3,361 research outputs found
The conical K\"ahler-Ricci flow on Fano manifolds
In this paper, we study the long-term behavior of the conical K\"ahler-Ricci
flow on Fano manifold . First, based on our work of locally uniform
regularity for the twisted K\"ahler-Ricci flows, we obtain a long-time solution
to the conical K\"ahler-Ricci flow by limiting a sequence of these twisted
flows. Second, we study the uniform Perelman's estimates of the twisted
K\"ahler-Ricci flows. After that, we prove that the conical K\"ahler-Ricci flow
must converge to a conical K\"ahler-Einstein metric if there exists one.Comment: 46 page
Model Assessment Tools for a Model False World
A standard goal of model evaluation and selection is to find a model that
approximates the truth well while at the same time is as parsimonious as
possible. In this paper we emphasize the point of view that the models under
consideration are almost always false, if viewed realistically, and so we
should analyze model adequacy from that point of view. We investigate this
issue in large samples by looking at a model credibility index, which is
designed to serve as a one-number summary measure of model adequacy. We define
the index to be the maximum sample size at which samples from the model and
those from the true data generating mechanism are nearly indistinguishable. We
use standard notions from hypothesis testing to make this definition precise.
We use data subsampling to estimate the index. We show that the definition
leads us to some new ways of viewing models as flawed but useful. The concept
is an extension of the work of Davies [Statist. Neerlandica 49 (1995)
185--245].Comment: Published in at http://dx.doi.org/10.1214/09-STS302 the Statistical
Science (http://www.imstat.org/sts/) by the Institute of Mathematical
Statistics (http://www.imstat.org
Building and using semiparametric tolerance regions for parametric multinomial models
We introduce a semiparametric ``tubular neighborhood'' of a parametric model
in the multinomial setting. It consists of all multinomial distributions lying
in a distance-based neighborhood of the parametric model of interest. Fitting
such a tubular model allows one to use a parametric model while treating it as
an approximation to the true distribution. In this paper, the Kullback--Leibler
distance is used to build the tubular region. Based on this idea one can define
the distance between the true multinomial distribution and the parametric model
to be the index of fit. The paper develops a likelihood ratio test procedure
for testing the magnitude of the index. A semiparametric bootstrap method is
implemented to better approximate the distribution of the LRT statistic. The
approximation permits more accurate construction of a lower confidence limit
for the model fitting index.Comment: Published in at http://dx.doi.org/10.1214/08-AOS603 the Annals of
Statistics (http://www.imstat.org/aos/) by the Institute of Mathematical
Statistics (http://www.imstat.org
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