Risk Management with Tail Quasi-Linear Means
Nicole B\"auerle, Tomer Shushi

TL;DR
This paper introduces a generalized risk measure called Tail Quasi-Linear Means, unifying several risk metrics and analyzing its properties for improved risk management strategies.
Contribution
It extends Quasi-Linear Means to the tail of distributions, unifying Value at Risk, Tail Value at Risk, and Entropic Risk Measure in a single framework.
Findings
The measure encompasses VaR, TVaR, and Entropic Risk in a unified way.
Properties and implications of the measure in risk assessment are characterized.
Formulas for truncated elliptical loss models are derived.
Abstract
We generalize Quasi-Linear Means by restricting to the tail of the risk distribution and show that this can be a useful quantity in risk management since it comprises in its general form the Value at Risk, the Tail Value at Risk and the Entropic Risk Measure in a unified way. We then investigate the fundamental properties of the proposed measure and show its unique features and implications in the risk measurement process. Furthermore, we derive formulas for truncated elliptical models of losses and provide formulas for selected members of such models.
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Taxonomy
TopicsRisk and Portfolio Optimization
**Risk management with Tail Quasi-Linear Means
**
**Nicole Bäuerle1∗ and Tomer Shushi2
**
1 Institute of Stochastics, Karlsruhe Institute of Technology (KIT), D-76128 Karlsruhe, 2 Department of Business Administration, Guilford Glazer Faculty of Business and Management, Ben-Gurion University of the Negev, Beer-Sheva, Israel
∗ Corresponding author. E-mail: [email protected]
Abstract:
We generalize Quasi-Linear Means by restricting to the tail of the risk distribution and show that this can be a useful quantity in risk management since it comprises in its general form the Value at Risk, the Conditional Tail Expectation and the Entropic Risk Measure in a unified way. We then investigate the fundamental properties of the proposed measure and show its unique features and implications in the risk measurement process. Furthermore, we derive formulas for truncated elliptical models of losses and provide formulas for selected members of such models.
**Keywords: ** Quasi-Linear Means; Risk measurement; Tail risk measures; Conditional Tail Expectation; Value at Risk; Entropic Risk Measure
1 Introduction
One of the most prominent risk measures which are also extensively used in practice are Value at Risk and Conditional Tail Expectation. Both have their pros and cons and it is well-known that Conditional Tail Expectation is the smallest coherent (in the sense of Artzner et al. (1999)) risk measure dominating the Value at Risk (see e.g. Föllmer & Schied (2016), Theorem 4.67). Though in numerical examples the Conditional Tail Expectation is often much larger than the Value at Risk, given the same level . In this paper we present a class of risk measures which includes both, the Value at Risk and the Conditional Tail Expectation. Another class with this property is the Range Value at Risk, introduced in Cont et al. (2010) as a robustification of Value at Risk and Conditional Tail Expectation. Our approach relies on a generalization of Quasi-Linear Means. Quasi-Linear Means can be traced back to Bonferroni (Bonferroni (1924), p.103) who proposed a unifying formula for different means. Interestingly he motivated this with a problem from actuarial sciences about survival probabilities (for details see also Muliere & Parmigiani (1993), p.422).
The Quasi-Linear Mean of a random variable , denoted by is for an increasing, continuous function defined as
[TABLE]
where is the generalized inverse of (see e.g. Muliere & Parmigiani (1993)). If is in addition concave, is a Certainty Equivalent. If is convex corresponds to the Mean Value Risk Measure (see Hardy et al. (1952)). We take the actuarial point of view here, i.e. we assume that the random variable is real-valued and represents a discounted net loss at the end of a fixed period. This means that positive values are losses whereas negative values are seen as gains. A well-known risk measure which is obtained when taking the exponential function in this definition is the Entropic Risk Measure which is known to be a convex risk measure but not coherent (see e.g. Müller (2007); Tsanakas (2009)).
