ELEMENTARYPARTICLEPHYSICS CurrentTopicsinParticlePhysics ...€¦ · S. Gentile...
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ELEMENTARY PARTICLE PHYSICSCurrent Topics in Particle Physics
Laurea Magistrale in Fisica,curriculum Fisica Nucleare e Subnucleare
Lecture 11
Simonetta Gentile∗
∗ Università Sapienza,Roma,Italia.
December 10, 2017
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Preliminaries
Simonetta Gentileterzo piano Dipartimento di Fisica Gugliemo MarconiTel. 0649914405e-mail: [email protected] web:http://www.roma1.infn.it/people/gentile/simo.html
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Bibliography
♠ BibliographyK.A. Olive et al. (Particle Data Group), The Review of ParticlePhysics, Chin. Phys. C, 38, 090001 (2014)(PDG)update 2015, http://pdg.lbl.gov/F. Halzen and A. Martin, Quarks and Leptons: An introductorycourse in Modern Particle Physics , Wiley and Sons, USA(1984).
♠ Other basic bibliography:A.Das and T.Ferbel, Introduction to Nuclear Particle PhysicsWorld Scientific,Singapore, 2nd Edition(2009)(DF).D. Griffiths, Introduction to Elementary ParticlesWiley-VCH,Weinheim, 2nd Edition(2008),(DG)B.Povh et al., Particles and NucleiSpringer Verlag, DE, 2nd Edition(2004).(BP)D.H. Perkins,Introduction to High Energy PhysicsCambridge University Press, UK, 2nd Edition(2000).Y.Kirsh & Y. Ne’eman, The Particle HuntersCambridge University Press, UK, 2nd Edition(1996).(KN)S. Gentile (Sapienza) ELEMENTARY PARTICLE PHYSICS December 10, 2017 3 / 48
♠ Particle Detectors bibliography:
William R. Leo Techniques for Nuclear and Particle PhysicsExperiments,Springer Verlag (1994)(LEO)C. Grupen, B. Shawartz Particle Detectors,Cambridge University Press (2008)(CS)The Particle Detector Brief Book,(BB)http://physics.web.cern.ch/Physics/ParticleDetector/Briefbook/
Specific bibliography is given in each lecture
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Lecture Contents - 1 part
1. Introduction. Lep Legacy2. Proton Structure3. Hard interactions of quarks and gluons: Introduction to LHC Physics4. Collider phenomenolgy5. The machine LHC6. Inelastic cros section pp7. W and Z Physics at LHC8. Top Physics: Inclusive and Differential cross section tt W, tt Z9. Top Physics: quark top mass, single top production10. Dark matter
Indirect searchesDirect searches
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Specific Bibliography
♠ Bibliography of this Lecture
O. Lahav and A.R. LiddleThe Cosmological parametersThe Review of Particle Physics (2017) C. Patrignani et al.(Particle Data Group), Chin. Phys. C, 40, 100001 (2016) and 2017update. (PDG-Rev-Cosmo) rpp2016-rev-cosmologicalM. Drees and G. Gerbier Dark MatterThe Review of Particle Physics (2017) C. Patrignani et al.(Particle Data Group), Chin. Phys. C, 40, 100001 (2016) and 2017update. (PDG-Rev-dark) rpp2016-rev-dark-matterKatherine FreeseStatus of dark matter in the universe,Proceedingsof 14th Marcel Grossman Meeting, MG14, University of Rome "LaSapienza", Rome, July 2015,arXiv:1701.01840
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Specific Bibliography
♠ Bibliography of this Lecture
Bertone, Particle Dark Matter: Observations, Models and Searches,CambridgeFreese, Lisanti and Savage, Rev. Mod. Phys. 85 (2013) 1561Kurylov and Kamionkowski, Phys. Rev. D 69 (2004) 063503Classic papers:
Lewin and Smith, Astrop. Phys. 6 (1996) 87Jungman, Kamionkowski and Griest, Phys. Rep. 267 (1996) 195Gondolo, arXiv: hep-ph/9605290Spergel, Phys. Rev. D 37 (1988) 1353Drukier, Freese and Spergel, Phys. Rev. D 33 (1986) 12 Goodmanand Witten, Phys. Rev. D 31 (1985) 12.
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Contents
1 Dark matter. Direct Detection
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Our dark halo
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Direct detection of WIMPs
Billions of WIMPs may be pass-ing through the Earth each sec-ond, but they very rarely inter-act.
Figure : Schematic
Direct detection experiments operate underground and search forWIMPs via their scattering with atomic nuclei in the detector.
