.3. However, we show the discrete case here to give some intuition about the proof. Let ${C_y= \{x\mid p_{X,Y}(x,y)\geq p_X(x)\cdot p_Y(y) \}}$ ; then

\begin{align*} \text{UD} (X, Y) & = 2\sum_y (p_{X,Y}(C_y\times\{y\})-p_X(C_y) \cdot p_Y(y) )\\ & \leq 2\sum_y ({\min}\{p_X(C_y), p_Y(y)\}-p_X(C_y)\cdot p_Y(y) ) \\ & = 2\sum_y ({\min} \{p_X(C_y) \cdot (1-p_Y(y)), (1-p_X(C_y)) \cdot p_Y(y) \} )\\ & \leq 2\sum_y (p_Y(y) \cdot (1-p_Y(y)))\\ & =2\sum_y (p_Y(y)-p_Y(y)^2) = 2 \Bigg(1-\sum_y p_Y(y)^2 \Bigg), \end{align*}

with equality if and only if both inequalities are equalities. Which occurs if and only if $p_{X,Y} (C_y\times\{y\} )=p_X(C_y)=p_Y(y)$ for all y. So we have equality when, for all y, the set $C_y$ has the property that $x\in C_y$ if and only if $Y=y$ . Or equivalently, $Y=f(X)$ for some function f. Thus,

\begin{equation*} UD(X,Y)\leq 2\Bigg(1-\sum_y p_Y(y)^2 \Bigg),\end{equation*}

with equality if and only if $Y=f(X)$ for some function f.

Note that this holds for every X that fully determines Y. In particular, for ${X\,:\!=\,Y}$ it now follows that $\text{UD} (Y, Y) = 2\cdot \big(1-\sum_y p_Y(y)^2\big)\geq \text{UD} (X^{\prime}, Y)$ for any RV X ′.

4.3. Definition of the Berkelmans–Pries dependency function

Finally, we can define the BP dependency function to measure how much Y is dependent on X.

Definition 4.4. (BP dependency function.) For any RVs X and Y, the Berkelmans–Pries dependency function is defined as

\begin{align*} \text{Dep} (Y \mid X)\,:\!=\, \left \{ \begin{array}{c@{\quad}l} \frac{\text{UD} (X, Y)}{\text{UD} (Y, Y)} & \text{if} \, {Y} \, \text{is not a.s. constant,} \\[4pt] \text{undefined} & \text{if} \, {Y} \, \text{is trivial (has an atom of size 1).} \\ \end{array}\right . \end{align*}

This is the difference between the distribution of Y with and without conditioning on the value of X times the probability that X takes on this value, divided by the largest possible difference for an arbitrary X ′. Note that $\text{UD} (Y, Y)=0$ if and only if Y is almost surely constant (see Appendix C.4), which leads to division by zero. However, we previously argued in Section 2 that if Y is almost surely constant, it is completely independent as well as completely determined by X. It should therefore be undefined.

5. Properties of the Berkelmans–Pries dependency function

Next, we show that our new BP dependency function satisfies all the requirements from Table 2. To this end, we use properties of UD (see Appendix C) to derive properties II.18.

5.1. Property II.1 (Asymmetry)

In Example 2.1 we have ${\text{UD} (X, Y) = 1}$ , ${\text{UD} (X, X) = 2}$ , and ${\text{UD} (Y, Y) = 1}$ . Thus,

\begin{align*} \text{Dep} (Y \mid X) &= \frac{\text{UD} (X, Y)}{\text{UD} (Y, Y)} = 1, \\ \text{Dep} (X \mid Y) &= \frac{\text{UD} (X, Y)}{\text{UD} (X, X)} = \frac{1}{2}.\end{align*}

Therefore, we see that ${\text{Dep} (Y \mid X) \neq \text{Dep} (X \mid Y)}$ for this example, thus making the BP dependency asymmetric.

5.2. Property II.2 (Range)

In Appendix C.2, we show that, for every X, Y, ${\text{UD} (X, Y) \geq 0}$ . Furthermore, in Appendix C.3 we prove that $\text{UD} (X, Y)\leq 2\big (1-\sum_{y\in d_Y} \mu_Y(\{y\})^2\big )$ for all RVs X. In Appendix C.4 we show for almost all cases that this bound is tight for $\text{UD} (Y, Y)$ . Thus, it must hold that $0\leq \text{UD} (X, Y)\leq \text{UD} (Y, Y)$ , and it then immediately follows that ${0\leq \text{Dep} (Y \mid X)\leq 1}$ .

