2.1. Aging notions

Let $f\colon I\to \mathbb{R}_+\,:\!=\,[0,\infty)$ be a function, where I is an interval of $\mathbb{R}$ . f is said to be log-concave if, for all $x, y\in I$ and $\alpha\in (0,1)$ , $f(\alpha x + (1-\alpha)y) \ge [f(x)]^\alpha [f(y)]^{1-\alpha}$ . When $I\not=\mathbb{R}$ , log-concavity of f on I can be interpreted as log-concavity over $\mathbb{R}$ by setting $f(x)=0$ for all $x\not\in I$ . Log-convexity does not possess such a property.

Let Z be a random variable with distribution function H. Then Z or H is said to be ILR (increasing likelihood ratio) or PF $_2$ (Pólya frequency of order 2) if Z has a log-concave density or probability function, IFR (increasing failure rate) if $\overline H(x)$ is log-concave in $x\in\mathbb{R}$ , and DRHR (decreasing reversed hazard rate) if H(x) is log-concave in $x\in\mathbb{R}$ . It is well known [Reference Barlow and Proschan5] that ILR $\Longrightarrow$ DRHR and IFR. If Z has a probability density function h, then Z is IFR if and only if the failure rate function $\lambda(t)\,:\!=\,{h(t)}/{\overline{H}(t)}$ is increasing on $\{t\colon H(t)<1\}$ , and Z is DRHR if and only if the reversed hazard rate function $\mu(t)\,:\!=\, {h(t)}/{H(t)}$ is decreasing on $\{t\colon H(t)>0\}$ . For more on ILR or log-concavity and its applications, see [Reference Bobkov and Madiman10, Reference Fradelizi, Madiman, Wang, Houdré, Mason, Reynaud-Bouret, Rosiński and Springer17, Reference Marsiglietti and Kostina34, Reference Toscani48, Reference Yu50].

Let Z be a positive random variable with distribution function H and density function h. Then Z or H is said to be IGLR (increasing generalized likelihood ratio) if $h({\mathrm{e}}^x)$ is log-concave in $x\in\mathbb{R}$ , and IGFR (increasing generalized failure rate) if $x\lambda(x)$ is increasing in $x\in\{t\colon H(t)<1\}$ . IGFR distributions were introduced as a tool in many supply chain models and also in stochastic models of applied probability. [Reference Paul39] investigated closure properties of IGFR under common transformations of random variables, and compared the class of IGFR distributions with the class of IFR distribution. [Reference Lariviere30] provided alternative characterizations of IGFR distributions that lead to simplified verification of whether the IGFR condition holds. [Reference Banciu and Mirchandani4] investigated the closure property of IGFR under left and right truncations, and extended the IGFR notion to discrete distributions. Many commonly used families of random variables do possess the IGLR [Reference Hu, Nanda, Xie and Zhu19] and IGFR properties [Reference Banciu and Mirchandani4]. Further properties and characterizations of IGLR and IGFR can be found in [Reference Belzunce, Ruiz and Ruiz8, Reference Hu, Nanda, Xie and Zhu19, Reference Oliveira and Torrado37, Reference Ramos and Sordo41]. For example,

• Z is IGFR if and only if $Z\le_{\rm hr} a Z$ for all $a>1$ ;

• Z is IGLR if and only if $Z\le_{\rm lr} a Z$ for all $a>1$ ,

where $\le_{\rm hr}$ and $\le_{\rm lr}$ denote the hazard rate and likelihood ratio orders, respectively. Their formal definitions can be found in [Reference Shaked and Shanthikumar44]. Obviously, both IGLR and IFR imply IGFR.

Proposition 2.1 gives a characterization of the aging notion of DRHR in terms of expected utilities. To present the proposition, we recall the Arrow–Pratt definition of ‘more risk averse’ from [Reference Pratt40]. Let u and v be two increasing utility functions. u is said to be more risk averse than v if there exists an increasing and concave function $\kappa$ such that $u(x)=\kappa (v(x))$ for all x or, equivalently, $r_u(x)\ge r_v(x)$ for all x, where $r_u(x)$ is the Arrow–Pratt absolute local measure of risk aversion defined by $r_u(x)= -{u''(x)}/{u'(x)}$ whenever u and v are twice differentiable.