WIMP velocity ∼ 10−3c=⇒ non-realtivisticExpected recoil energies∼ 10 keVExpected < 1event/kg/year Figure : Schematic
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WIMP-nuceus interaction
• WIMP-nucleus elastic collision
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WIMP-nucleus interaction
Energy-momentumconservation
1
2mv2 = 1
2mv′2 + q2
2M
mv′ cos θ′ = mv − q cos θ
mv′ sin θ′ = q sin θ
Eliminate θ′ and v′
q = 2µv cos θ µ =mM
m + MReduced mass
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WIMP-nuceus interaction
q = 2µv cos θ
Magnitude of recoil momentum varies in the range:
0 ≤ q ≤ qmax ≡ 2µv Emax ≡2µ2v2
M
Minimum WIMP speed required to produce a recoil energy E:
vm =q
2µ=
√ME
2µ2
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The expected event rate
The strongly simplified expected event rate :
R ∝ NΦχσ
N = number of target nuclei in the detector,Φχ = flux of WIMPs,σ = WIMP-nucleus cross section
Φχ = n < v >
n : WIMP number density n = ρm , ρ local DM mass density
< v>:average WIMP velocity with respect to the detector
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The expected event rate
Let’s estimate the expected flux of WIMPs on Earth assuming:
ρ = 0.3 GeV/cm3, < v > = 220 km/s, m = 100 GeV
Φχ =ρ
m× < v > = 6.6 · 104cm−2s−1
The flux is large enough that even though WIMPs are weaklyinteracting, we would have a small but blue potentiallymeasurable rate in direct detection experiments.
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The expected event rate
Strongly semplified event rate per unit detector mass,assuming1 :
σ = 10−38cm2,M = 100GeV
R =N
NMΦχσ ∼ 0.12 events/kg/yr
M = number of nuclei in the detectorNM = detector mass
More realistic and proper calculation of the event rate arenecessary.
11kg = 15.6 · 1026 GeV, Xenon atom weight 2.1810 · 10−22g .
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The differential event rate
To find the differential event rate, we need the followingingredients:
WIMP-nucleus scattering cross section which describes theinteraction of a WIMP with the nucleus. (particle physics input)Local DM density and velocity distribution in the detector referenceframe (astrophysics input).
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The differential event rate
The differential event rate per unit detector mass is determinedfrom differential cross section2
dσ
dE
Multiply the number N of the nuclei in the detector. Divide by thedetector mass MN .Multiply the flux of WIMPs with velcity ~v in the velocity spaceelment d3v:
nvf(~v)d3v, n =ρ
m
f(~v) WIMP velocity distribution in the detector reference frame.
2R = NNM
Φχσ and Φχ = ρm× < v >
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The differential event rate
The differential event rate per unit detector mass 3:
dR
dE=
ρ
m
1
M
∫v>vm
d3vdσ
dEvf(~v)
Recap: Many unknowns enter in event rate:
R, expected event rateE, recoil energy of detector nucleusρm DM number (ρ=DM density, m = DM mass)v ,DM speedvm, minimum DM speed required to produce a recoil energy Ef(~v), DM velocity distribution in the detector reference frame.σ, DM-nucleus scattering cross section
3The divided by M
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Particle physics input:cross section
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The differential cross section
The WIMP-nucleus differential cross section encodes how DMinteracts with ordinary matter:
WIMP-quark interaction:strongly depends on the DM model,and is calculated in terms of an effective Lagrangian whichdescribes the interaction of the WIMP candidate with quarks andgluons.WIMP-nucleon cross section:calculated using hadronic matrixelements which describe the nucleon content in quarks andgluons=⇒ subject to large uncertainties.Total WIMP-nucleus cross section:calculated by adding thespin and scalar components of nucleons.
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The differential cross section
The standard theoretical framework assumed for direct detectionexperiments is inspired by models of supersymmetric DM.It assumes interactions mediated by heavy particles (i.e. contactinteractions), and includes only the leading-order interactionsin the non-relativistic limit.
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The differential cross section
Differential WIMP-nucleus scattering cross section forstandard contact interactions:
dσ
dE=
σ0Emax
F 2(E) =M
2µ2v2σ0F
2(E)
σ0: total scattering section with point-like nucleus.F 2(E): nuclear form factor (normalized to 1); takes into accountthe finite size of the nucleus and encode the dependence e onmomentum transfer (q =
√2ME).
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The differential cross section
When momentum transfer is small, the DM doesn’t probe the sizeof the nucleus and coherently scatters off the entire nucleus:
F 2(E)→ 1
As momentum transfer increases, the DM becomes sensitive to thespatial structure of the nucleus:
F 2(E) < 1
The effect is strong for heavy target nuclei.=⇒ Event ratesuppression.