In this paper, we generalize Quasi-Linear Means by focusing on the tail of the risk distribution. The proposed measure quantifies the Quasi-Linear Mean of an investor when conditioning on outcomes that are higher than its Value at Risk. More precisely it is defined by
[TABLE]
where is the usual Value at Risk. We call it Tail Quasi-Linear Mean (TQLM). It can be shown that when we restrict to concave (utility) functions, the TQLM interpolates between the Value at Risk and the Conditional Tail Expectation. By choosing the utility function in the right way we can either be close to Value at Risk or the Conditional Tail Expectation. Both extreme cases are also included when we plug in specific utility functions. The Entropic Risk Measure is also a limiting case of our construction. Though in general not being convex, the TQLM has some nice properties. In particular it is still manageable and useful in applications. We show the application of TQLM risk measures for capital allocation, for optimal reinsurance and for finding minimal risk portfolios. In particular within the class of symmetric distributions we show that explicit computations lead to analytic closed-forms of TQLM.
In the actuarial sciences there are already some approaches to unify risk measures or premium principles. Risk measures can be seen as a broader concept than insurance premium principles since the latter one is considered as a ”price” of a risk (for a discussion see e.g. Goovaerts et al. (2003); Furman & Zitikis (2008)). Both are in its basic definition mappings from the space of random variables into the real numbers, but the interesting properties may vary with the application. In Goovaerts et al. (2003) a unifying approach to derive risk measures and premium principles has been proposed by minimizing a Markov bound for the tail probability. The approach includes among others the Mean Value principle, the Swiss premium principle and Conditional Tail Expectation.
In Furman & Zitikis (2008) weighted premiums have been introduced where the expectation is taken with respect to a weighted distribution function. This construction includes e.g. the Conditional Tail Expectation, the Tail Variance and the Esscher premium. This paper also discusses invariance and additivity properties of these measures.
Further, the Mean Value Principle has been generalized in various ways. In Bühlmann et al. (1977) these premium principles have been extended to the so-called Swiss Premium Principle which interpolates with the help of a parameter between the Mean Value Principle and the Zero-Utility Principle. Properties of the Swiss Premium Principle have been discussed in De Vylder & Goovaerts (1980). In particular monotonicity, positive subtranslativity and subadditivity for independent random variables are shown under some assumptions. The latter two notions are weakened versions of translation invariance and subadditivity, respectively.
The so-called Optimized Certainty Equivalent has been investigated in Ben-Tal & Teboulle (2007) as a mean to construct risk measures. It comprises the Conditional Tail Expectation and bounded shortfall risk.
The following Section provides definitions and preliminaries on risk measures that will serve as necessary foundations for the paper. Section 3 introduces the proposed risk measure and derives its fundamental properties. We show various representations of this class of risk measures and prove for concave functions (under a technical assumption) that the TQLM is bounded between the Value at Risk and the Conditional Tail Expectation. Unfortunately the only coherent risk measure in this class turns out to be the Conditional Tail Expectation (this is maybe not surprising since this is also true within the class of ordinary Certainty Equivalents, see Müller (2007)). In Section 4 we consider the special case when we choose the exponential function. In this case we call Tail Conditional Entropic Risk Measure and show that it is convex within the class of comonotone random variables. Section 5 is devoted to applications. In the first part we discuss the application to capital allocation. We define a risk measure for each subportfolio based on our TQLM and discuss its properties. In the second part we consider an optimal reinsurance problem with the TQLM as target function. For convex functions we show that the optimal reinsurance treaty is of stop-loss form. In Section 6, the proposed risk measure is investigated for the family of symmetric distributions. Some explicit calculations can be done there. In particular there exists an explicit formula for the Tail Conditional Entropic Risk Measure. Finally a minimal risk portfolio problem is solved when we consider the Tail Conditional Entropic Risk Measure as target function. Section 7 offers a discussion to the paper.
2 Classical risk measures and other preliminaries
We consider real-valued continuous random variables defined on a probability space and denote this set by . These random variables represent discounted net losses at the end of a fixed period, i.e. positive values are seen as losses whereas negative values are seen as gains. We denote the (cumulative) distribution function by . Moreover we consider increasing and continuous functions (in case takes only positive or negative values, the domain of can be restricted). The generalized inverse of such a function is defined by
[TABLE]
where . With
[TABLE]
we denote the space of all real-valued, continuous, integrable random variables. We now recall some notions of risk measures. In general, a risk measure is a mapping . Of particular importance are the following risk measures.
