Abstract
This paper studies the relationship between Kendall's tau and Pearson correlation coefficient under the so-called bivariate homogeneous shock (BHS) model. We find Capéraà-Genest-type inequality may not hold for general BHS model. Computational simulations suggest that the Denials' inequality is likely to be true.
1. Introduction
Pearson's correlation coefficient is the mostly used nonparametric measure of association for two random variables. Besides it, the Spearman's and Kendall's are two very useful measures of association. As we all know, the Spearman's is the ordinary Pearson's correlation coefficient.
The relationship between and has received considerable attention recently. For instance, Hutchinson and Lai [1] conjecture that for stochastically increasing random variables. Hürlimann [2] has shown that the entire Hutchinson and Lai conjecture holds for bivariate extreme value distributions. Munroe et al. [3] show that the Hutchinson and Lai conjecture, , does not hold when and are stochastically increasing. Fredricks and Nelsen [4] show that, under mild regularity conditions, the limit of the ratio is 3/2 as the joint distribution of the random variables approaches to independence. Capéraà and Genest [5] have shown that when one variable is simultaneously left-tail decreasing and the other right-tail increasing. Genest and Nešlehová [6] give a short analytical proof for classical Daniels' inequality , found by Daniels [7].
However, relatively little attention has been paid on the relationships between and . One example on this track is Edwardes [8], in which the author has shown that under a bivariate exponential (BVE) model introduced by Marshall and Olkin [9].
Based on a two-component series system subjected to some fatal shocks, Wang and Li [10] introduced a more general bivariate model, which is referred to as bivariate homogeneous shock (BHS) model. In this paper, we study the relationships between and under BHS model. We find that the most revealed relationships between and will no longer hold for the relationships between and . However, computational simulations suggest that the Daniels-type inequality, , is likely to be true.
2. Main Results
For any pair of random variables , let be its bivariate cumulative distribution function. The classical Pearson correlation coefficient of is defined as follows: and Kendall's is defined as follows:
Consider a two-component series system subjected to some fatal shocks. Assume there are three kinds of fatal shocks. Shock A governed by random variable destroys component 1, shock B governed by random variable destroys component 2, and shock C governed by random variable destroys both components simultaneously. We refer to such a system as bivariate homogeneous shock (BHS) model. Clearly, under this model the life length of component 1 is and that of component 2 is . Especially, if the random variables , , and are all exponential, the BHS model is just the BVE model proposed by Marshall and Olkin [9].
A prominent feature of BHS model is its singularity. More specifically, even though , , and all are continuous random variables, the joint distribution of and is usually discontinuous.
Denote the survival functions of , and as , , and , respectively. Wang and Li [10] have shown that under BHS model, where is defined as for any function with the maximization operator.
In the same manner as Chen et al. [11], we define a proportional hazard model as a submodel of BHS. We say a BHS model is a proportional hazards model if there exist some constants , , and , such that for some baseline survival function . Clearly, the BVE model is a proportional hazard model with .
We refer the constants , , and as to shape constants since they are determined by the structural representation of system. If an association measure depends only on the structural representation of system, we then say it is fully structure determined.
Under proportional hazard model, by (2.3), we can easily obtain Thus, the Kendall's is fully structure determined. The correlation coefficient , as we can verify, is not fully structure determined.
The exact expression of is not so easy to obtain in general, except for two special cases when , or , that is, when the baseline distribution is exponential or uniform. For our convenience, we refer to the first model as model A and the second one as model B. Clearly, model A is just the BVE model. Now we list the main results in the following theorem.
Theorem 2.1. Let and be the Pearson's correlation coefficient and Kendall's tau. Then under models A or B, one has the following.(i).(ii)The limit of the ratio of can be any number larger than 1 when the model approaches to independence situation.(iii).
Proof. The results of Theorem 2.1 in model A are just that of Edwardes [8]. So, we only need to focus on model B. Denote , and . When , we have, Thus, we obtain,
Denote
We want to show . Denote , , and . Then,
Clearly, we have, max. With a little bit notational confusion, we relabel , and as , , and , respectively. Then, we have, . Without loss of generality, we assume , and then,
As we can see, the equality holds only when , that is, . Hence, when the three parameters are not all zero, , and thus .
Consider
In a similar way, we can show that . We can show that can be any number that is larger than 1. Let , then, As , , which can be any number that is larger than 1.
Denote , then, Since is symmetric about and , the minimum or maximum of will be attained on . So we just need to show that the minimum or maximum of will be between and .
When , becomes where
We have,
Hence, will be between and .
3. Computational Simulations
In order to investigate the relationships between and under general BHS model, we conduct some computational simulations. For the sample data , the sample's is computed as follows: While the sample's Kendall's is computed as follows: where if , and if , and if , and if . We compute the sample values of , , , and under several cases. The sample size is set as , and for each computation, the iteration is 100. Table 1 gives the results.
In case 1, we set , , and as uniform variables on . By (2.6) and (2.9), we obtain, and , and the ratio . In case 2, the variables , , and all follow exponential distributions with means , and , respectively. In this case, , so the ratio is exactly 1. Based on the computation results for these two cases, we can see that the numerical computations are quite precise. In case 3, we set all variables to follow standard normal distribution. In case 4, we set , , and , where is the variable of standard normal. In case 5, we set , , and , where exp(1), exp(2), and exp(3). Surprisingly, in this case, the ratio is less than 1. In all the cases, we find the Daniels' inequality holds.
4. Concluding Remarks
The relationship between Spearman's , which is the ordinary Pearson correlation coefficient, and Kendall's has been of interest for a long time. However, little attention has been paid on the relationship of Pearson correlation coefficient and Kendall's . In this paper, we investigate their relationship under the so-called BHS model. We find that even though for some typical BHS models, the Capéraà-Genest type inequality, , holds, but for general BHS model, the inequality may not hold. Our simulation studies suggest that the Daniels-type inequality, , will hold under BHS model. We thus conjecture that the Daniels-type inequality will be valid in general. However, theoretical confirmation for such conjecture merits further study.