We prove new extensions to lemmas about combinations of convergent sequences of distribution functions and absolutely continuous bounded functions. New lemma one, a generalized Helly theorem, allows computing the limit of the expected value of a sequence of functions with respect to a sequence of measures. Previously published results allow either the function or the measure to be a sequence, but not both. Lemma two allows computing the expected value of an absolutely continuous monotone function by integrating the probabilities of the inverse function values. Previous results were restricted to the identity function. Lemma three gives a computationally and analytically convenient form for the limit of the expected value of a sequence of functions of a sequence of random variables. This is a new result that follows directly from the first two lemmas. Although the lemmas resemble standard results and seem obviously true, we have found only similar looking and related but quite distinct results in the literature. We provide examples which highlight the value of the new results

Glueck, Deborah H.

Muller, Keith E.

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On the Expected Values of Sequences of FunctionsDeborah H. Glueck1 and Keith E. Muller21Dept. of Prev. Med. and Biometrics, University of Colorado HSC, Campus Box B119, 4200 EastNinth Avenue, Denver, CO 802622Dept. of Biostatistics, University of North Carolina, Chapel Hill, NC 27599-7400AbstractWe prove new extensions to lemmas about combinations of convergent sequences of distributionfunctions and absolutely continuous bounded functions. New lemma one, a generalized Hellytheorem, allows computing the limit of the expected value of a sequence of functions with respectto a sequence of measures. Previously published results allow either the function or the measure tobe a sequence, but not both. Lemma two allows computing the expected value of an absolutelycontinuous monotone function by integrating the probabilities of the inverse function values.Previous results were restricted to the identity function. Lemma three gives a computationally andanalytically convenient form for the limit of the expected value of a sequence of functions of asequence of random variables. This is a new result that follows directly from the first two lemmas.Although the lemmas resemble standard results and seem obviously true, we have found onlysimilar looking and related but quite distinct results in the literature. We provide examples whichhighlight the value of the new results.KeywordsAbsolutely continuous; Inversion; Integrals1. IntroductionComputing expectations, both analytically and numerically, remains one of the centralproblems in statistics. We present three new lemmas which aid both analytic and numericalcalculation for some applications in small and large samples.In particular, the first lemma allows calculation of the limits of expectations, when both thefunction and the random variable are converging to limits. The second lemma suggestsnatural transformations for the computation of expectations, a common statistical task. Wesuggest transformations based on probability distribution functions and their inverses. Therequired numerical functions are widely available in common statistical programminglanguages. The choice automatically simplifies numerical computation of expectations byleading to evaluating bounded functions on bounded regions. Although a transformation is astandard numerical technique, the use of probability functions eliminates the guess workinvolved in choosing the transformation, and provides an ideal match between statisticalthinking and ease of computation. The third lemma combines the results and allows one tocalculate an expectation when both the function and the random variable are converging to alimit.The need for the results presented here arose from a desire to derive computable expressionsfor the power of certain hypothesis tests in multivariate regression with both fixed andrandom predictors. We provide examples of how we used the lemmas to numericallycalculate small sample expectations, and to correctly find limiting results.NIH Public AccessAuthor ManuscriptCommun Stat Theory Methods. Author manuscript; available in PMC 2013 December 16.Published in final edited form as:Commun Stat Theory Methods. 