Definition 2.1**.**
For and with distribution function we define
- a)
the Value at Risk of at level as .
- b)
the Conditional Tail Expectation of at level as
[TABLE]
Note that the definition of Conditional Tail Expectation is for continuous random variables the same as the Average Value at Risk, the Expected Shortfall or the Tail Conditional Expectation (see chapter 4 of Föllmer & Schied (2016) or Denuit et al. (2006)). Below we summarize some properties of the generalized inverse (see e.g. McNeil et al. (2005), A.1.2).
Lemma 2.2**.**
For an increasing, continuous function with generalized inverse it holds:
- a)
* is strictly increasing and left-continuous.*
- b)
For all , we have and
- c)
If is strictly increasing on for an , we have .
The next lemma is useful for alternative representations of our risk measure. It can be directly derived from the definition of Value at Risk.
Lemma 2.3**.**
For and any increasing, left-continuous function it holds VaR_{\alpha}(f(X))=f\big{(}VaR_{\alpha}(X)\big{)}.
In what follows we will study some properties of risk measures , like
- (i)
law-invariance: depends only on the distribution .
- (ii)
constancy: for all .
- (iii)
monotonicity: If then .
- (iv)
translation invariance: For it holds .
- (v)
positive homogeneity: For it holds that
- (vi)
subadditivity: .
- (vii)
convexity: For it holds that
A risk measure with the properties (iii)-(vi) is called coherent. Note that is not necessarily coherent when is a discrete random variable, but is coherent if is continuous. Also note that if is positive homogeneous, then convexity and subadditivity are equivalent properties. Next we need the notion of the usual stochastic ordering (see e.g. Müller & Stoyan (2002)).
Definition 2.4**.**
Let be two random variables. Then is less than in usual stochastic order () if for all increasing , whenever the expectations exist. This is equivalent to for all .
Finally we also have to deal with comonotone random variables (see e.g. Definition 1.9.1 in Denuit et al. (2006));
Definition 2.5**.**
Two random variables are called comonotone if there exists a random variable and increasing functions such that and . The pair is called countermonotone if one of the two functions is increasing, the other decreasing.
3 Tail Quasi-Linear Means
For continuous random variables and levels let us introduce risk measures of the following form:
Definition 3.1**.**
Let , and an increasing, continuous function. The Tail Quasi-Linear Mean is defined by
[TABLE]
whenever the conditional expectation inside exists and is finite.
Remark 3.2**.**
- a)
It is easy to see that leads to .
- b)
The Quasi-Linear Mean is obtained by taking
In what follows we will first give some alternative representations of the TQLM. By definition of the conditional distribution it follows immediately that we can write
[TABLE]
where for continuous . Moreover, when we denote by the conditional probability given , then we obtain
[TABLE]
Thus, is just the Quasi-Linear Mean of with respect to the conditional distribution. In order to get an idea what the TQLM measures, suppose that is sufficiently differentiable. Then we get by a Taylor series approximation (see e.g. Bielecki & Pliska (2003)) that
[TABLE]
with being the Arrow-Pratt function of absolute risk aversion and
[TABLE]
being the tail variance of If is concave and is subtracted from , if is convex and is added, penalizing deviations in the tail. In this sense is approximately a Lagrange-function of a restricted optimization problem where we want to optimize the Conditional Tail Expectation under the restriction that the tail variance is not too high.
The following technical assumption will be useful:
(A)
There exists an such that is strictly increasing on .
Obviously assumption (A) is satisfied if is strictly increasing on its domain which should be satisfied in all reasonable applications. Economically (A) states that at least shortly before the critical level our measure strictly penalizes higher outcomes of . Under assumption (A) we obtain another representation of the TQLM.
Lemma 3.3**.**
For all , increasing continuous functions and such that (A) is satisfied we have that
[TABLE]
Proof.
