Weighted Distributions and Size-Biased Sampling with Applications to Wildlife Populations and Human Families

Patil, G. P.; Rao, C. R.

doi:10.2307/2530008

Cited by 457 publications

(258 citation statements)

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“…Especially the weibull distribution and its generalizations in the literature attract the most of the researchers due to its wide range applications. The Weibull distribution includes the exponential and the Rayleigh distributions as sub models, the usefulness and applications of parametric distributions including Weibull, Rayleigh are seen in various areas including reliability, renewal theory, and branching processes which can be seen in papers by many authors such as in { [16], [17], [25]}. Different generalizations of the Weibull distribution are common in the literature as in { [4], [5], [21], [22], [28], [38]} and another generalization of the weibull distribution using the concept of weighted distributions is available as in { [6], [8], [19], [24], [30], [34], [36], [37]}.…”

Section: Introductionmentioning

confidence: 99%

On Size-Biased Weighted Transmuted Weibull Distribution

Mobarak¹,

Nofal

Mahdy³

2017

IJARCSSE

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Abstract-This paper offers a new weighted distribution called size biased weighted transmuted weibull distribution, denoted by (SBWTWD). Various useful statistical properties of this distribution are derived in this paper such as, the cumulative distribution function, Reliability function, hazard rate, reversed hazard rate and the rth moment. Plots for the probability density function at different values of shape parameters are provided. The maximum likelihood estimators of the unknown parameters of the proposed distribution are obtained. One data set has been analyzed for illustrative purposes.Keywords-Weighted distributions, Transmuted distribution, Weibull distribution, Maximum likelihood method. I. INTRODUCTIONAdding an extra parameter to an existing family of distribution functions is very common in the statistical distribution theory. Often introducing an extra parameter brings more flexibility to a class of distribution functions and it can be very useful for data analysis purposes. Especially the weibull distribution and its generalizations in the literature attract the most of the researchers due to its wide range applications. The Weibull distribution includes the exponential and the Rayleigh distributions as sub models, the usefulness and applications of parametric distributions including Weibull, Rayleigh are seen in various areas including reliability, renewal theory, and branching processes which can be seen in papers by many authors such as in { The use and application of weighted distributions in research related to reliability, bio-medicine, ecology and several other areas are of tremendous practical importance in mathematics, probability and statistics. These distributions arise naturally as a result of observations generated from a stochastic process and recorded with some weight function. The concept of these distributions has been employed in wide variety applications in many fields of real life such as medicine, reliability, and survival analysis, analysis of family data, ecology and forestry. It can be traced to the work of Fisher [14] in connection with his studies on how method of ascertainment can influence the form of distribution of recorded observations. Azzalini [1] was first to introduce a shape parameter to a normal distribution depending on a weight function which is called the skew-normal distribution. Different works on introducing shape parameters for other symmetric distributions are available in the literature, several properties and their inference procedures are discussed by several authors see for example in { In this paper we construct the size biased weighted transmuted weibull distribution and the sub-models which are the special cases of our proposed distribution. Various useful statistical properties of this model are derived in the next sections. We also present a numerical example of the proposed distribution considering the real life data-set for illustrative purposes. This paper is organized as follows. Section 2 defines some basic materials and in Section 3, we ...

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Section: Introductionmentioning

confidence: 99%

On Size-Biased Weighted Transmuted Weibull Distribution

Mobarak¹,

Nofal

Mahdy³

2017

IJARCSSE

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“…Weighted distributions are employed mainly in research associated with reliability, bio-medicine, meta-analysis, econometrics, survival analysis, renewal processes, physics, ecology and branching processes which are found in Patil and Rao (1978), Gupta and Kirmani (1990), Gupta and Keating (1985), Oluyede (1999), Patil and Ord (1976) and Zelen and Feinleib (1969). A weighted form of Rayleigh distribution has been published by Reshi et al (2014).…”

Section: Introductionmentioning

confidence: 99%

“…Being first introduced by Rayleigh (1880), this statistical model was originally derived in connection with a problem in acoustics. More details on the Rayleigh distribution can be found in Johnson et al (1994) and references therein.The Rayleigh distribution has the following probability density function (pdf) and the cumulative distribution function (cdf), respectively,Weighted distributions are employed mainly in research associated with reliability, bio-medicine, meta-analysis, econometrics, survival analysis, renewal processes, physics, ecology and branching processes which are found in Patil and Rao (1978), Gupta and Kirmani (1990), Gupta and Keating (1985), Oluyede (1999), Patil andOrd (1976) and Zelen and Feinleib (1969). A weighted form of Rayleigh distribution has been published by Reshi et al (2014).…”

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confidence: 99%

Vol. 16, No. 2 (Full Issue)