5.3. Property II.3 (Independence and dependency 0)

In Appendix C.2 we prove that $\text{UD} (X, Y) = 0 \Leftrightarrow X$ and Y are independent. Furthermore, note that ${\text{Dep} (Y \mid X)=0}$ if and only if ${\text{UD} (X, Y) = 0}$ . Thus, $\text{Dep} (Y \mid X) = 0 \Leftrightarrow X$ and Y are independent.

5.4. Property II.4 (Functional dependence and dependency 1)

In Section C.4, we show that if X fully determines Y, and X ′ is any RV, we have $\text{UD} (X, Y)\geq\text{UD} (X^{\prime}, Y)$ . This holds in particular for $X\,:\!=\,Y$ . Thus, if X fully determines Y it follows that $\text{UD} (X, Y)=\text{UD} (Y, Y)$ , so $\text{Dep} (Y \mid X) = {\text{UD} (X, Y)}/{\text{UD} (Y, Y)} = 1$ . In conclusion, if there exists a measurable function f such that $Y=f(X)$ , then $\text{Dep} (Y \mid X)=1$ .

5.5. Property II.5 (Unambiguity)

We show the result for discrete RVs here; for the proof of the general case see Appendix C.5. Let E be the range of the independent ${Y_1,Y_2,\dots,Y_N}$ . By definition, $\mathbb{P}(X=x)=$ $\sum_j\mathbb{P}(Y_j=x) \cdot \mathbb{P}(S=j)$ , so, for all ${i\in \{1, \dots N\}}$ ,

\begin{align*} \text{UD} (X, Y_i) & = 2\sup_{A\subset E\times E}\Bigg \{\sum_{(x,y)\in A} (\mathbb{P}(X = x,Y_i = y)-\mathbb{P}(X = x)\mathbb{P}(Y_i = y)) \Bigg \}\\& =2\sup_{A\subset E\times E} \Bigg \{ \sum_{(x,y)\in A}\Bigg ( \sum_j\mathbb{P}(Y_j = x,Y_i = y,S = j)-\mathbb{P}(X = x)\mathbb{P}(Y_i = y)\Bigg )\Bigg \}\\& =2\sup_{A\subset E\times E} \Bigg \{ \sum_{(x,y)\in A}\Bigg ( \sum_{j\neq i}\mathbb{P}(Y_j = x)\mathbb{P}(Y_i = y)\mathbb{P}(S = j)\\& \quad +\mathbb{P}(Y_i = x,Y_i = y)\mathbb{P}(S = i)-\sum_j\mathbb{P}(Y_j = x)\mathbb{P}(S = j)\mathbb{P}(Y_i = y) \Bigg ) \Bigg\}\\& =2\sup_{A\subset E\times E} \Bigg\{ \sum_{(x,y)\in A}\left ( p_i\mathbb{P}(Y_i = x,Y_i = y)-p_i\mathbb{P}(Y_i = x)\mathbb{P}(Y_i = y)\right ) \Bigg\}\\& =p_i\cdot\text{UD} (Y_i, Y_i).\end{align*}

This leads to

\begin{align*} \text{Dep} (Y_i \mid X)&=\frac{\text{UD} (X, Y_i)}{\text{UD} (Y_i, Y_i)} = \frac{p_i\cdot\text{UD} (Y_i, Y_i)}{\text{UD} (Y_i, Y_i)}=p_i.\end{align*}

Therefore, we can conclude that property II.5 holds.

5.6. Property II.6 (Generally applicable)

The BP dependency measure can be applied for any combination of continuous, discrete, and categorical variables. It can handle arbitrarily many RVs as input by combining them. Thus, the BP dependency function is generally applicable.

5.7. Property II.7 (Invariance under isomorphisms)

In Appendix C.6 we prove that applying a measurable function to X or Y does not increase UD. Thus, it must hold for all isomorphisms f, g that

\begin{equation*}\text{UD} (X, Y)=\text{UD} (f^{-1}(f(X)), g^{-1}(g(Y))) \leq \text{UD} (f(X), g(Y)) \leq \text{UD} (X, Y).\end{equation*}

Therefore, all inequalities are actually equalities. In other words, $\text{UD} (f(X), g(Y))=\text{UD} (X, Y)$ .

It now immediately follows for the BP dependency measure that

\begin{equation*}\text{Dep} (g(Y) \mid f(X))=\frac{\text{UD} (f(X), g(Y))}{\text{UD} (g(Y), g(Y))}=\frac{\text{UD} (X, Y)}{\text{UD} (Y, Y)}=\text{Dep} (Y \mid X),\end{equation*}

and thus property II.7 is satisfied.