We first show that under (A) we obtain:
[TABLE]
Due to Lemma 2.3 we immediately obtain
[TABLE]
On the other hand we have with Lemma 2.2 b),c) that
[TABLE]
which implies that both sets are equal.
Thus, we get that
[TABLE]
which implies the statement. ∎
Next we provide some simple yet fundamental features of the TQLM. The first one is rather obvious and we skip the proof.
Lemma 3.4**.**
For any , the TQLM and the Quasi-Linear Mean are related as follows:
[TABLE]
The TQLM interpolates between the Value at Risk and the Conditional Tail Expectation in case is concave. We will show this in the next theorem under our assumption (A) (see also Figure 1):
Theorem 3.5**.**
For and concave increasing functions and such that (A) is satisfied we have that
[TABLE]
Moreover, there exist utility functions such that the bounds are attained. In case is convex and satisfies (A) and all expectations exist, we obtain
[TABLE]
Proof.
Let be concave. We will first prove the upper bound. Here we use the representation of in (3.2) as a Certainty Equivalent of the conditional distribution . We obtain with the Jensen inequality
[TABLE]
Taking the generalized inverse of on both sides and using Lemma 2.2 a), b) yields
[TABLE]
The choice leads to
For the lower bound first note that
[TABLE]
Taking the generalized inverse of on both sides and using Lemma 2.2 c) yields
[TABLE]
Defining
[TABLE]
yields
[TABLE]
and we obtain
[TABLE]
Taking the generalized inverse of on both sides and using Lemma 2.2 c) yields
[TABLE]
which shows that the lower bound can be attained. If is convex, the inequality in (3.5) reverses. ∎
Next we discuss properties of the TQLM. Of course when we choose in a specific way we expect more properties to hold.
Theorem 3.6**.**
The TQLM has the following properties:
- a)
It is law-invariant.
- b)
It has the constancy property.
- c)
It is monotone.
- d)
It is translation-invariant within the class of functions which are strictly increasing if and only if or if is linear.
- e)
It is positive homogeneous within the class of functions which are strictly increasing if and only or or is linear.
Proof.
- a)
The law-invariance follows directly from the definition of and the fact that is law-invariant.
- b)
For we have that and thus which implies the statement.
- c)
We use here the representation
[TABLE]
Thus it suffices to show that the relation implies \mathbb{E}\big{[}U(X)1_{\{X\geq VaR_{\alpha}(X)\}}\big{]}\leq\mathbb{E}\big{[}U(Y)1_{\{Y\geq VaR_{\alpha}(Y)\}}\big{]}. Since we are only interested in the marginal distributions of and we can choose with same random variable which is uniformly distributed on . We obtain with Lemma 2.2
[TABLE]
The same holds true for . Since we obtain and thus
[TABLE]
which implies the result.
- d)
Since we have the representation
[TABLE]
this statement follows from Müller (2007), Theorem 2.2. Note that we can work here with one fixed conditional distribution since for all .
- e)
As in d) this statement follows from Müller (2007), Theorem 2.3. Note that we can work here with one fixed conditional distribution since for all .
∎
Remark 3.7**.**
The monotonicity property of Theorem 3.6 seems to be obvious, but it indeed may not hold if and are discrete. One has to be cautious in this case (see also the examples given in Bäuerle & Müller (2006)). The same is true for the Conditional Tail Expectation.
Theorem 3.8**.**
If is a coherent risk measure, then it is the Conditional Tail Expectation Measure
Proof.
As can be seen from Theorem 3.6, the translation invariance and homogeneity properties hold simultaneously if and only is linear, which implies that is the Conditional Tail Expectation. ∎
4 Tail Conditional Entropic Risk Measure
In case we obtain a conditional tail version of the Entropic Risk Measure. It is given by
[TABLE]
In this case we write instead of since is determined by . For we obtain in the limit the classical Entropic Risk Measure. We call Tail Conditional Entropic Risk Measure and get from (3.3) the following approximation of : If is sufficiently close to zero, the conditional tail version of the Entropic Risk Measure can be approximated by
[TABLE]
i.e. it is a weighted measure consisting of Conditional Tail Expectation and Tail Variance (see (3.4)).