2001 January 1; 30(2): . doi:10.1081/STA-100002037.NIH-PA Author ManuscriptNIH-PA Author ManuscriptNIH-PA Author ManuscriptCalculating the expected value of variables and functions can be difficult, especially in thelimit. Often either the function of integration, or the limits, or both, are unbounded. Inattempting to derive large sample properties, a sequence of cumulative distribution functions(CDF's) may converge to a point mass, while their support converges to a set of measurezero. The Riemann integral fails under these conditions. Thus the lemmas that follow mustbe stated in terms of Lebesgue integrals computed with respect to probability measures.Although the lemmas resemble standard results and seem obviously true, we have foundonly similar looking and related but quite distinct results in the literature. All depend onvarious restrictive regularity conditions that often arise in practice. For example, for asequence of cumulative distribution functions, {Fn}, Serfling (1, p16) proved that if Fn ⇒ Fthen for any bounded continuous function g,(1)Pratt (2, p74) and Loeve (3, pl26) gave results similar to Equation 1. We give a more generalresult in which both the integrand and the measure are converging. Gibbons and Chakraborti(4, p37-38) mentioned a quantile transform result, without proof. They define the quantilefunction using the infimum. Our Corollary 3 is a special case of their result. We illustrate thevalue of the new results with three examples concerning power of certain multivariate tests.2. Three LemmasLemma 1Consider a random variable, X, and a sequence of random variables, {X1, X2, …}, withcorresponding CDFs F, and {F1, F2, …}. Suppose Fn converges to F, and thus Xn convergesin distribution to X. Let {g1(x), g2(x), …} be a set of continuous bounded functions suchthat gn(x) converge uniformly to g(x), a continuous bounded function. Assume that ∀n ∫ gndFn < ∞ and ∫ g dF < ∞. Taking the integrals with respect to the Lebesgue-Stieltjesprobability measures induced by F and {F1, F2, …} (5, p69),(2)The special case of ∫ gd Fn corresponds to a Helly theorem, (5, p192–194). Also, the resultsof exercise 9-2 in Burrill (5, p195) indicate that less stringent regularity conditions would behard to find for the special case of ∫ gnd F.Proof. It suffices to show that ∀∊ > 0, ∃ M(∊) > 0 such that for n > M(∊),(3)By assumption, gn(x) converges uniformly to g(x). Thus, ∀∊ > 0, there exists acorresponding number M1(∊) > 0 such that for all n > M1 and for all x in the domain of g, |gn(x) − g(x)| < ∊/2 (6, p530). Thus, for n > M1(∊),(4)Glueck and Muller Page 2Commun Stat Theory Methods. Author manuscript; available in PMC 2013 December 16.NIH-PA Author ManuscriptNIH-PA Author ManuscriptNIH-PA Author ManuscriptThe last step follows because Fn is a cumulative probability distribution function, and hence∀n, ∫ d Fn = 1. By part 3 of a theorem in Serfling (1, p16), ∀ ∊ > 0, we may conclude that ∃M2(∊) > 0 such that for n > M2(∊),(5)Now, ∀∊ > 0 and ∀x in the domain of g, choose n > max[M1(∊), M2(∊)]. Then(6)with the inequality following from the triangle inequality.Lemma 2(Corollary to Lemma 2.1, 7, p243) Let X be a continuous random variable with density fx(x)and distribution function FX(x). Let g(x) be a real valued absolutely continuous function thatis strictly monotone decreasing in x, so that g(x) > y iff x < g−1(y). Let(7)Proof. Note that(8)The result follows.Corollary 2.1—With the same conditions as in Lemma 1, and for b > a > 0, suppose ∀x ∈ℛ, g(x) ∈ [a, b]. Then(9)Corollary 2.2—With the same conditions as in Lemma 1, consider instead h(x), a realvalued absolutely continuous function that is strictly monotone increasing in x, so that h(x)> y iff x > h−1(y). ThenGlueck and Muller Page 3Commun Stat Theory Methods. Author manuscript; available in PMC 2013 December 16.NIH-PA Author ManuscriptNIH-PA Author ManuscriptNIH-PA Author Manuscript(10)Lemma 3Consider the continuous random variable, X, and the sequence of continuous randomvariables, {X1, X2, …}, with the same assumptions as Lemma 1.Let g(x)and the set {g1(x),g2(x), …} be real valued absolutely continuous bounded functions that are strictly monotonedecreasing in x, so that gn(x) > y iff . Suppose the sequence {g1(x), g2(x), …}converges uniformly to g(x). Assume that ∫ g dF < ∞ and ∀n, ∫ gn dFn < ∞. For b > a > 0,suppose ∀x ∈ ℛ, g(x) ∈ [a, b]. Then(11)Proof. Follows directly from Lemma 1 and Lemma 2.Corollary 3—(Quantile transformation: see 4, §2.5, p37–38) Consider a real valuedrandom variable X with strictly monotone