Proposition 2.1 ([Reference Jewitt21].) Let random variables X and Y admit a comparative statics result in the sense that

(2.1) \begin{equation} \mathbb{E}[v(X)] \le \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(X)] \le \mathbb{E}[u(Y)] \end{equation}

whenever u, v are increasing concave with u more risk averse than v. Let Z be a random variable. Then Z is DRHR if and only if

\begin{equation*} \mathbb{E}[v(X+Z)] \le \mathbb{E}[v(Y+Z)] \Longrightarrow \mathbb{E}[u(X+Z)] \le \mathbb{E}[u(Y+Z)] \end{equation*}

whenever X and Y satisfy (2.1), independent of Z, and u, v are increasing concave with u more risk averse than v.

2.2. Stochastic orders

We first recall the definitions of the dispersive order, excess wealth order, location-independent riskier order, and total time on test transform order. For the last three orders we use different but equivalent definitions to those in the literature. This will help us to understand the connections among these three orders.

[Reference Shaked and Shanthikumar43] proved that $X\le_{\rm disp} Y \Longrightarrow X\le_{\rm lir} Y$ and $X\le_{\rm ew} Y$ , and [Reference Fagiuoli, Pellerey and Shaked15] observed that

(2.2) \begin{equation} X\le_{\rm ew} Y \Longleftrightarrow -X\le_{\rm lir} -Y.\end{equation}

Therefore, all properties of the order $\le_{\rm lir}$ can be substituted for the order $\le_{\rm ew}$ , and vice versa. When X and Y have an equal finite mean, it follows from the definitions that $X\le_{\rm ttt} Y \Longleftrightarrow X\ge_{\rm ew} Y$ .

As pointed out in [Reference Kochar, Li and Shaked25], the orders $\le_{\rm disp}$ , $\le_{\rm lir}$ , and $\le_{\rm ew}$ are location independent while the order $\le_{\rm ttt}$ is location dependent: $X\le_{\rm disp}[\le_{\rm lir},\le_{\rm ew}]\ Y\Longrightarrow X\le_{\rm disp}[\le_{\rm lir},\le_{\rm ew}]\ Y+c$ for any $c\in\mathbb{R}$ , and $X\le_{\rm ttt} Y \Longrightarrow X\le_{\rm ttt} Y+c$ for any $c>0$ , where the latter implication does not hold for $c<0$ . Each of the orders $\le_{\rm disp}$ , $\le_{\rm lir}$ , and $\le_{\rm ew}$ compares the variability of the underlying random variables, while the order $\le_{\rm ttt}$ combines comparison of location with comparison of variation.

The above four orders can be characterized in different ways; we now list three characterizations of the orders $\le_{\rm disp}$ , $\le_{\rm lir}$ , and $\le_{\rm ew}$ in terms of expected utilities. It is still unknown whether the order $\le_{\rm ttt}$ can be characterized by utility functions.

Proposition 2.2. ([Reference Landsberger and Meilijson28].) $X\le_{\rm disp} Y$ if and only if, for all increasing functions u and v with u being more risk averse than v, and for every real number $c\in\mathbb{R}$ ,

$$\mathbb{E}[v(X-c)] \ge \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(X-c)] \ge \mathbb{E}[u(Y)].$$

Proposition 2.3. ([Reference Jewitt22].) $X\le_{\rm lir} Y$ if and only if, for all increasing concave functions u and v with u being more risk averse than v, and for every real number $c\in\mathbb{R}$ ,

$$\mathbb{E}[v(X-c)] \ge \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(X-c)] \ge \mathbb{E}[u(Y)].$$

Proposition 2.4. ([44, Theorem 3.C.2].) $X\le_{\rm ew} Y$ if and only if, for all increasing convex functions v and $\kappa$ such that $u(\cdot)= \kappa (v(\cdot))$ , and for every real number $c\in\mathbb{R}$ ,

$$\mathbb{E}[v(X-c)] \ge \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(X-c)] \ge \mathbb{E}[u(Y)].$$

