Nuclear and Particle Physics An...
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Nuclear and Particle Physics An Introduction
Spring Semester 2012 Farid Ould-‐Saada
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B.1 Lorentz transformations and 4-Vectors B.2 Frames of references B.3 Invariants
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Particle of rest mass m, velocity u in coordinates (t,x,y,z) in frame S
In S’ moving with speed v=βc in z-‐direction coordinates in S’: (t’,x’,y’,z’), u’
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x '= xy '= y
z'= γ z − vcct
⎛
⎝ ⎜
⎞
⎠ ⎟
ct'= γ ct − vcz
⎛
⎝ ⎜
⎞
⎠ ⎟
⎧
⎨
⎪ ⎪ ⎪
⎩
⎪ ⎪ ⎪
u'= u − v
1− uvc 2
⎧
⎨ ⎪
⎩ ⎪
β ≡vc
γ =11− β2
: Lorentz factor
γ(u') =1
1− u'c⎛
⎝ ⎜
⎞
⎠ ⎟ 2
= γ(u)γ(v) 1− uvc 2
⎡
⎣ ⎢ ⎤
⎦ ⎥
v
y’
x’
z’
x
y
z S
S’
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Time dilatation Distance contraction
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Time and space coordinates make up a 4-‐vector
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Lorentz transformations
The space-time and the energy-momentum 4-vectors result in
The Lorentz-transformation of both space-time and momentum-energy four-vectors can be expressed in matrix form:
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Laboratory system (LS) and Centre of mass system (CMS) In LS moving projectile a in a beam strikes a target particle b at rest
In CMS
4-‐vectors in both systems (L=laboratory, T=target, B=beam)
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Comparison of fixed target and colliding beam accelerators
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Unless u~c and cosθC~-‐1, final state particles emitted in narrow cone about beam direction in LS. Similarly with decays.
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B(EL , p L )+ T(mT2, 0 ) →P(E, q ) + ...
ScatteringangleθL in LS and θC inCMS p L = (0,0, pL ) ; q = (0,qsinθL ,qcosθL )In CMS : p B
' + p T
' = 0
tanθL =1γ(v)
q' sinθC
q'cosθC +vE'c 2
E '= mPc 2γ(u) q'= mP uγ(u) u : velocity of P in CMS
v = pLc 2 EL + mTc 2( )−1 HE:EL ≈ pL c >>mB c 2,mT c 2
⎯ → ⎯ ⎯ ⎯ ⎯ ⎯ ⎯ ⎯ v ≈ c(1−mTc/pL) ≈ c
γ(v) ≈ pL
2mTc⇒ tanθL ≈
2mTcpL
⋅usinθC
ucosθC + c
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Laboratory system (LS) and Centre of mass system (CMS)
More efficient to work with quantities that are invariant!
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InLS : pL =c2mT
s − (mT +mB )2[ ] s − (mT −mB )
2[ ]
InCMS :p =c2 s
s − (mT +mB )2[ ] s − (mT −mB )
2[ ]
Invariant under all permutations of its arguments
Minimum Laboratory energy to produce particle M
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Mass of decaying particle = invariant mass of decay products
Dalitz plots
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- Crystal barrel at LEAR (Low Energy Antiproton Ring, CERN Meson spectroscopy - Plot with high degree of symmetry: 3 identical particles - Clear enhancements due to resonances
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Mandelstam variables
Rapidity and pseudo-‐rapidity
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A + B→C +D
s = pA + pB( )2/c 2 t = pA − pC( )2
/c 2 u = pA − pD( )2/c 2
• t + t + u = m j2
j=A ,B ,C ,D∑
• elasticscattering, p,θ in CMSrelative toparticle A,⇒ t = −2p2 1− cosθ( ) /c 2
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Rapidity :y =12ln E + pL
E − pL
⎛
⎝ ⎜
⎞
⎠ ⎟
Pseudo - rapidity :η = −ln tan θ2⎛
⎝ ⎜ ⎞
⎠ ⎟
⎡
⎣ ⎢
⎤
⎦ ⎥
http://en.wikipedia.org/wiki/Pseudorapidity
http://en.wikipedia.org/wiki/Mandelstam_variables
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Pages 358-‐359 (see next 2 pages) B1-‐B10
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