30,153 research outputs found
On Uniqueness And Existence of Conformally Compact Einstein Metrics with Homogeneous Conformal Infinity
In this paper we show that for a generalized Berger metric on
close to the round metric, the conformally compact Einstein (CCE) manifold with as its conformal infinity is unique up to
isometries. For the high-dimensional case, we show that if is an
-invariant metric on for , the
non-positively curved CCE metric on the -ball with as its conformal infinity is unique up to isometries. In
particular, since in \cite{LiQingShi}, we proved that if the Yamabe constant of
the conformal infinity is close to that of the round
sphere then any CCE manifold filled in must be negatively curved and simply
connected, therefore if is an -invariant metric on
which is close to the round metric, the CCE metric filled in is
unique up to isometries. Using the continuity method, we prove an existence
result of the non-positively curved CCE metric with prescribed conformal
infinity when the metric is
-invariant.Comment: Comments are welcome
QBDT, a new boosting decision tree method with systematic uncertainties into training for High Energy Physics
A new boosting decision tree (BDT) method, QBDT, is proposed for the
classification problem in the field of high energy physics (HEP). In many HEP
researches, great efforts are made to increase the signal significance with the
presence of huge background and various systematical uncertainties. Why not
develop a BDT method targeting the significance directly? Indeed, the
significance plays a central role in this new method. It is used to split a
node in building a tree and to be also the weight contributing to the BDT
score. As the systematical uncertainties can be easily included in the
significance calculation, this method is able to learn about reducing the
effect of the systematical uncertainties via training. Taking the search of the
rare radiative Higgs decay in proton-proton collisions as example, QBDT and the popular Gradient BDT (GradBDT)
method are compared. QBDT is found to reduce the correlation between the signal
strength and systematical uncertainty sources and thus to give a better
significance. The contribution to the signal strength uncertainty from the
systematical uncertainty sources using the new method is 50-85~\% of that using
the GradBDT method.Comment: 29 pages, accepted for publication in NIMA, algorithm available at
https://github.com/xialigang/QBD
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