Proposition 2.3 has the following interpretation in economics [Reference Fagiuoli, Pellerey and Shaked15]: Let v be the utility function of a risk averse agent (that is, v is increasing and concave), and let X and Y be two random assets. If the agent is willing to pay c (not necessarily nonnegative) for the replacement of the asset Y by the asset X, then so does another agent with utility function u, which is Arrow–Pratt more risk averse than the first. Similar interpretations of Propositions 2.2 and 2.4 can be given in economics.

For further properties and applications of these orders, see [Reference Belzunce6, Reference Chateauneuf, Cohen and Meilijson11, Reference Chateauneuf, Cohen and Meilijson12, Reference Hu, Chen and Yao18, Reference Kirkegaard23, Reference Kirkegaard24, Reference Kochar, Li and Xu26, Reference Landsberger and Meilijson28, Reference Mao and Hu33, Reference Singpurwalla and Gordon45, Reference Sordo46], among others.

3.1. Characterization of IFR

Observe that a random variable X is IFR if and only if $-X$ is DRHR. A characterization of IFR can be deduced from Proposition 2.1 as follows, which was also mentioned implicitly in [Reference Jewitt21, Note 16].

Theorem 3.1. Let the random variables X and Y admit a comparative statics result in the sense that

(3.1) \begin{equation} \mathbb{E}[v(X)] \le \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(X)] \le \mathbb{E}[u(Y)] \end{equation}

whenever v and $\kappa$ are increasing and convex such that $u(\cdot)=\kappa (v(\cdot))$ . Let Z be a random variable. Then Z is IFR if and only if

$$ \mathbb{E}[v(X+Z)] \le \mathbb{E}[v(Y+Z)] \Longrightarrow \mathbb{E}[u(X+Z)] \le \mathbb{E}[u(Y+Z)] $$

whenever X and Y satisfy (3.1), independent of Z, and v and $\kappa$ are increasing convex such that $u(\cdot)=\kappa (v(\cdot))$ .

3.2. Characterization of ILR

Before we present the characterization of ILR in terms of expected utilities, we need two useful lemmas. Lemma 3.1 characterizes the unique crossing property of two distribution functions in terms of expected utilities, and Lemma 3.2 states that the unique crossing property is preserved under the convolution with an ILR distribution. The proof of Lemma 3.1 is given in Appendix A.1.

The following notation will be used [Reference Shaked and Shanthikumar44, (1.A.18)]: Let a(x) be defined on I, where I is a subset of the real line. The number of sign changes of a(x) on I is defined by $S^-(a)=\sup S^-[a(x_1), a(x_2), \ldots, a(x_m)]$ , where $S^-[y_1, y_2,\ldots, y_m]$ is the number of sign changes of the indicated sequence, zero terms being discarded, and the supremum is extended over all sets $x_1<x_2<\cdots <x_m$ such that $x_i\in I$ and $2\le m<\infty$ .

Lemma 3.1. Let X and Y be two random variables with respective distribution functions F\break and G. Then $S^-(G-F)\le 1$ , with the sign sequence being $-,+$ in the case of equality, if and only if

(3.2) \begin{equation} \mathbb{E}[v(X)] \le \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(X)] \le \mathbb{E}[u(Y)] \end{equation}

whenever u and v are both increasing with u more risk averse than v.

Now, let $Z_1$ and $Z_2$ be two risky prospects, and let W be the initial wealth, independent of $Z_1$ and $Z_2$ . If W has a log-concave density function, and if one decision maker v prefers $Z_2$ to $Z_1$ , then so does the other more risk averse decision maker u, as stated in the next lemma.