2017

J. Mod. App. Stat. Meth.

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EDITORIAL ASSISTANCEJMASM (ISSN 1538−9472, http://digitalcommons.wayne.edu/jmasm) is an independent, open access electronic journal, published biannually in May and November by JMASM Inc. (PO Box 48023, Oak Park, MI, 48237) in collaboration with the Wayne State University Library System. JMASM seeks to publish (1) new statistical tests or procedures, or the comparison of existing statistical tests or procedures, using computer-intensive Monte Carlo, bootstrap, jackknife, or resampling methods, (2) the study of nonparametric, robust, permutation, exact, and approximate randomization methods, and (3) applications of computer programming, preferably in Fortran (all other programming environments are welcome), related to statistical algorithms, pseudo-random number generators, simulation techniques, and self-contained executable code to carry out new or interesting statistical methods.Journal correspondence (other than manuscript submissions) and requests for advertising may be forwarded to ea@jmasm.com. See back matter for instructions for authors. IntroductionComputer simulation studies represent an important tool for investigating statistical procedures difficult or impossible to study using mathematical theory or real data. Descriptors of these studies vary (e.g., statistical experiment, Monte Carlo simulation, computer experiment), but the examples of Hoaglin and Andrews (1975) and Hauck and Anderson (1984) are followed here with use of the term simulation studies. Extensive descriptions of simulation studies can be found in Lewis and Orav (1989) and Santner, Williams, and Notz (2003). In the behavioral sciences simulation studies have been used to study a wide array of statistical methods (e.g., Cribbie, Fiksenbaum, & Wilcox, 2012; Depaoli, 2012; Enders, Baraldi, & Cham, 2014; Hu & Bentler, 1999; Tomarken & Serlin, 1986). The general goal of these studies is to provide evidence of the behavior of statistical methods under a variety of data conditions that improves statistical practice and informs future statistical research. The goal here is to encourage methodological researchers to treat these studies as statistical sampling EXPERIMENTAL DESIGN AND DATA ANALYSIS IN SIMULATION 4 experiments subject to established principles of experimental design and data analysis.An underappreciated facet of simulation studies in statistics is their role in enhancing the reproducibility of scientific findings. The importance of reproducibility has gained momentum in numerous scientific arenas because of growing evidence that many findings cannot be replicated (Stodden, 2015). Concerns over reproducibility and the role of statistics were captured in Statistics and science: A report of the London workshop on the future of the statistical sciences (2014) which noted: "The reproducibility problem goes far beyond statistics, of course, because it involves the entire reward structure of the scientific enterprise. Nevertheless, statistics is a very important ingredient in both the problem and the remedy." (p. 27) Simulati...

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“…Recently, Bergeron et al [3], Shen et al [4], Qin and Shen [5] and Ning et al [6] studied analysis of covariates under biased sampling. Studies on lengthbiased sampling can be traced as far back as Wicksell [7], Fisher [8], Neyman [9], Cox and Lewis [1], Zelen and Feinlein [2] and Patil and Rao [10]. An updated review of the subject can be found in Asgharian et al [11].…”

Section: Introductionmentioning

confidence: 99%

Double Bias: Estimation of Causal Effects from Length-Biased Samples in the Presence of Confounding

Ertefaie

Asgharian

Stephens

2015

The International Journal of Biostatistics

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Length bias in survival data occurs in observational studies when, for example, subjects with shorter lifetimes are less likely to be present in the recorded data. In this paper, we consider estimating the causal exposure (treatment) effect on survival time from observational data when, in addition to the lack of randomization and consequent potential for confounding, the data constitute a length-biased sample; we hence term this a double-bias problem. We develop estimating equations that can be used to estimate the causal effect indexing the structural Cox proportional hazard and accelerated failure time models for point exposures in double-bias settings. The approaches rely on propensity score-based adjustments, and we demonstrate that estimation of the propensity score must be adjusted to acknowledge the length-biased sampling. Large sample properties of the estimators are established and their small sample behavior is studied using simulations. We apply the proposed methods to a set of, partly synthesized, length-biased survival data collected as part of the Canadian Study of Health and Aging (CSHA) to compare survival of subjects with dementia among institutionalized patients versus those recruited from the community and depict their adjusted survival curves.

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Weighted Distributions and Size-Biased Sampling with Applications to Wildlife Populations and Human Families

Cited by 457 publications

References 5 publications

On Size-Biased Weighted Transmuted Weibull Distribution

On Size-Biased Weighted Transmuted Weibull Distribution

Vol. 16, No. 2 (Full Issue)

Double Bias: Estimation of Causal Effects from Length-Biased Samples in the Presence of Confounding

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