Another representation of the Tail Conditional Entropic Risk Measure is for given by (see e.g. Bäuerle & Rieder (2015); Ben-Tal & Teboulle (2007))
[TABLE]
where is again the conditional distribution . The minimizing is attained at
[TABLE]
According to Theorem 3.6 we cannot expect the Tail Conditional Entropic Risk Measure to be convex. However we obtain the following result:
Theorem 4.1**.**
For the Tail Conditional Entropic Risk Measure is convex for comonotone random variables.
Proof.
First note that the Tail Conditional Entropic Risk Measure has the constancy property and is translation invariant. Thus, using Theorem 6 in Deprez & Gerber (1985) it is sufficient to show that for all comonotone where
[TABLE]
Since and are comonotone we can write them as with same random variable which is uniformly distributed on . Thus we get with Lemma 2.2 (compare also the proof of Theorem 3.6 c))
[TABLE]
The same holds true for and also for since it is an increasing, left-continuous function of for . Thus all events on which we condition here are the same:
[TABLE]
Hence we obtain
[TABLE]
and
[TABLE]
This expression can be interpreted as the variance of under the probability measure
[TABLE]
and is thus greater or equal to zero which implies the statement. ∎
5 Applications
In this Section we show that the TQLM is a useful tool for various applications in risk management.
5.1 Capital Allocation
Firms often have the problem of allocating a global risk capital requirement down to subportfolios. One way to do this is to use Aumann-Shapley capital allocation rules. For convex risk measures this is not an easy task and has e.g. been discussed in Tsanakas (2009). A desirable property in this respect would be that the sum of the capital requirements for the subportfolios equals the global risk capital requirement. More precisely, let be a vector of random variables and let be its sum. An intuitive way to measure the contribution of to the total capital requirement, based on the TQLM is by defining (compare for instance with Landsman & Valdez (2003)):
[TABLE]
This results in a capital allocation rule if
[TABLE]
It is easily shown that this property is only true in a special case:
Theorem 5.1**.**
The TQLM of the aggregated loss is equal to the sum of TQLM of the risk sources i.e. (5.1) holds for all random variables if and only if is linear.
In general we cannot expect (5.1) to hold. Indeed for the Tail Conditional Entropic Risk Measure we obtain that in case the losses are comonotone, it is not profitable to split the portfolio in subportfolios, whereas it is profitable if two losses are countermonotone.
Theorem 5.2**.**
The Tail Conditional Entropic Risk Measure has for and comonotone the property that
[TABLE]
In case and are countermonotone the inequality reverses.
Proof.
As in the proof of Theorem 4.1 we get for comonotone that with same random variable which is uniformly distributed on and that
[TABLE]
Thus with
[TABLE]
since the covariance is positive for comonotone random variables. Here, as before is the conditional distribution given by . Taking on both sides implies the result for . The general result follows by induction on the number of random variables. In the countermonotone case the inequality reverses. ∎
5.2 Optimal Reinsurance
TQLM risk measures can also be used to find optimal reinsurance treaties. In case the random variable describes a loss, an insurance company is able to reduce its risk by splitting into two parts and transferring one of these parts to a reinsurance company. More formally a reinsurance treaty is a function such that and as well as are both increasing. The reinsured part is then . The latter assumption is often made to rule out moral hazard. In what follows let
[TABLE]
be the set of all reinsurance treaties. Note that functions in are in particular Lipschitz-continuous, since increasing leads to for all . Of course the insurance company has to pay a premium to the reinsurer for taking part of the risk. For simplicity we assume here that the premium is computed according to the expected value premium principle, i.e. it is given by for and a certain amount is available for reinsurance. The aim is now to solve
[TABLE]
This means that the insurance company tries to minimize the retained risk, given the amount is available for reinsurance. Problems like this can e.g. be found in Gajek & Zagrodny (2004). A multidimensional extension is given in Bäuerle & Glauner (2018). In what follows we assume that is strictly increasing, strictly convex and continuously differentiable, i.e. according to (3.3) large deviations in the right tail of are heavily penalized. In order to avoid trivial cases we assume that the available amount of money for reinsurance is not too high, i.e. we assume that
[TABLE]
The optimal reinsurance treaty is given in the following theorem. It turns out to be a stop-loss treaty.
