1. INTRODUCTION

Generalized order statistics (gos) was introduced by Kamps [1] as a unified model of ordered random variables arranged in increasing order of magnitude which contains almost all models related to ordered random variables such as order statistics, records, Pfeifer records, progressive type-II censored order statistics, and sequential order statistics. But those models of ordered random variables which are in decreasing order of magnitude cannot be studied in this framework. To resolve such types of problems, Pawlas and Szynal [2] proposed the concept of dual (lower) generalized order statistics (dgos) which contains several models of ordered random variables those are arranged in decreasing order of magnitude, like reversed order statistics, lower records, and lower Pfeifer records. Burkschat et al. [3] established the direct relationship between gos and dgos in such a way that if X(1,n,m˜,k),X(2,n,m˜,k),…,X(n,n,m˜,k) are n gos with cumulative distribution function (cdf) F0(.) and Xd(1,n,m˜,k),Xd(2,n,m˜,k),…,Xd(n,n,m˜,k) are n dgos with (cdf) F(.), then

where =d denotes the convergence in distribution.

Therefore, to avoid the complications in calculations, one can use dgos when F(.) is available in compact and closed form and when a closed and compact form of (1−F(.)) is available, gos can be preferred.

Let X1,X2,…,Xn be a sequence of independent and identically distributed (iid) random variables with absolutely continuous distribution function (df) F(x) and the probability density function (pdf) f(x), x∈(−∞,∞). Further, let n∈ℕ, n≥2, k≥1, m˜=(m1,m2,…,mn−1)∈ℝn−1, Mr=∑j=rn−1mj, such that γr=k+n−r+Mr>0 for all r∈{1,2,…,n−1}. Then Xd(r,n,m˜,k), r=1,2,…,n are said to be dgos if their joint pdf is given by

for F−1(1)>x1≥x2≥…≥xn>F−1(0).

Note that Xd(r,n,m˜,k) reduces to the (n−j+1)th order statistics from a sample of size n if γj=n−j+1 (i.e. m1=m2=…=mn−1=0 and k=1) and when m→−1,k=1, Xd(r,n,m˜,k) reduces to rth lower records.

Here, we shall consider two cases:

Case I: γi≠γj, i≠j i.e. γi's are pairwise different.

The pdf of rthdgosXd(r,n,m˜,k) is given by (Kamps [1])

And the joint pdf of Xd(r,n,m˜,k) and Xd(s,n,m˜,k) is:

Therefore, the conditional pdf of Xd(s,n,m˜,k) given Xd(r,n,m˜,k)=x, for 1≤r<s≤n is:

similarly, the conditional pdf of Xd(r,n,m˜,k)|X(s,n,m˜,k)=y, 1≤r<s≤n, is given by where and

It may be noted that for m1=…=mn−1=m≠−1, (Khan and Khan [4])

Case II: When m1=m2=…,mn−1=m:

The pdf of rthdgosXd(r,n,m,k) is given by

and the joint pdf of Xd(r,n,m,k) and Xd(s,n,m,k), (1≤r<s≤n) is where cr−1=∏i=1rγi, and gm′(x)=hm′(x)−hm′(1),x∈(0,1).

Further, the conditional pdf of Xd(s,n,m,k) given Xd(r,n,m,k)=x, 1≤r<s≤n is

And the conditional pdf of Xd(r,n,m,k) given Xd(s,n,m,k)=x, 1≤r<s≤n is

Here, the results are derived for case-I as it includes case-II as a particular case of it.

In the last two decades, several researchers have analyzed statistical properties of continuous distributions based on gos, dgos and hence a wide literature is available on the various developments on dgos and gos. Pawlas and Szynal [5] discussed the relation for single and product moments of gos from Pareto, generalized Pareto, and Burr distributions. Cramer et al. [6] proved the existence of moments of gos. Ahsanullah [7] characterized the uniform distribution based on dgos. Athar et al. [8] obtained the explicit expressions for ratio and inverse moments of gos from Weibull distribution. Explicit expressions for single and product moments of gos from linear exponential distribution have been derived by Ahmad [9]. Based on dgos, Khan et al. [10] established the recurrence relations for single and product moments of exponentiated Weibull distribution. Khan et al. [11] have characterized continuous distributions conditioned on a pair of nonadjacent dgos. Burkschat [12] has discussed the linear estimators and predictors from generalized Pareto distribution based on gos. Barakat and Adll [13] studied the asymptotic theory of extreme dgos. Athar and Faizan [14] deduced the explicit expression for moments of power function distribution based on dgos. Khan and Khan [4] obtained the ratio and inverse moments of gos from Burr distribution using hypergeometric functions. Domma and Hamdeni [15] discussed the truncated moments of dgos. Recurrence relations for moments of dgos from Weibull gamma distribution have been discussed by Mahmoud et al. [16]. Recurrence relation for single and product moments of dgos from a general class of distribution have been derived by Saran et al. [17]. Based on lower records, Khan and Arshad [18] have derived the uniformly minimum variance unbiased estimator(UMVUE) of reliability function and stress–strength reliability from proportional reversed hazard rate model. An exact and explicit expression of moments of Topp–Leone distribution based dgos have been deduced by Khan and Iqrar [19]. They have also derived the expressions for maximum likelihood estimator(MLE) and UMVUE for the parameter of Topp–Leone distribution based on dgos. Interval estimation for Topp–Leone generated family of distributions based on dgos have been considered by Arshad and Jamal [20]. Khatoon et al. [21] have considered the single, product, and conditional moments of gos as well as parameter estimation based on gos from Kumaraswamy power function distribution.

Kumaraswamy distribution was introduced by Kumaraswamy [21]. This distribution is applicable in many real-life situations and natural phenomenon that are restricted with lower and upper bounds. Over the last decades, there has been a great interest in studying the Kumaraswamy distribution among the researchers. Few of them are Nadarajah [22], Jones [23], Garg [24], Cordeiro and De-Castro [25], Mitnik [26], Safi and Ahmed [27], El-Deen et al. [28]. El-Deen et al. [28] studied the statistical inference for this distribution based on gos. Abd Al-Fattah et al. [29] introduced the inverted Kumaraswamy distribution as the inverted distributions have wide range of applications in real-life situations. Usman and Ahsan-ul-Haque [30], Reyad et al. [31] have studied the generalization form of inverted Kumaraswamy distribution.

The pdf of inverted Kumaraswamy distribution is given by

And its cdf is given by

This paper comprises of 5 sections. In Section 2, the results for single, product, and conditional moments of inverted Kumaraswamy distribution based on dgos have been derived. Section 3 included the theoretical setup and expressions for the MLE of both parameters of inverted Kumaraswamy distribution based on dgos. In Section 4, we have deduced the UMVUE of one shape parameter of inverted Kumaraswamy distribution by assuming that the other shape parameter is known. Finally, a simulation study is being carried out to check the validity and applicability of the derived estimators based on order statistics and lower records which is given in Section 5.

2. MOMENTS OF dgos

In this section, we have derived the exact and explicit expressions for single, product, and conditional moments of inverted Kumaraswamy distribution based on dgos. Further, by putting the specific values of the parameters m and k, we have deduced single moment, product moment, and conditional moments of order statistics and lower records from inverted Kumaraswamy distribution Table 1-6.