Theorem 3.2. Let random variables X and Y admit a comparative statics result in the sense that

(3.3) \begin{equation} \mathbb{E}[v(X)] \le \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(X)] \le \mathbb{E}[u(Y)] \end{equation}

whenever u, v are increasing functions with u more risk averse than v. Let Z be a random variable with density function h that does not vanish on an interval I. Then Z is ILR if and only if

(3.4) \begin{equation} \mathbb{E}[v(X+Z)] \le \mathbb{E}[v(Y+Z)] \Longrightarrow \mathbb{E}[u(X+Z)] \le \mathbb{E}[u(Y+Z)] \end{equation}

whenever X and Y satisfy (3.3), independent of Z, and u, v are increasing with u more risk averse than v.

Proof. To prove necessity, assume that Z is ILR, and that X and Y satisfy (3.3), and denote by F and G the distribution functions of X and Y, respectively. Then, from Lemma 3.1, it follows that $S^-(G-F)\le 1$ with the sign sequence being $-,+$ in the case of equality. Therefore, by Lemma 3.2, (3.4) holds.

To prove sufficiency, assume that (3.4) holds. Consider two special random variables X and Y as follows: $Y=0$ and X takes values $y-x$ and $y-z$ with respective probabilities p and $1-p$ , $p\in (0,1)$ , and $y, z, x\in I$ are arbitrary. Denote by $F_W$ the distribution function of any random variable W. It is easy to see that $S^-(F_Y-F_X)\le 1$ with the sign sequence being $-,+$ in the case of equality. By Lemma 3.1, X and Y satisfy (3.3). Again by Lemma 3.1, we conclude that $S^-(F_{Y+Z}-F_{X+Z})\le 1$ with the sign sequence being $-,+$ in the case of equality, i.e., for any $\delta>0$ ,

(3.5) \begin{equation} H(y) > pH(x) + (1-p)H(z) \Longrightarrow H(y+\delta) \ge pH(x+\delta) + (1-p)H(z+\delta), \end{equation}

where H is the distribution function of Z. Since H is strictly increasing and continuous, the inverse $H^{-1}$ of H exits on (0,1). Making a change of variables in the above inequalities, from (3.5) we obtain that, for any r,s,t in (0,1) and any $\delta>0$ ,

(3.6) \begin{equation} s> p r +(1-p) t \Longrightarrow H(H^{-1}(s)+\delta) \ge pH(H^{-1}(r)+\delta) + (1-p)H(H^{-1}(t)+\delta). \end{equation}

For given r and t, choose $s=pr+(1-p)t + \varepsilon$ such that $s\in (0,1)$ and $\varepsilon>0$ satisfies the first inequality in (3.6). So it follows that

\begin{equation*} H(H^{-1}(pr+(1-p)t+\varepsilon) + \delta) \ge pH(H^{-1}(r)+\delta) + (1-p)H(H^{-1}(t)+\delta). \end{equation*}

Since H and $H^{-1}$ are continuous, upon taking the limit as $\varepsilon\to 0$ we obtain that, for all $\delta>0$ , $g_\delta(\alpha) = H(H^{-1}(\alpha)+\delta)$ is concave in $\alpha\in (0,1)$ . In other words, $g_\delta \circ H(x) = H(x+\delta)$ for all x with $g_\delta$ concave. Differentiating on both sides of this, we obtain that $g_\delta' \circ H(x)h(x) = h(x+\delta)$ for all $\delta>0$ . Thus, ${h(x+\delta)/ h(x)} = g'_\delta \circ H(x)$ , which is decreasing in x. Therefore, h(x) is log-concave. This completes the proof.

3.3. Characterizations of IGFR and IGLR

Let Z be a positive random variable. Observe that

• Z is IGFR if and only if $\log Z$ is IFR;

• Z is IGLR if and only if $\log Z$ is ILR.

Based on this observation, applying Theorems 3.1 and 3.2 yields the following two results characterizing the IGFR and IGLR properties of a positive random variable.