5.8. Property II.8 (Non-increasing under functions of X)

In Appendix C.6 we prove that transforming X or Y using a measurable function does not increase UD. In other words, for any measurable function f, $\text{UD} (f(X), Y) \leq \text{UD} (X, Y)$ . Consequently, property II.8 holds for the BP dependency function, as

\begin{equation*} \text{Dep} (Y \mid f(X))=\frac{\text{UD} (f(X), Y)}{\text{UD} (Y, Y)}\leq\frac{\text{UD} (X, Y)}{\text{UD} (Y, Y)}=\text{Dep} (Y \mid X).\end{equation*}

6. Discussion and further research

Motivated by the need to measure and quantify the level dependence between random variables, we have proposed a general-purpose dependency function. The function meets an extensive list of important and desired properties, and can be viewed as a powerful alternative to the classical Pearson correlation coefficient, which is often used by data analysts today.

While it is recommended to use our new dependency function, it is important to understand the limitations and potential pitfalls of the new dependency function; we now discuss these aspects.

The underlying probability density function of an RV is often unknown in practice; instead, a set of outcomes is observed. These samples can then be used (in a simple manner) to approximate any discrete distribution. However, this is generally not the case for continuous variables. There are two main categories for dealing with continuous variables: either (i) the observed samples are combined using kernel functions into a continuous function (kernel density estimation [Reference Gramacki6]), or (2) the continuous variable is reduced to a discrete variable using data binning. The new dependency measure can be applied thereafter.

A main issue is that the dependency measure is dependent on the parameter choices of either kernel density estimation or data binning. To illustrate this, we conduct the following experiment. Let ${X\sim\mathcal{U}(0,1)}$ , and define ${Y = X + \epsilon}$ with ${\epsilon\sim\mathcal{N}(0,0.1)}$ . Next, we draw 5000 samples of X and $\epsilon$ and determine each corresponding Y. For kernel density estimation we use Gaussian kernels with constant bandwidth. The result of varying the bandwidth on the dependency score can be seen in Figure 1(a). With data binning, both X and Y are binned using bins with fixed size. Increasing or decreasing the number of bins changes the size of the bins. The impact of changing the number of bins on the dependency score can be seen in Figure 1(b).

Figure 1. Influence of the chosen (a) bandwidth and (b) number of bins on the dependency score $\text{Dep} (Y \mid X)$ with 5000 samples of ${X\sim \mathcal{U}(0,1)}$ and ${Y = X + \epsilon}$ with ${\epsilon \sim \mathcal{N}(0,0.1)}$ .

The main observation from Figures 1(a) and 1(b) is that the selection of the parameters is important. In the case of kernel density estimation, we see the traditional trade-off between over-fitting when the bandwidth is too small and under-fitting when the bandwidth is too large. On the other hand, with data binning, we see different behavior: having too few bins seems to overestimate the dependency score, and as the number of bins increases the estimator of the dependency score decreases up to a certain point, after which it starts increasing again. The bottom of the curve seems to be marginally higher than the true dependency score of 0.621.

This observation raises a range of interesting questions for future research. For example, are the dependency scores estimated by binning consistently higher than the true dependency? Is there a correction that can be applied to get an unbiased estimator? Is the minimum of this curve an asymptotically consistent estimator? Which binning algorithms give the closest approximation to the true dependency?

An interesting observation with respect to kernel density estimation is that it appears that at a bandwidth of 0.1 the estimator of the dependency score is close to the true dependency score of approximately 0.621. However, this parameter choice could only be made if the underlying probability process was known a priori.

Yet, there is another challenge with kernel density estimation, when X consists of many variables or feature values. Each time Y is conditioned on a different value of X, either the density needs to be estimated again or the estimation of the joint distribution needs to be integrated. Both can rapidly become very time-consuming. When using data binning, it suffices to bin the data once. Furthermore, no integration is required, making it much faster. Therefore, our current recommendation would be to bin the data and not use kernel density estimation.

Another exciting research avenue would be to fundamentally explore the set of functions that satisfy all desired dependency properties. Is the BP dependency the only measure that fulfills all conditions? If two solutions exist, can we derive a new solution by smartly combining them? Without property II.5, any order-preserving bijection of [0, 1] with itself would preserve all properties when applied to a solution. However, property II.5 does restrict the solution space. It remains an open problem whether this is restrictive enough to result in a unique solution: the BP dependency.