distribution function Fx(x) and density functionfx(x), defined on the interval (a, b), with −∞ < a < b < ∞. Let y = Fx(x). Then(12)When resorting to numerical techniques for calculating expectations, either the density orthe region of integration, or both, may be infinite. This transformation reduces the problemto an integral of a bounded function over a bounded interval.3. ExamplesExample for Lemma 1Glueck (8) considered taking the limit, under a sequence of Pitman local alternatives, of anapproximation for the power of the Hotelling-Lawley trace statistic, with Gaussianpredictors. The asymptotic power can be written as the expected value of a non-central F,with respect to the distribution of a random noncentrality value. In this setting, the Riemannintegral is undefined because the support for the random noncentrality parameter convergesto set of measure zero as the parameter converges to a point. Let F(ν1, ν2N, ωN) indicate anoncentral F random variable, with denominator degrees of freedom and noncentralitydepending on N. Suppose(13)Consider integrating gN with respect to Fn, the distribution function of a sum of independentscaled χ2 random variables for which the scaling constants depend on ωN, and the degrees offreedom depend on N. With α the type 1 error rate, ccrit chosen so that Fχ2(ccrit; ab) = 1 − α,and limN→∞, ω = ωL,(14)Glueck and Muller Page 4Commun Stat Theory Methods. Author manuscript; available in PMC 2013 December 16.NIH-PA Author ManuscriptNIH-PA Author ManuscriptNIH-PA Author ManuscriptExample for Corollary 2.1Glueck (8) sought a computational form for the small sample power of the Hotelling-Lawleytrace statistic, with Gaussian predictors. Suppose Fω(w) is the distribution function of ω, asum of independent scaled χ2 random variables. Define(15)with ω ∈ [0, ∞] and f chosen so that g(ω) ∈ [0, 1 − α]. Then(16)Example for Corollary 3Muller and Pasour (9) defined(17)and considered integrating(18)They used a particular quantile transformation to produce a much better behaved numericalintegral. If p = Fχ2(t; ν2s), then  (p; ν2s) and dp = fχ2(t; ν2s)dt. If p0 = Fχ2(zν2s/σ2; ν2s)then(19)AcknowledgmentsThe authors gratefully acknowledge the help of Drs. G. G. Koch, R. M. Hamer, L. M. LaVange, D. F. Ransohoffand P. W. Stewart. In addition, an anonymous Associate Editor stimulated us to clarify the motivation of the paper,provide more compelling examples, and improve the readability of the paper. Also, an anonymous Associate Editorbrought the work of Gibbons and Chakraborti to our attention. Glueck was supported in part by grant numberT32HS000589-04 from the Agency for Health Care Policy and Research to the University of Medicine andDentistry of New Jersey, and by National Cancer Institute Grant IP30CA46934-01 to the University of Colorado.Muller's work supported in part by NCI program project grant P01 CA47 982-04.References1. Serfling, RJ. Approximation Theorems of Mathematical Statistics. John Wiley and Sons; New York:1980.2. Pratt JW. On interchanging limits and integrals. Annals of Mathematical Statistics. 1960; 31:74–77.3. Loève, M. Probability Theory II. 4th. Springer-Verlag; New York: 1977.4. Gibbons, JD.; Chakraborti, S. Nonparametric Statistical Inference. 3rd. Marcel Dekker; New York:1992.5. Burrill, CW. Measure, Integration and Probability. McGraw-Hill; New York: 1972.Glueck and Muller Page 5Commun Stat Theory Methods. Author manuscript; available in PMC 2013 December 16.NIH-PA Author ManuscriptNIH-PA Author ManuscriptNIH-PA Author Manuscript6. Courant, R.; John, F. Introduction to Calculus and Analysis, Volume One. Interscience Publishers;New York: 1965.7. Ross, S. A First Course in Probability. 2nd. Macmillan; New York: 1984.8. Glueck, DH. Power for a Generalization of the General Linear Multivariate Model with Fixed andRandom Predictors, Mimeo Series No 2158T. Institute of Statistics; Chapel Hill, North Carolina:1996.9. Muller KE, Pasour VB. Bias in linear model power and sample size due to estimating variance.Communications in Statistics: Theory and Methods. 1997; 26:839–851.Glueck and Muller Page 6Commun Stat Theory Methods. Author manuscript; available in PMC 2013 December 16.NIH-PA Author ManuscriptNIH-PA Author ManuscriptNIH-PA Author Manuscript

ON THE EXPECTED VALUES OF SEQUENCES OF FUNCTIONS

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ON THE EXPECTED VALUES OF SEQUENCES OF FUNCTIONS

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