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The differential cross section
Two relevant contributions to the cross section:
Spin-independent (SI): coherent interaction of the WIMP withall nucleons; no dependence on nuclear spin.Spin-dependent (SD): the WIMP interacts with the spin of thenucleus.
Considering both spin-independent and spin-dependent WIMP-nucleusinteractions in the non-relativistic limit:
dσ
dE=
M
2µ2v2[σSI0 F 2
SI + σSD0 F 2SD
]
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Spin-independent interaction
The SI contribution to the cross section can arise from scalarcouplings of DM to quarks, which occurs through the operator(χχ)(qq)
For a WIMP with scalar interactions, the SI WIMP-nucleuscross section is:
σSI0 =4µ2
π
[Zfp + (A − Z)fn
]2where fp, fnare couplings of the WIMP with point- likeprotons and neutrons, respectively.Z and A-Z are the number ofprotons and neutrons in the nucleus.
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Spin-independent interaction
To compare data from different direct detection experiments whichhave different target nuclei, it is convenient to consider theWIMP-proton cross section:
σSI =4µ2
p
π
(fp)2
µp: WIMP proton reduced mass, mMm + M Reduced mass;M: mass
of nucleus.Then we have:
σSI0 = σSI[Z + (A − Z)
(fnfp
)]2( µµp
)2
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Spin-independent interaction
For most WIMP candidates one can assume fn ' fp and the SIscattering cross section of WIMPs with protons andneutrons are roughly comparable. For identicalcouplings,fn = fp , and
σSI0 = σSIA2( µµp
)2The SI cross section increases rapidly with nuclear massA2.=⇒ heavy target are favored .The A2 dependence comes from the fact that the contributions tothe total SI cross section of a nucleus is a coherent sum over theindividual protons and neutrons.
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Spin-independent interaction
The SI form factor is essentially a Fourier transform of the massdistribution of nucleus: the mass distribution of the nucleus:
F (q) =
∫d3xρ(x)eiq·x
An accurate approximation4
F (q) = 3e−q2s2/2 sin(qr) − qr cos(qr)
(qr)3
s= 1 fm skin ticness, a solid sphere, approximatingspin-independent interaction with the whole nucleus (single outershell nucleon for spin dependent) effective nuclear radius r ≈ A1/3
4J.D.Lewin, P.F. Smith For a complete review: Review of mathematics, numerical factors, andcorrections for dark matter experiments based on elastic nuclear recoil Astroparticle Physics 6(1996), 87 Form factor, protected
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Spin-independent interaction
Figure : Nuclear form factor
•Uncertainties in the deter-mination of the nuclear formfactor will affect the theo-retical prediction for eventrate.
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Spin-dependent interaction
SD scattering is due to the interaction of a WIMP with the spin ofthe nucleus.It can arise from axial vector couplings of DM toquarks5 It happens only in detector nuclei with an odd numberof protons and/or neutrons.Unlike the SI case, the two SD couplings may be quite different,and we cannot simplify the cross section as we did for the SI case.No A2 enhancement of SD cross section as SI case.The SD is not as significant as SI scattering in directdetection experiments.The SD form factor depends on the spin structure of a nucleus
⇓
I will consider only SI interactions in my lecture.
5which occurs through the operator (χγµγ5χ)(qγµγ5q).
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The differential event rate
dR
dE=
ρ
m
1
M
∫v>vm
d3vdσ
dEvf(~v)
dσ
dE=
M
2µ2v2σ0F
2(E)
dR
dE= ρ
σ0F2(E)
2mµ2︸ ︷︷ ︸particle physics
∫v>vm
d3v~v
v︸ ︷︷ ︸astrophysics
astrophysicsparticle physics
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Halo integral
Let’s define halo integral as:
η(vm) ≡∫v>vm
d3v~v
v
The event rate can be written as 6
dR
dE=
ρσ0F2(E)
2mµ2η(vm)︸ ︷︷ ︸
astrophysics
For SI case :dR
dE=
ρA2σSIF2(E)
2mµ2pη(vm)︸ ︷︷ ︸
astrophysics
6σSI0 = σSIA2(µµp
)2S. Gentile (Sapienza) ELEMENTARY PARTICLE PHYSICS December 10, 2017 33 / 48
Astrophysics input input:DM distribution
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Standard Halo Model
The dark matter halo in the local neighborhood is most likelydominated by a smooth component with an average density:
ρχ ≈ 0.3 GeV cm−3
The simplest model for this smooth component is often taken to bethe SHM, Standard Halo Model an isothermal sphere with anisotropic, Maxwellian velocity distribution and rms velocitydispersion σv. 7
7Freese, Lisanti and Savage,Colloquium: Annual modulation of dark matter Rev. Mod. Phys. 85(2013) 1561 ??