Appendix A. Notation

The following general notation is used throughout the appendices. Let $X\,:\,(\Omega,\mathcal{F},\mathbb{P})\to (E_X,\mathcal{E}_X)$ and ${Y\,:\,(\Omega,\mathcal{F},\mathbb{P})\to (E_Y,\mathcal{E}_Y)}$ be RVs. Secondly, let ${\mu_{X}(A)=\mathbb{P}(X^{-1}(A))}$ , ${\mu_{Y}(A)=\mathbb{P}(Y^{-1}(A))}$ be measures induced by X and Y on $(E_X,\mathcal{E}_X)$ and $(E_Y,\mathcal{E}_Y)$ , respectively. Furthermore, ${\mu_{X,Y}(A)=\mathbb{P}(\{\omega\in\Omega\mid (X(\omega),Y(\omega))\in A\})}$ is the joint measure and ${\mu_X \times \mu_Y}$ is the product measure on ${(E_X\times E_Y,\mathcal{E}_X\bigotimes\mathcal{E}_Y)}$ generated by $(\mu_X\times\mu_Y)(A\times B)=\mu_X(A)\mu_Y(B)$ .

Appendix B. Formulations of UD

In this appendix we give multiple formulations of UD. Depending on the type of RVs, the following formulations can be used.

B.1. General case

For any X, Y, UD is defined as

(B.1) \begin{align} \text{UD} (X, Y) & \,:\!=\, \sup_{A\in\mathcal{E}(X)\bigotimes\mathcal{E}(Y)} \{ \mu_{(X,Y)}(A)-(\mu_X \times\mu_Y)(A) \} \nonumber \\ & \quad + \sup_{B\in\mathcal{E}(X)\bigotimes\mathcal{E}(Y)} \{ (\mu_X \times\mu_Y)(B)-\mu_{(X,Y)}(B) \} \nonumber \\ & = 2\sup_{A\in\mathcal{E}(X)\bigotimes\mathcal{E}(Y)} \{ \mu_{(X,Y)}(A)-(\mu_X \times\mu_Y)(A) \}. \end{align}

B.2. Discrete RVs only

When X, Y are discrete RVs, (B.1) simplifies into

\begin{equation*} \text{UD} (X, Y) \,:\!=\, \sum_{x,y} \vert p_{X,Y}(x,y)-p_X(x)\cdot p_Y(y) \vert,\end{equation*}

or, equivalently,

\begin{equation*} \text{UD} (X, Y)\,{:\!=}\,\sum_{x} p_X(x) \cdot \sum_{y} \vert p_{Y\vert X=x}(y) - p_Y(y)\vert .\end{equation*}

Similarly, when X and Y take values in $E_X$ and $E_Y$ , respectively, (B.1) becomes

\begin{align*} \text{UD} (X, Y) & \,:\!=\, \sup_{A\subset E_X \times E_Y} \Bigg \{\sum_{(x,y)\in A}(p_{X,Y}(x,y)-p_X(x)p_Y(y)) \Bigg \} \\ & \quad + \sup_{A\subset E_X \times E_Y} \Bigg \{\sum_{(x,y)\in A}(p_X(x)p_Y(y)-p_{X,Y}(x,y)) \Bigg\} \\ & = 2\sup_{A\subset E_X \times E_Y} \Bigg\{\sum_{(x,y)\in A}(p_{X,Y}(x,y)-p_X(x)p_Y(y))\Bigg \}.\end{align*}

B.3. Continuous RVs only

When X, Y are continuous RVs, (B.1) becomes

\begin{equation*} \text{UD} (X, Y)\,{:\!=}\,\int_{\mathbb{R}}\int_{\mathbb{R}}\vert f_{X,Y}(x,y)-f_X(x)f_Y(y)\vert \,\mathrm{d} y \,\mathrm{d} x,\end{equation*}

or, equivalently,

\begin{equation*} \text{UD} (X, Y) \,{:\!=}\,\int_{\mathbb{R}} f_X(x)\int_{\mathbb{R}}\vert f_{Y\vert X=x}(y)-f_Y(y)\vert \, \mathrm{d} y \, \mathrm{d} x.\end{equation*}

Another formulation (more measure theoretical) would be:

\begin{equation*} \text{UD} (X, Y)\,{:\!=}\,2\cdot\sup_{A\in \mathcal{B}(\mathbb{R}^2)} \bigg \{ \int_{A}(f_{X,Y}(x,y)-f_X(x)f_Y(y))\,\mathrm{d} y \,\mathrm{d} x \bigg \} .\end{equation*}

B.4. Mix of discrete and continuous

When X is discrete and Y is continuous, (B.1) reduces to

\begin{equation*}\text{UD} (X, Y) \,{:\!=}\, \sum_{x} p_X(x)\int_{y}\vert f_{Y\vert X = x}(y)-f_Y(y)\vert \,\mathrm{d} y.\end{equation*}

Vice versa, if X is continuous and Y is discrete, (B.1) becomes

Appendix C. UD Properties

In this appendix we prove properties of UD that are used in Section 5 to show that the BP dependency measure satisfies all the properties in Table 2.