Theorem 3.3. Let X and Y be two positive random variables admitting a comparative statics result in the sense that

(3.7) \begin{equation} \mathbb{E}[v(X)] \le \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(X)] \le \mathbb{E}[u(Y)] \end{equation}

whenever v and $\kappa$ are increasing convex such that $u(\cdot)= \kappa (v(\cdot))$ . Let Z be a positive random variable. Then Z is IGFR if and only if

$$ \mathbb{E}[v(XZ)] \le \mathbb{E}[v(YZ)] \Longrightarrow \mathbb{E}[u(XZ)] \le \mathbb{E}[u(YZ)] $$

whenever X and Y satisfy (3.7), independent of Z, and v and $\kappa$ are increasing convex such that $u(\cdot)=\kappa(v(\cdot))$ .

Theorem 3.4. Let X and Y be two positive random variables admitting a comparative statics result in the sense that

(3.8) \begin{equation} \mathbb{E}[v(X)] \le \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(X)] \le \mathbb{E}[u(Y)] \end{equation}

whenever u, v are increasing functions with u more risk averse than v. Let Z be a positive random variable with density function h that does not vanish on an interval I. Then Z is IGLR if and only if

$$ \mathbb{E}[v(XZ)] \le \mathbb{E}[v(YZ)] \Longrightarrow \mathbb{E}[u(XZ)] \le \mathbb{E}[u(YZ)] $$

whenever X and Y satisfy (3.8), independent of Z, and u, v are increasing with u more risk averse than v.

In Theorems 3.3 and 3.4, comparative statics results are preserved after multiplication of the choice variables by another independent nonnegative random variable Z whenever Z is IGFR and IGLR, respectively. These results would be appropriate, for instance, to the case of portfolio choice where returns are all nominal and the rate of inflation is a random variable [Reference Jewitt21].

4.1. Closure property of aging notions under convolution

It is well known that

• ILR is closed under convolution [Reference Dharmadhikari and Joag-dev14, p. 17];

• IFR is closed under convolution [Reference Shaked and Shanthikumar44, Corollary 1.B.39];

• DRHR is closed under convolution [Reference Shaked and Shanthikumar44, Corollary 1.B.63].

These closure properties of aging notions ILR, IFR, and DRHR under convolutions can be obtained directly from Theorems 3.2 and 3.1 and Proposition 2.1, respectively. For example, to prove the closure property of ILR under convolution, let $Z_1$ and $Z_2$ be two independent ILR random variables, and let X and Y be two other random variables, independent of $Z_1$ and $Z_2$ , satisfying (3.3) whenever u, v are increasing functions with u more risk averse than v. Since $Z_1$ and $Z_2$ are ILR, applying Theorem 2.2 twice yields

\begin{align*} \mathbb{E}[v(X+Z_1)] \le \mathbb{E}[v(Y+Z_1)] & \Longrightarrow \mathbb{E}[u(X+Z_1)] \le \mathbb{E}[u(Y+Z_1)], \\ \mathbb{E}[v(X+Z_1+Z_2)] \le \mathbb{E}[v(Y+Z_1+Z_2)] & \Longrightarrow \mathbb{E}[u(X+Z_1+Z_2)] \le \mathbb{E}[u(Y+Z_1+Z_2)].\end{align*}

Again applying Theorem 3.2 to the second line, we conclude that $Z_1+Z_2$ is ILR.

Similarly, we can recover that IGFR and IGLR properties of positive random variables are preserved under product by Theorems 3.3 and 3.4.

4.2. Closure property of the dispersive order under convolution

By Theorem 3.2 and Proposition 2.2, we can recover the next two known results. We give the proof of the first one; the proof of the second one is similar.

Proof. Suppose that Z is ILR. For any random variable Y, $0\le_{\rm disp} Y$ . By Proposition 2.2, for any constant $c\in\mathbb{R}$ , $X'=-c$ and Y satisfy (3.3). From Theorem 3.2, it follows that

$$ \mathbb{E}[v(Z-c)] \le \mathbb{E}[v(Y+Z)] \Longrightarrow \mathbb{E}[u(Z-c)] \le \mathbb{E}[u(Y+Z)] $$

whenever u, v are increasing with u more risk averse than v. Again by Proposition 2.2, we conclude that $Z\le_{\rm disp} Z+Y$ .