Theorem 5.3**.**
The optimal reinsurance treaty of problem (5.2) is given by
[TABLE]
where is a positive solution of
Note that the optimal reinsurance treaty does not depend on the precise form of , i.e. on the precise risk aversion of the insurance company.
Proof.
First observe that is continuous and decreasing. Moreover by assumption Thus by the mean-value theorem there exits an such that Since is increasing, problem (5.2) is equivalent to
[TABLE]
Since we have by Lemma 2.3 that and since is non-decreasing we obtain
[TABLE]
On the other hand it is reasonable to assume that for since this probability mass does not enter the target function which implies that for and thus
[TABLE]
In total we have that
[TABLE]
Hence, we can equivalently consider the problem
[TABLE]
Next note that we have for any convex, differentiable function that
[TABLE]
Now consider the function for fixed and fixed . By our assumption is convex and differentiable with derivative
[TABLE]
Let be the reinsurance treaty defined in the theorem and any other admissible reinsurance treaty. Then
[TABLE]
Rearranging the terms and noting that we obtain
[TABLE]
The statement follows when we can show that
[TABLE]
We can write
[TABLE]
In the first case we obtain for by definition of and (note that ):
[TABLE]
In the second case we obtain for that and since is increasing:
[TABLE]
Hence the statement is shown. ∎
6 TQLM for symmetric loss models
The symmetric family of distributions is well known to provide suitable distributions in finance and actuarial science. This family generalizes the normal distribution into a framework of flexible distributions that are symmetric. We say that a real-valued random variable has a symmetric distribution, if its probability density function takes the form
[TABLE]
where is the density generator of and satisfies
[TABLE]
The parameters and are the expectation and the scale parameter of the distribution, respectively, and we write . If the variance of exists, then it takes the form
[TABLE]
where
[TABLE]
For the sequel, we also define the standard symmetric random variable and a cumulative generator first defined in Landsman & Valdez (2003), that takes the form
[TABLE]
with the condition Special members of the family of symmetric distributions are:
- a)
The normal distribution, 2. b)
Student-t distribution with degrees of freedom, 3. c)
Logistic distribution, with where is the normalizing constant.
In what follows we will consider the TQLM for this class of random variables.
Theorem 6.1**.**
Let . Then, the TQLM takes the following form
[TABLE]
where
Proof.
For the symmetric distributed , we have
[TABLE]
Now we obtain
[TABLE]
where Hence the statement follows. ∎
For the special case of Tail Conditional Entropic Risk Measures we obtain the following result:
Theorem 6.2**.**
Let . The moment generating function of exists if and only if the Tail Conditional Entropic Risk Measure satisfies
[TABLE]
Proof.
For a function we obtain:
[TABLE]
Plugging in yields
[TABLE]
Hence it follows that
[TABLE]
Also note that is equivalent to the existence of the moment generating function. ∎
In the following theorem, we derive an explicit formula for the Tail Conditional Entropic Risk Measure for the family of symmetric loss models. For this, we denote the cumulant function of by where is the characteristic generator, i.e. it satisfies
Theorem 6.3**.**
Let and assume that the moment generating function of exists. Then the Tail Conditional Entropic Risk Measure is given by
[TABLE]
Here is the cumulative distribution function of a random variable with the density
[TABLE]
and is its tail distribution function.
Proof.
From the previous Theorem, we have that where Then, from Landsman et al. (2016), the conditional characteristic function of the symmetric distribution can be calculated explicitly, as follows:
[TABLE]
Observing that the following relation holds for any characteristic generator of (see, for instance Landsman et al. (2016), Dhaene et al. (2008))
[TABLE]
we conclude that
[TABLE]
and finally,
[TABLE]
where is the cumulant of ∎
Example 6.4**.**
Normal distribution. For , the characteristic generator is the exponential function, and we have
[TABLE]
This leads to the following density of
[TABLE]
where is the standard normal density function. Then, the Tail Conditional Entropic Measure is given by
[TABLE]
Here are the cumulative distribution function and the tail distribution function of the standard normal distribution, respectively.
