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Guoming Liu

Researcher at Chinese Academy of Sciences

Publications -  579
Citations -  26417

Guoming Liu is an academic researcher from Chinese Academy of Sciences. The author has contributed to research in topics: Branching fraction & Crystallization. The author has an hindex of 77, co-authored 539 publications receiving 23261 citations. Previous affiliations of Guoming Liu include University of Cambridge & Shandong University of Science and Technology.

Papers
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Test of lepton universality using b^{+}k^{+}ℓ^{+}ℓ^{-} decays

Roel Aaij, +701 more
- 06 Oct 2014 - 
TL;DR: The value of the ratio of branching fractions for the dilepton invariant mass squared range 1 < q(2) < 6 GeV(2)/c(4) is measured to be 0.745(-0.074)(+0.090)(stat) ± 0.036(syst).
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Measurement of form-factor-independent observables in the decay B0→K*0μ+μ-

Roel Aaij, +656 more
- 04 Nov 2013 - 
TL;DR: A measurement of form-factor-independent angular observables in the decay B(0)→K*(892)(0)μ(+)μ(-) is presented, based on a data sample collected by the LHCb experiment in pp collisions at a center-of-mass energy of 7 TeV.
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The LHCb Trigger and its Performance in 2011

Roel Aaij, +79 more
- 13 Nov 2012 - 
TL;DR: The LHCb trigger as mentioned in this paper selects particles originating from charm and beauty hadrons, which typically fly a finite distance before decaying, using a combination of lepton identification and measurements of the particles' transverse momenta.
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The LHCb trigger and its performance in 2011

Roel Aaij, +85 more
- 22 Apr 2013 - 
TL;DR: The LHCb trigger and its performance based on data taken at the LHC in 2011 is presented in this article, where a combination of lepton identification of particles, transverse momentum of particles and selects particles originating from hadrons which decay after a finite flight distance.
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Differential branching fractions and isospin asymmetries of B -> K ((*)) μ(+) μ(-) decays

Roel Aaij, +713 more
- 23 Jun 2014 - 
TL;DR: In this article, the authors measured the isospin asymmetries of the B (0) -> K ( 0) mu (+) mu (-), B (1) → K (1)-m (+) m mu (-) and B (2)→ K (2)-m (-) m (-), respectively.