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Standard Halo Model
fgal(~v) =
{1
Nesc
(3
2πσ2v
)3/2,[e−3~v
2/2σ2v − e−3~v2/2σ2
v]
for |~v|< vesc
0, otherwise
Nesc = erf(z) − 2√πze−z
2
z ≡ vesc/v0 is a normalization factorv0 =
√2/3σv
v0 ≈ 235 km/s is the most probable speed.The Maxwellian distribution is truncated at the escapevelocityvescto account for the fact that WIMPs withsufficiently high velocities escape the Galaxy’s potential welland, thus, the high-velocity tail of the distribution is depleted.
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Standard Halo Model
The Dark Matter velocity distributiondepends on the halo model.
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DM velocity distribution
To compute the event rate, we need the WIMP velocity,~v,distribution in the detector reference frame. Need to transformfrom the galactic frame to the detector frame.
fdet(~v, t) = fdet(~v + ~ve(t)
)= fgal
(~v + ~vs(t) + ~ve(t)
)
~ve(t), Earth’s velocity wrt the Sun~vs(t), Sun’s velocity wrt the Galaxy
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Sun’s orbit around the Galaxy
Galactic coordinate system:
Origin at the position of the Sun.x-axis points towards the Galactic Center.y-axis points towards the direction of the Galactic rotation.z-axis points to the North Galactic pole
~vs(t) = (0, 220, 0) + (10, 13, 7)km/s
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Earth’s orbit around the Sun
Sun’s ecliptic longitude λ(t) changes from 0 to 360 degrees as the Earthorbits the Sun.
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Earth?s orbit around the Sun
In the approximation of circular orbit, we have
λ(t) =2π
1yr(t − 0.218)
t is the time during the year running from 0 to 1 year, with t=0 onJanuary first0.218is the fraction of year before the spring equinox (March 21).The position vector of the Earth is:
~re(t) = −[
cosλ(t)e1 + sinλ(t)e2]AU
1 AU is the average distance between the Earth and the Sun.
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Earth’s orbit around the Sun
Earth’s velocityaround the Sun is time dependent:
~ve(t) = ve[
sinλ(t)e1 − cosλ(t)e2]
ve = 29.8 km/sOrthogonal vectors spanning the plane of the plane of the Earth’sorbit:
e1 = (−0.0670, 0.4927,−0.8676)
e2 = (−0.9931, 0.1170,−0.01032)
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DM velocity distribution
Comparison of two different model in the lab frame(on theearth)after accounting the motion of Solar System relative toGalactic center:
SHM,Standard Halo Model an isothermal sphere with an isotropic,Maxwellian velocity distribution and rms velocity dispersion σv.Tidal stream, the material in the stream has not had the time tospatially mix, the stream has a small velocity dispersion incomparison: fstr(~v) = δ3(~v)
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The differential event rate
The recoil spectrum falls off exponentially in the galactic restframefor the SHM (neglecting form factors), due to the exponentialdrop-off with velocity 8 Even when form factors and the motion of theEarth through the halo are accounted for, the spectrumis stillapproximately exponential in the laboratory frame:
dR
dE∼ e−E/E0 E0 ∼ O(10keV ) For typical WIMP and target mass.
•Large contribution to the rate is at low energies.8
fgal(~v) =
1Nesc
( 32πσ2v
)3/2, [e−3~v2/2σ2v − e−3~v2/2σ2v]
for |~v|< vesc
0, otherwise
Nesc = erf(z) −2√πze
−z2
z ≡ vesc/v0 is a normalization factor
v0 =√
2/3σv
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The differential event rate
Figure : Event rate
Spectrumis featureless:exponentially falling off.Spectrum is shifted to lowenergies for low WIMPmasses.To detect lightWIMPs, need low energythreshold (and light targetnuclei).Expect different ratesfor different targets.Rate depends on A2=⇒heavier targets are favoredin direct detectionexperiments.
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The differential event rate
Figure : Event rate
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The differential event rate
Nuclear form factor is less important for light WIMPs
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Summary
We discussed the different ingredients which enter in the expectedevent rate in direct detection experiments.
particle physics input:cross section. SI cross section scales as A2
astrophysics input: local DM density and velocity distribution.Maxwell distribution in the Standard Halo Model.
Recoil spectrumexponentially falling off and featureless.Direct detection experiment need to achieve low energythreshold.
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