8,712 research outputs found
Generalized Logistic Models and its orthant tail dependence
The Multivariate Extreme Value distributions have shown their usefulness in
environmental studies, financial and insurance mathematics. The Logistic or
Gumbel-Hougaard distribution is one of the oldest multivariate extreme value
models and it has been extended to asymmetric models. In this paper we
introduce generalized logistic multivariate distributions. Our tools are
mixtures of copulas and stable mixing variables, extending approaches in Tawn
(1990), Joe and Hu (1996) and Foug\`eres et al. (2009). The parametric family
of multivariate extreme value distributions considered presents a flexible
dependence structure and we compute for it the multivariate tail dependence
coefficients considered in Li (2009)
Distributions for one-lepton SUSY Searches with the ATLAS Detector
Using ATLAS data corresponding to 70 +- 8 nb^-1 of integrated luminosity from
the 7 TeV proton-proton collisions at the LHC, distributions of relevant
supersymmetry-sensitive variables are shown for the final state containing
jets, missing transverse momentum and one isolated electron or muon. With
increased integrated luminosities, selections based on these distributions will
be used in the search for supersymmetric particles: it is thus important to
show that the Standard Model backgrounds to these searches are under good
control.Comment: 3 pages, to appear in the Proceedings of the Hadron Collider Physics
Symposium 2010, Toronto, Ontario, Canada, 23 - 27 Aug 2010, available on the
CERN document server under the number ATL-PHYS-PROC-2010-07
Rank-based inference for bivariate extreme-value copulas
Consider a continuous random pair whose dependence is characterized
by an extreme-value copula with Pickands dependence function . When the
marginal distributions of and are known, several consistent estimators
of are available. Most of them are variants of the estimators due to
Pickands [Bull. Inst. Internat. Statist. 49 (1981) 859--878] and
Cap\'{e}ra\`{a}, Foug\`{e}res and Genest [Biometrika 84 (1997) 567--577]. In
this paper, rank-based versions of these estimators are proposed for the more
common case where the margins of and are unknown. Results on the limit
behavior of a class of weighted bivariate empirical processes are used to show
the consistency and asymptotic normality of these rank-based estimators. Their
finite- and large-sample performance is then compared to that of their
known-margin analogues, as well as with endpoint-corrected versions thereof.
Explicit formulas and consistent estimates for their asymptotic variances are
also given.Comment: Published in at http://dx.doi.org/10.1214/08-AOS672 the Annals of
Statistics (http://www.imstat.org/aos/) by the Institute of Mathematical
Statistics (http://www.imstat.org
A Conversation with Martin Bradbury Wilk
Martin Bradbury Wilk was born on December 18, 1922, in Montr\'{e}al,
Qu\'{e}bec, Canada. He completed a B.Eng. degree in Chemical Engineering in
1945 at McGill University and worked as a Research Engineer on the Atomic
Energy Project for the National Research Council of Canada from 1945 to 1950.
He then went to Iowa State College, where he completed a M.Sc. and a Ph.D.
degree in Statistics in 1953 and 1955, respectively. After a one-year post-doc
with John Tukey, he became Assistant Director of the Statistical Techniques
Research Group at Princeton University in 1956--1957, and then served as
Professor and Director of Research in Statistics at Rutgers University from
1959 to 1963. In parallel, he also had a 14-year career at Bell Laboratories,
Murray Hill, New Jersey. From 1956 to 1969, he was in turn Member of Technical
Staff, Head of the Statistical Models and Methods Research Department, and
Statistical Director in Management Sciences Research. He wrote a number of
influential papers in statistical methodology during that period, notably
testing procedures for normality (the Shapiro--Wilk statistic) and probability
plotting techniques for multivariate data. In 1970, Martin moved into higher
management levels of the American Telephone and Telegraph (AT&T) Company. He
occupied various positions culminating as Assistant Vice-President and Director
of Corporate Planning. In 1980, he returned to Canada and became the first
professional statistician to serve as Chief Statistician. His accomplishments
at Statistics Canada were numerous and contributed to a resurgence of the
institution's international standing. He played a crucial role in the
reinstatement of the Cabinet-cancelled 1986 Census.Comment: Published in at http://dx.doi.org/10.1214/08-STS272 the Statistical
Science (http://www.imstat.org/sts/) by the Institute of Mathematical
Statistics (http://www.imstat.org
On the covariance of the asymptotic empirical copula process
Conditions are given under which the empirical copula process associated with
a random sample from a bivariate continuous distribution has a smaller
asymptotic covariance function than the standard empirical process based on
observations from the copula. Illustrations are provided and consequences for
inference are outlined.Comment: 14 pages, 2 figure
Maty's Biography of Abraham De Moivre, Translated, Annotated and Augmented
November 27, 2004, marked the 250th anniversary of the death of Abraham De
Moivre, best known in statistical circles for his famous large-sample
approximation to the binomial distribution, whose generalization is now
referred to as the Central Limit Theorem. De Moivre was one of the great
pioneers of classical probability theory. He also made seminal contributions in
analytic geometry, complex analysis and the theory of annuities. The first
biography of De Moivre, on which almost all subsequent ones have since relied,
was written in French by Matthew Maty. It was published in 1755 in the Journal
britannique. The authors provide here, for the first time, a complete
translation into English of Maty's biography of De Moivre. New material, much
of it taken from modern sources, is given in footnotes, along with numerous
annotations designed to provide additional clarity to Maty's biography for
contemporary readers.Comment: Published at http://dx.doi.org/10.1214/088342306000000268 in the
Statistical Science (http://www.imstat.org/sts/) by the Institute of
Mathematical Statistics (http://www.imstat.org
The multivariate Hahn polynomials and the singular oscillator
Karlin and McGregor's d-variable Hahn polynomials are shown to arise in the
(d+1)-dimensional singular oscillator model as the overlap coefficients between
bases associated to the separation of variables in Cartesian and hyperspherical
coordinates. These polynomials in d discrete variables depend on d+1 real
parameters and are orthogonal with respect to the multidimensional
hypergeometric distribution. The focus is put on the d=2 case for which the
connection with the three-dimensional singular oscillator is used to derive the
main properties of the polynomials: forward/backward shift operators,
orthogonality relation, generating function, recurrence relations,
bispectrality (difference equations) and explicit expression in terms of the
univariate Hahn polynomials. The extension of these results to an arbitrary
number of variables is presented at the end of the paper.Comment: 34 p
Goodness-of-fit Tests For Elliptical And Independent Copulas Through Projection Pursuit
Two goodness-of-fit tests for copulas are being investigated. The first one
deals with the case of elliptical copulas and the second one deals with
independent copulas. These tests result from the expansion of the projection
pursuit methodology we will introduce in the present article. This method
enables us to determine on which axis system these copulas lie as well as the
exact value of these very copulas in the basis formed by the axes previously
determined irrespective of their value in their canonical basis. Simulations
are also presented as well as an application to real datasets.Comment: 31 page
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