C.1. Symmetry

For the proofs below it is useful to show that $\text{UD} (X, Y)$ is symmetric, i.e. $\text{UD} (X, Y) = \text{UD} (Y, X)$ for every X, Y. This directly follows from the definition, as

\begin{align*} \text{UD} (X, Y) & = 2 \sup_{A\in\mathcal{E}_X\bigotimes\mathcal{E}_Y} \{ \mu_{(X,Y)}(A)-(\mu_X\times\mu_Y)(A) \}\\& = 2 \sup_{A\in\mathcal{E}_Y\bigotimes\mathcal{E}_X} \{\mu_{(Y,X)}(A)-(\mu_Y\times\mu_X)(A) \}\\& =\text{UD} (Y, X).\end{align*}

C.2. Independence and UD $= 0$

Since we are considering a measure of dependence, it is useful to know what the conditions for independence are. Below we show that we have independence of X and Y if and only if $\text{UD} (X, Y)=0$ .

Note that

\begin{align*}\text{UD} (X, Y) & =\sup_{A\in\mathcal{E}_X\bigotimes\mathcal{E}_Y} \{\mu_{(X,Y)}(A)-(\mu_X \times\mu_Y)(A) \}\\& \quad +\sup_{B\in\mathcal{E}_X\bigotimes\mathcal{E}_Y} \{(\mu_X \times\mu_Y)(B)-\mu_{(X,Y)}(B) \}\\& \geq (\mu_{(X,Y)}(E_X\times E_Y)-(\mu_X \times\mu_Y)(E_X\times E_Y) )\\& \quad +((\mu_X \times\mu_Y)(E_X\times E_Y)-\mu_{(X,Y)}(E_X\times E_Y) )\\& =0,\end{align*}

with equality if and only if $\mu_{(X,Y)}=\mu_X\times\mu_Y$ on $\mathcal{E}_X\bigotimes\mathcal{E}_Y$ , so if and only if X and Y are independent. So, in conclusion, the following properties are equivalent:

  • X and Y are independent random variables.

  • $\text{UD} (X, Y)=0$ .

C.3. Upper bound for a given Y

To scale the dependency function it is useful to know what the range of $\text{UD} (X, Y)$ is for a given random variable Y. We already know it is bounded below by 0 (see Appendix C.2). However, we have not yet established an upper bound. What follows is a derivation of the upper bound.

A $\mu_Y$ -atom A is a set such that $\mu_Y(A)>0$ and, for any $B\subset A$ , $\mu_Y(B)\in\{0,\mu_Y(A)\}$ . Consider the equivalence relation $\sim$ on $\mu_Y$ -atoms characterized by $S\sim T$ if and only if $\mu_Y(S\triangle T)=0$ . Then let I be a set containing exactly one representative from each equivalence class. Note that I is countable, so we can enumerate the elements $A_1,A_2,A_3,\dots$ Additionally, for any $A,B\in I$ we have $\mu_Y(A\cap B)=0$ .

Next, we define $B_i\,:\!=\,A_i\setminus\bigcup_{j=1}^{i-1}A_j$ to obtain a set of disjoint $\mu_Y$ -atoms. In what follows we assume I to be infinite, but the proof works exactly the same for finite I when you replace $\infty$ with $|I|$ .

Let $E_Y^*\,:\!=\,E_Y\setminus\bigcup_{j=1}^\infty B_j$ , so that the $B_j$ and the $E^*_Y$ form a partition of $E_Y$ . Furthermore, let $b_j\,:\!=\,\mu_Y(B_j)$ be the probabilities of being in the individual atoms in I (and therefore the sizes corresponding to the equivalence classes of atoms). We now have, for any RV X,

(C.1) \begin{align} \text{UD} (X, Y) & = 2\sup_{A\in\mathcal{E}_X\bigotimes\mathcal{E}_Y} \{ \mu_{X,Y}(A)-(\mu_X\times\mu_Y)(A) \}\nonumber \\ & \leq 2\sup_{A\in\mathcal{E}_X\bigotimes\mathcal{E}_Y} \{ \mu_{X,Y} (A\cap (E_X\times E^*_Y) ) - (\mu_X\times\mu_Y) (A\cap (E_X\times E^*_Y)) \} \nonumber \\[-5pt] & \quad + 2\sup_{A\in\mathcal{E}_X\bigotimes\mathcal{E}_Y} \Bigg \{ \sum_{j=1}^{\infty} (\mu_{X,Y} (A\cap (E_X\times B_j)) \nonumber \\ & \qquad \qquad \qquad \qquad \qquad -(\mu_X\times\mu_Y) (A\cap (E_X\times B_j) ) ) \Bigg \}. \end{align}