Remark 6.5**.**
The formulas of Theorem 6.1 and 6.3 can be specialized to recover existing formulas for the Conditional Tail Expectation, the Value at Risk and the Entropic Risk Measure of symmetric distributions. More precisely we obtain from Theorem 6.3 that
[TABLE]
where the first using L’Hopital’s rule and the second limit is the stated expression by again using L’Hopital’s rule. This formula can e.g. be found in Landsman et al. (2016) Corollary 1. The Entropic Risk Measure can be obtained by
[TABLE]
and for the Value at Risk we finally get with Theorem 6.1 and using
[TABLE]
that
[TABLE]
Thus our general formulas comprises several important special cases.
6.1 Optimal Portfolio Selection with Tail Conditional Entropic Risk
Measure
The concept of optimal portfolio selection is dated back to Markowitz (1952) and de Finetti (1940), where the optimization of the mean-variance measure provides a portfolio selection rule that calculates the weights one should give to each investment of the portfolio in order to get the maximum return under a certain level of risk. In this Section, we examine the optimal portfolio selection with the TQLM measure for the multivariate elliptical models. The multivariate elliptical models of distributions are defined as follows:
Let be a random vector with values in whose probability density function is given by (see for instance Landsman & Valdez (2003))
[TABLE]
Here is the density generator of the distribution that satisfies the inequality
[TABLE]
where is the expectation of and is the positive definite scale matrix, where, if exists, the covariance matrix of is given by
[TABLE]
and we write For we get the class of symmetric distributions discussed in the previous section. For a large subset of the class of elliptical distributions, such as the normal, Student-t, logistic, and Laplace distributions, for and be some non-random vector, we have that This means that the linear transformation of an elliptical random vector is also elliptically distributed with the same generator reduced to one dimension. For instance, in the case of the normal distribution then
In modern portfolio theory, the portfolio return is denoted by where it is often assumed that is a normally distributed random vector of financial returns.
Theorem 6.6**.**
Let Then, the Tail Conditional Entropic Risk Measure of the portfolio return is given by
[TABLE]
Proof.
From the linear transformation property of the elliptical random vectors, and using Theorem 6.2, the theorem immediately follows. ∎
Using the same notations and definitions as in Landsman & Makov (2016), we define a column vector of ones, , and as a column vector of ones. Furthermore, we define the positive definite scale matrix with the following partition
[TABLE]
Here is an matrix, and is the component of and we also define a matrix
[TABLE]
which is also positive definite (see again Landsman & Makov (2016)). We also define the column vector
[TABLE]
where In what follows we consider the problem of finding the portfolio with the least for fixed and :
[TABLE]
The solution is given in the next theorem:
Theorem 6.7**.**
Let be a random vector of returns, and let be a portfolio return of investments Then, the optimal solution to (6.6) is
[TABLE]
if
[TABLE]
has a unique positive solution . Here
[TABLE]
[TABLE]
and
Proof.
We first observe by Theorem 6.6 that the minimization of is achieved when minimizing Then, using Theorem 3.1 in Landsman & Makov (2016) (see also Landsman et al. (2018)) the statement immediately follows. ∎
7 Discussion
The Tail Quasi-Linear Mean is a measure which focuses on the right tail of a risk distribution. In its general definition it comprises a number of well-known risk measures like Value at Risk, Conditional Tail Expectation and Entropic Risk Measure. Thus, once having results about the TQLM we are able to specialize them to other interesting cases. It is also in line with the actuarial concept of a Mean Value principle. Moreover, we have shown that it is indeed possible to apply the TQLM in risk management and that it yields computationally tractable results.
Acknowledgements: This research was supported by the Israel Science Foundation (Grant No. 1686/17 to T.S.)
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