The sufficiency is the same as in the proof of Theorem 3.2.

Note that ILR is closed under convolution. Repeated application of Theorem 4.2 yields [Reference Shaked and Shanthikumar44, Theorem 3.B.9]. That is, let $(X_i, Y_i)$ , $i=1,2, \ldots, n$ , be independent pairs of random variables such that $X_i\le_{\rm disp} Y_i$ for $i=1,2,\ldots, n$ . If the $X_i$ and $Y_i$ are all ILR, then $\sum^n_{i=1} X_i \le_{\rm disp} \sum^n_{i=1} Y_i$ .

4.3. Closure property of the location-independent riskier order under convolution

[Reference Hu, Chen and Yao18] proved that Z is DRHR if and only if $Z\le_{\rm lir} Z+Y$ for any random variable Y, independent of Z. Based on this fact and Propositions 2.1 and 2.3, we conclude the following result.

Note that DRHR is closed under convolution. Repeated application of Theorem 4.3 yields the following corollary.

[Reference Hu, Chen and Yao18] obtained Theorem 4.3 and Corollary 4.1 with $X\le_{\rm lir} Y$ and $X_i\le_{\rm lir} Y_i$ replaced by the stronger assumptions $X\le_{\rm disp} Y$ and $X_i\le_{\rm disp} Y_i$ , respectively.

4.4. Closure property of the excess wealth order under convolution

Observe that a random variable X is IFR if and only if $-X$ is DRHR. In terms of (2.2), all results for the order $\le_{\rm lir}$ in Section 4.3 can be translated for the order $\le_{\rm ew}$ . The first one is [Reference Shaked and Shanthikumar44, Theorem 3.C.8], which states that Z is IFR if and only if $Z\le_{\rm ew} Z+Y$ for any random variable Y, independent of Z.

[Reference Shaked and Shanthikumar44, Theorems 3.C.9 and 3.C.10] are Theorem 4.4 and Corollary 4.2 with $X\le_{\rm ew} Y$ and $X_i\le_{\rm ew} Y_i$ replaced by the stronger assumptions $X\le_{\rm disp} Y$ and $X_i\le_{\rm disp} Y_i$ , respectively.

4.5. Closure property of the total time on test transform order under convolution

[Reference Hu, Wang and Zhuang20] obtained the following connection between the total time on test transform and the excess wealth orders, which will be useful in establishing the closure property of the total time on test transform order under convolution. Recall that, for two random variables X and Y with respective distribution functions F and G, X is said to be smaller thant Y, denoted by $X\le_{\rm st} Y$ , if $F(x)\ge G(x)$ for all $x\in\mathbb{R}$ .

Note that IFR is closed under convolution. Repeated application of Theorem 4.5 yields the following corollary.

[Reference Hu, Wang and Zhuang20] obtained Theorem 4.5 and Corollary 4.3 with IFR replaced by a stronger aging notion ILR.

4.6. Closure property of the star order under product

Let X and Y be two nonnegative random variables with distribution functions F and G, respectively. Recall that X is smaller than Y in the star order, denoted by $X\le_{\ast} Y$ , if $G^{-1}F(x)$ is star-shaped in $x\in\mathbb{R}_+$ , i.e. $G^{-1}F(x)/x$ is increasing in $x\in\mathbb{R}_+$ .

Observe that $X \le_{\rm disp} Y \Longleftrightarrow {\mathrm{e}}^X \le_{\ast} {\mathrm{e}}^Y$ . The next three results follow directly from Proposition 2.2 and Theorems 4.1 and 4.2, respectively.

Theorem 4.6. $X\le_{\ast} Y$ if and only if, for all increasing functions u and v with u being more risk averse than v, and for every real number $c>0$ ,

$$ \mathbb{E}[v(cX)] \ge \mathbb{E}[v(Y)] \Longrightarrow \mathbb{E}[u(cX)] \ge \mathbb{E}[u(Y)]. $$

Note that IGLR is closed under convolution. Repeated application of Theorem 4.8 yields the following corollary.