Now note that the first term is at most $\mu_Y(E^*_Y)=1-\sum_{i=1}^\infty b_i$ . To bound the second term, we examine each individual term of the summation. First, we note that the set of finite unions of ‘rectangles’ (Cartesian products of elements in $\mathcal{E}_X$ and $\mathcal{E}_Y$ )

$$\matrix{ {R \,:\!=\, \Bigg \{C \in {{\cal E}_X} \bigotimes {{\cal E}_{\cal Y}}\mid {\text{ there exists }}k \in \mathbb{N} {\text{ such that}}} \hfill \cr {\quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \,\,\, C = \bigcup\limits_{i = 1}^k {({A_i} \times {B_i})} ,{\text{ with, for all }}i,{A_i} \in {{\cal E}_X} \wedge {B_i} \in {{\cal E}_Y} \Bigg \} } \hfill \cr } $$

is an algebra. Therefore, for any $D\in\mathcal{E}_X\bigotimes\mathcal{E}_Y$ and $\epsilon>0$ , there exists a $D_{\epsilon}\in R$ such that $\nu(D_\epsilon\triangle D)<\epsilon$ , where $\nu\,:\!=\,\mu_{X,Y}+(\mu_X\times\mu_Y)$ . Specifically, for $A \cap (E_X\times B_j)$ and $\epsilon>0$ there exists a $B_{j,\epsilon}\in R$ such that ${\nu(B_{j,\epsilon}\triangle A\cap (E_X\times B_j))<\epsilon}$ and $B_{j,\epsilon}\subset E_X\times B_j$ holds, since intersecting with this set only decreases the expression while remaining in R.

Thus, we have

\begin{equation*} |\mu_{X,Y}(A\cap (E_X\times B_j))-\mu_{X,Y}(B_{j,\epsilon})|+|(\mu_X\times\mu_Y)(A\cap (E_X\times B_j))-(\mu_X\times\mu_Y)(B_{j,\epsilon})|<\epsilon.\end{equation*}

Therefore, it must hold that

\begin{equation*}\mu_{X,Y}(A\cap (E_X\times B_j))-(\mu_X\times\mu_Y)(A\cap (E_X\times B_j)) \leq \mu_{X,Y}(B_{j,\epsilon})-(\mu_X\times\mu_Y)(B_{j,\epsilon})+\epsilon.\end{equation*}

Since $B_{j,\epsilon}$ is a finite union of ‘rectangles’, we can also write it as a finite union of k disjoint ‘rectangles’ such that $B_{j,\epsilon}=\bigcup_{i=1}^k S_i\times T_i$ with $S_i\in\mathcal{E}_X$ and $T_i\in\mathcal{E}_Y$ for all i. It now follows that

\begin{equation*}\mu_{X,Y}(B_{j,\epsilon})-(\mu_X\times\mu_Y)(B_{j,\epsilon})+\epsilon=\epsilon+\sum_{i=1}^k \mu_{X,Y}(S_i\times T_i)-(\mu_X\times\mu_Y)(S_i\times T_i).\end{equation*}

For all i we have $T_i\subset B_j$ such that either $\mu_Y(T_i)=0$ or $\mu_Y(T_i)=b_j$ , since $B_j$ is an atom of size $b_j$ . This allows us to separate the sum:

\begin{align*} \epsilon + \sum_{i=1}^k \mu_{X,Y} (S_i\times T_i)-(\mu_X\times\mu_Y)(S_i\times T_i) & = \epsilon \\ & \quad + \sum_{i:\mu_Y(T_i)=0} (\mu_{X,Y}(S_i\times T_i)-(\mu_X(S_i)\times \mu_Y(T_i)) \\ & \quad + \sum_{i:\mu_Y(T_i)=b_j} (\mu_{X,Y}(S_i\times T_i)-(\mu_X(S_i)\times \mu_Y(T_i)) \\ & = \star.\end{align*}

The first sum is equal to zero, since $\mu_{X,Y}(S_i\times T_i)\leq \mu_Y(T_i)=0$ . The second sum is bounded above by $\mu_{X,Y}(S_i\times T_i)\leq \mu_{X,Y}(S_i\times B_j)$ . By defining $S^{\prime}=\bigcup_{i:\mu_Y(T_i)=b_j}S_i$ , we obtain

\begin{align*}\star& \leq \epsilon+0+\sum_{i:\mu_Y(T_i)=b_j}(\mu_{X,Y}(S_i\times B_j)-b_j \cdot \mu_X(S_i))\\& =\epsilon+\mu_{X,Y}(S^{\prime}\times B_j)-b_j \cdot \mu_x(S^{\prime})\\& \leq \epsilon +\min \left \{ (1-b_j) \cdot \mu_X(S^{\prime}), b_j\cdot (1-\mu_X(S^{\prime})\right \}\\& \leq \epsilon +b_j-b_j^2.\end{align*}

