Event shape distributions at LEP Marek Taevsk Physics
Event shape distributions at LEP Marek Taševský (Physics Institute Prague) for all LEP collaborations 21 April 2006 KEK-Tsukuba, Japan
Outline - Data samples and Event selection - Definitions & Properties of Event shape observables - Event shape observables at LEP 1 and LEP 2 energies The LEP alpha. S measurement itself covered by T. Wengler ALEPH: EPJC 35 (2004) 457 DELPHI: EPJC 37 (2004) 1 L 3: Phys. Rep. 399 (2004) 71 OPAL: EPJC 40 (2005) 287, PN 519 (Preliminary)
Data samples and Event selection Typical numbers (ALEPH, 1994 -2000) Ecm Lumi Nev [Ge. V] [pb-1] Main background: ISR for √s > 91 Ge. V - reduced by requiring - √s, < 10 Ge. V WW, ZZ->4 fermions for √s > 2 m. W (2 m. Z) BG [%] 91 41 > 106 <1 133 12 806 <1 161 11 319 5 172 10 257 10 183 57 1319 12 189 174 3578 13 200 206 208 216 3528 3590 15 15
Correction procedure 1. Select hadronic event candidates 2. Construct distributions from tracks and clusters (avoid double counting) 3. Subtract bin-by-bin residual 4 fbg using grc 4 f and KORALW 4. Correct data bin-by-bin for effects of detector acceptance, resolutions and residual ISR using MC models. Justified by a good description of data and correlation between hadron and det. levels
Properties of event shape observables To make exper. tests of pert. QCD and to measure alpha. S, we define physical observables that are sensitive to the HE pert. process but little sensitive to subsequent non-pert. hadronisation and decays. INCLUSIVE: - characterize geometry of event (2 -jet or pencil-like, 3 -jet or planar, 4+ -jet or spherical) - non-identified particles - only p and E needed to know p. QCD ME diverge for process involving soft or collinear gluon emission Hence p. QCD applicable only for quantities that are INFRA-RED SAFE: – not affected by soft gluon emission COLLINEAR SAFE: - not affected by replacing a parton by collinear partons with the same total 4 -momentum
Properties of event shape observables 3 -jet observables: sensitive to non-collinear emission of single hard gluon 4 -jet observables: vanish in 3 -jet limit All quantities approach 0 in the 2 -jet limit. In experiment, pure 0 is never reached due to hadronisation. Measurement of alpha. S: Based on fits of p. QCD predictions to the corrected distributions of event shape observables. Standard set of observables is {1 -T, MH, C, BT, BW, y 23}. But let’s look at more of them. As theory predictions exist at parton level, they need to be corrected to hadron level by applying hadronisation corrections. For details about the alpha. S measurement, see talk by T. Wengler
Thrust axis n. T chosen to maximise the expression 1 -T=0: 2 -jet event 1 -T=1/2: spherical event
Thrust major axis n chosen to maximise the expression and to be orthogonal to n. T Tmaj = 0: 2 -jet event Tmaj =1/2: spherical event
Thrust minor Tmin =0: 2 -jet event Tmin =0: 3 -jet event Tmin =1/2: spherical event - 4 -jet observable
Oblateness O=0: 2 -jet and spherical event O=Tmaj for 3 -jet events
Sphericity Quadratic momentum tensor: has three eigenvalues ordered such that λ 1 < λ 2 < λ 3. Being quadratic in pα, β, Sαβ is not IR safe. Sphericity cannot be predicted reliably in p. QCD S=0: 2 -jet event S=1: spherical event
Aplanarity Sphericity tensor has three eigenvalues ordered such that λ 1 < λ 2 < λ 3. Being quadratic in pα, β, Sαβ is not IR safe. Aplanarity cannot be predicted reliably in p. QCD A=0: 2 -jet and 3 -jet event - 4 -jet observable
C- parameter Linearised momentum tensor -linear in pα, β => it is IR safe. -has three eigenvalues ordered such that λ 1 < λ 2 < λ 3. M has unit trace => λ 1 + λ 2 + λ 3 = 1. We can thus form two indep. combinat. : 2 nd Fox-Wolfram moment C low: planar event (one of λ=0) C=1: isotropic event (λ 1=λ 2=λ 3=1/3)
D- parameter Linearised momentum tensor -linear in pα, β => it is IR safe. -has three eigenvalues ordered such that λ 1 < λ 2 < λ 3. M has unit trace => λ 1 + λ 2 + λ 3 = 1. We can thus form two indep. combinat. : D=0: 2 -jet and 3 -jet event D=1: isotropic event (λ 1=λ 2=λ 3=1/3) - 4 -jet observable
Hemisphere observables So far, the variables have been constructed as global sums over all particles in the event. From now, let’s split the event into two hemispheres H 1 and H 2, divided by a plane orthogonal to the thrust axis. Invariant mass: Jet broadening:
Heavy jet mass - never zero due to finite masses of individual particles
Light jet mass ML=0: 2 -jet and 3 -jet events - 4 -jet observable - never zero due to finite masses of individual particles
Wide jet broadening BW=0: 2 -jet events to O(alpha. S): BW=BT=1/2 Tmaj=1/2 O Spherical event: BW=BN=π/16
Total jet broadening BT=0: 2 -jet events to O(alpha. S): BW=BT=1/2 Tmaj=1/2 O Spherical event: BT=π/8
Jets The aim of jet algorithms is to group particles together such that the directions and momenta of partons are reconstructed. The jet algos include at least one free resolution parameter and Njets depends on its chosen value. Durham (or k. T) algo defines “scaled transverse momentum” for every pair of particles: . The pair with the smallest yij is then replaced by a pseudoparticle with pij=pi+pj and Eij=Ei+Ej (E-recomb. scheme; two other exist: P-scheme: Eij=|pi+pj| and E 0 -scheme: |pij|=Ei+Ej). This is repeated until all pairs have yij>ycut (fixed value). Remaining pseudoparticles represent jets. [small ycut => many jets; large ycut->1. 0 => 1 jet]
y 23 – 2 to 3 jet transition Measure of how ‘ 3 -jetlike’ event is. Y 23 : the highest ycut value for which the event is resolved into 3 jets. Events with Njet≥ 3 have large y 23 values (max. y 23=1/3 for 3 identical jets 120° apart), while 2 -jet events at LEP have y 23 < 10 -3.
Event shapes in radiative hadronic events Measure event shape observables for a boosted qq system after final-state photon radiation. √s=91 Ge. V reduces to 20 -80 Ge. V. Bg from non-rad. events: 5% (√s=78 Ge. V) - 15% (√s=24 Ge. V) - alpha. S from radiative events measured by L 3 and OPAL – results consistent with that from non-rad. events
Moments Another way to study the event structure – through moments: Ymax is the max. kinematic. allowed value of observable Moments always sample all of available phase space: Lower moments are dominated by 2 - and 3 -jet events Higher moments are dominated by multi-jet events
Summary All LEP collaborations presented final measurements of event shape observables and their moments for all available data (√s = 91 -209 Ge. V). Satisfactory description of data by Pythia, Herwig and Ariadne achieved. Discrepancies observed for LEP 1 data in the extreme 2 -jet region and for observables sensitive to 4+ -jet production.
- Slides: 24