2018
DOI: 10.1111/ectj.12095
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Non‐parametric inference on (conditional) quantile differences and interquantile ranges, using L‐statistics

Abstract: We provide novel, high-order accurate methods for non-parametric inference on quantile differences between two populations in both unconditional and conditional settings. These quantile differences correspond to (conditional) quantile treatment effects under (conditional) independence of a binary treatment and potential outcomes. Our methods use the probability integral transform and a Dirichlet (rather than Gaussian) reference distribution to pick appropriate L-statistics as confidence interval endpoints, ach… Show more

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Cited by 9 publications
(8 citation statements)
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References 35 publications
(52 reference statements)
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“…The theoretical results we develop contribute to the fractional order statistic literature and provide the basis for inference on other objects of interest explored in Goldman and Kaplan (2016b) and Kaplan (2014). In particular, Theorem 2 tightly links the distributions of L-statistics from the observed and 'ideal' (unobserved) fractional order statistic processes.…”
Section: Introductionmentioning
confidence: 86%
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“…The theoretical results we develop contribute to the fractional order statistic literature and provide the basis for inference on other objects of interest explored in Goldman and Kaplan (2016b) and Kaplan (2014). In particular, Theorem 2 tightly links the distributions of L-statistics from the observed and 'ideal' (unobserved) fractional order statistic processes.…”
Section: Introductionmentioning
confidence: 86%
“…Hutson (1999) had proposed CIs for quantiles using L-statistics (interpolating between order statistics) as endpoints and found they performed well, but formal proofs were lacking. Using the analytic n −1 term we derive in the CPE, we provide a new calibration to achieve O n −3/2 [log(n)] 3 CPE, analogous to the Ho and Lee (2005a) analytic calibration of the CIs in Beran and Hall (1993).The theoretical results we develop contribute to the fractional order statistic literature and provide the basis for inference on other objects of interest explored in Goldman and Kaplan (2016b) and Kaplan (2014). In particular, Theorem 2 tightly links the distributions of L-statistics from the observed and 'ideal' (unobserved) fractional order statistic processes.Additionally, Lemma 7 provides Dirichlet PDF and PDF derivative approximations.High-order accuracy is important for small samples (e.g., for experiments) as well as nonparametric analysis with small local sample sizes.…”
mentioning
confidence: 82%
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“…Various other methods have been used to construct such confidence intervals including Kaplan (2015), who uses Edgeworth expansions, and Beran and Hall (1993), who also use L-statistics but with an interpolation weight based on the binomial distribution. Goldman and Kaplan (2018) extend the results of Goldman and Kaplan (2017) to interquartile ranges, among other things.…”
Section: Introductionsupporting
confidence: 66%
“…For example, the regression lines for some quantiles cross each other in some local regions, as also noted by Hao and Naiman ( 2007 ). To overcome this problem, Kuosmanen and Zhou ( 2021 ) include shape constraints, while Cai and Xiao ( 2012 ), Goldman and Kaplan ( 2018 ), and Yu and Jones ( 1998 ) propose use of a semiparametric or local linear model instead of simple linear regression. However, in this paper, we do not employ any of these complex approaches.…”
Section: Measuring the Inefficiency Of The I Th Production Unitmentioning
confidence: 99%