But, since this is true for any $\epsilon > 0$ , we have

\begin{equation*}\mu_{X,Y}(A\cap (E_X\times B_j))-(\mu_X\times\mu_Y)(A\cap (E_X\times B_j))\leq b_j-b_j^2.\end{equation*}

Plugging this back into (C.1) gives

\begin{align*} \text{UD} (X, Y) & \leq 2\sup_{A\in\mathcal{E}_X\bigotimes\mathcal{E}_Y} \{ \mu_{X,Y}(A\cap (E_X\times E^*_Y))-(\mu_X\times\mu_Y)(A\cap (E_X\times E^*_Y)) \} \\ & \quad + 2\sup_{A\in\mathcal{E}_X\bigotimes\mathcal{E}_Y} \Bigg \{ \sum_{j=1}^\infty (\mu_{X,Y}(A\cap (E_X\times B_j))-(\mu_X\times\mu_Y)(A\cap (E_X\times B_j)) ) \Bigg \} \\ & \leq 2\Bigg (1-\sum_{i=1}^\infty b_i \Bigg )+2\cdot \sum_{j=1}^\infty (b_j-b_j^2) \\ & = 2\Bigg (1-\sum_{i=1}^\infty b_i^2 \Bigg ).\end{align*}

Note that in the continuous case the summation is equal to 0, so the upper bound simply becomes 2. In the discrete case, where $E_Y$ is the set in which Y takes its values, the expression becomes $\text{UD} (X, Y)\leq 2 \big (1-\sum_{i\in E_Y}\mathbb{P}(Y=i)^2 \big )$ .

C.4. Functional dependence attains maximum UD

Since we established an upper bound in Appendix C.3, the next step is to check whether this bound is actually attainable. What follows is a proof that this bound is achieved for any random variable X for which $Y=f(X)$ for some measurable function f.

Let $Y=f(X)$ for some measurable function f; then $\mu_X(f^{-1}(C))=\mu_Y(C)$ for all $C\in\mathcal{E}_Y$ . Let the $\mu_Y$ -atoms $B_j$ and $E_Y^*$ be the same as in Appendix C.3. Since $E_Y^*$ contains no atoms, for every $\epsilon>0$ there exists a partition $T_1,\dots,T_k$ for some $k\in\mathbb{N}$ such that $\mu_Y(T_i)<\epsilon$ for all i. Then, consider the set $K=\big(\bigcup_i (f^{-1}(T_i)\times T_i)\big)\cup\big(\bigcup_j (f^{-1}(B_j)\times B_j)\big)$ . It now follows that

\begin{align*}\text{UD} (X, Y) & = 2\sup_{A\in\mathcal{E}_Y\bigotimes\mathcal{E}_Y}\mu_{X,Y}(A)-(\mu_X\times\mu_Y)(A)\\& \geq 2\mu_{X,Y}(K)-(\mu_X\times\mu_Y)(K) \\ & = 2\Bigg (\sum_i(\mu_{X,Y}(f^{-1}(T_i)\times T_i)-\mu_X(f^{-1}(T_i))\mu_Y(T_i))\\& \quad +\sum_j(\mu_{X,Y}(f^{-1}(B_j)\times B_j)-\mu_X(f^{-1}(B_j))\mu_Y(B_j)) \Bigg )\\& \geq 2 \Bigg (\sum_i(\mu_Y(T_i)-\epsilon*\mu_Y(T_i))+\sum_j(b_j-b_j^2)\Bigg )\\& = 2\Bigg (\Bigg(1-\sum_j b_j\Bigg)-\epsilon\Bigg(1-\sum_j b_j\Bigg)+\sum_j (b_j-b_j^2) \Bigg ).\end{align*}

But, since this holds for any $\epsilon>0$ , we have $\text{UD} (X, Y)\geq 2\big(1-\sum_j b_j^2\big)$ . As this is also the upper bound from Appendix C.3, equality must hold. Thus, we can conclude that $\text{UD} (X, Y)$ is maximal for Y if $Y=f(X)$ (so, in particular, if $X=Y$ ). As a result, for any RVs $X_1,X_2,Y$ with $Y=f(X_1)$ for some measurable function f, we have $\text{UD} (X_1, Y)\geq\text{UD} (X_2, Y)$ . Note that a corollary of this proof is that $\text{UD} (Y, Y)=0$ if and only if there exists a $\mu_Y$ -atom $B_i$ with $\mu_Y(B_i)=1$ .

C.5. Unambiguity

In Section 5, we show for discrete RVs that property II.5 holds. In this section, we prove the general case. Let $Y_1,\dots,Y_N$ and S be independent RVs where S takes values in $1,\dots,N$ with $\mathbb{P}(S=i)=p_i$ . Finally, define $X\,:\!=\,Y_S$ . Then we will show that $\text{Dep} (Y_i \mid X)=p_i$ .

Let $\mathcal{E}$ be the $\sigma$ -algebra on which the independent $Y_i$ are defined. Then we have $\mu_{X,Y_i,S}(A\times\{j\})=\mu_{Y_j,Y_i}(A)\mu_S(\{j\})=p_j\mu_{Y_j,Y_i}(A)$ for all j. Additionally, we have $\mu_X(A)=\sum_j p_j\mu_{Y_j}(A)$ . Lastly, due to independence for $i\neq j$ , we have $\mu_{Y_j,Y_i}=\mu_{Y_j}\times\mu_{Y_i}$ . Combining all this gives

\begin{align*} \text{UD} (X, Y_i) & = 2\sup_{A\in\mathcal{E}\times\mathcal{E}}\left \{\mu_{X,Y_i}(A)-(\mu_X\times\mu_{Y_i})(A)\right \}\\& =2\sup_{A\in\mathcal{E}\times\mathcal{E}}\Bigg \{\sum_{j}\mu_{X,Y_i,S}(A\times\{j\})-\sum_j p_j(\mu_{Y_j}\times\mu_{Y_i})(A)\Bigg \}\\& = 2\sup_{A\in\mathcal{E}\times\mathcal{E}} \Bigg \{ \sum_j p_j (\mu_{Y_j,Y_i}(A)-(\mu_{Y_j}\times\mu_{Y_i})(A))\Bigg\}\\& = 2\sup_{A\in\mathcal{E}\times\mathcal{E}} \{p_i (\mu_{Y_i,Y_i}(A)-(\mu_{Y_i}\times\mu_{Y_i})(A) ) \}\\& = p_i\cdot\text{UD} (Y_i, Y_i).\end{align*}

C.6. Measurable functions never increase UD

Next, we prove another useful property of UD: applying a measurable function to one of the variables does not increase the UD. Let ${f\,:\,(E_X,\mathcal{E}_X)\to (E_{X^{\prime}},\mathcal{E}_{X^{\prime}})}$ be a measurable function. Then ${h\,:\, E_X\times E_Y\to E_{X^{\prime}}\times E_{Y}}$ with ${h(x,y)=(f(x),y)}$ is measurable. Now it follows that

\begin{align*}\text{UD} (f(X), Y) & =2\sup_{A\in\mathcal{E}_{X^{\prime}}\bigotimes\mathcal{E}_Y} \{\mu_{(f(X),Y)}(A)-(\mu_{f(X)} \times\mu_{Y})(A) \}\\& =2\sup_{A\in\mathcal{E}_{X^{\prime}}\bigotimes\mathcal{E}_Y} \{\mu_{(X,Y)}(h^{-1}(A))-(\mu_{X} \times\mu_{Y})(h^{-1}(A)) \},\end{align*}

with ${h^{-1}(A)\in \mathcal{E}_X\bigotimes\mathcal{E}_Y}$ . Thus,

\begin{align*}\text{UD} (f(X), Y) & \leq 2\sup_{A\in\mathcal{E}_X\bigotimes\mathcal{E}_Y}(\mu_{(X,Y)}(A)-(\mu_X \times\mu_Y)(A))\\& =\text{UD} (X, Y).\end{align*}

Appendix C.1 proved that UD is symmetric. Therefore, for ${g\,:\, E_Y\to E_{Y^{\prime}}}$ , $\text{UD} (X, g(Y))\leq \text{UD} (X, Y)$ .

Acknowledgement

The authors wish to thank the anonymous referees for their useful comments, which led to a significant improvement of the readability and quality of the paper.

Funding information

There are no funding bodies to thank relating to the creation of this article.

Competing interests

There were no competing interests to declare which arose during the preparation or publication process of this article.

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Figure 0

Table 1. A summary of desirable properties for a dependency function as stated in previous literature.

Figure 1

Table 2. New list of desirable properties for a dependency function.

Figure 2

Table 3. Properties of previous dependencies functions (= property not satisfied, ${\checkmark}$ = property satisfied)

Figure 3

Figure 1. Influence of the chosen (a) bandwidth and (b) number of bins on the dependency score $\text{Dep} (Y \mid X)$ with 5000 samples of ${X\sim \mathcal{U}(0,1)}$ and ${Y = X + \epsilon}$ with ${\epsilon \sim \mathcal{N}(0,0.1)}$.