Download
1 / 43
430 likes | 578 Views
New Physics at a TeV and the LHC - I. Sreerup Raychaudhuri Tata Institute of Fundamental Research, Mumbai, India . Accelerator Basics and the LHC. IPM String School (ISS 2009), Tehran, Iran April 16, 2009. We learn about nuclear and sub-nuclear physics in two ways:.
E N D
New Physics at a TeV and the LHC - I SreerupRaychaudhuri Tata Institute of Fundamental Research, Mumbai, India Accelerator Basics and the LHC IPM String School (ISS 2009), Tehran, Iran April 16, 2009
We learn about nuclear and sub-nuclear physics in two ways: Indirect way – from energy levels of nuclear/particle states (spectroscopy) Direct way – from scattering experiments Typical scattering experiment
Two possible designs for a scattering experiment: 1. ‘Fixed’ target experiment As more and more energy is pumped into the beam, more and more energy is lost in the recoil of the target
2. Collider experiment Full beam energy is available for the process
LHC 2009 Tevatron 1994 LEP 1991 SLAC 1969
How are these high beam energies attained? Cannot make plates too close, for then there will be spark discharges even with high vacuum; instead we make voltage high ⇒ use AC voltage instead of DC voltage
Cannot use a continuous beam any more; must send bunches of particles at a time… …pulsed operation : timing between bunches must match RF…
Interaction rate will now depend on bunch crossings… Event rate s-1 Luminosity cm-2 s-1
Event rate : As data are gathered over time… No of events Integrated luminosity If s Is measured in pb, fb, etc. , L is measured in pb-1, fb-1, etc. 1 pb = 1000 fb⇒ 1 fb-1 = 1000 pb-1
10 nb-1/s nb-1/s From the BNL home page
How are these high luminosities attained? Packing charged particles like electrons and protons into very small volumes is difficult because of the strong electrostatic repulsion; requires very strong focussing magnetic fields from superconducting electromagnets etc.
Working Principle of a Storage Ring Re-use the same bunches many many times…
8.6 Km The LHC is just a giant storage ring
Some LHC parameters Beam energy : 5 TeV 7 TeV Collision energy : 10 TeV 14 TeV Luminosity : 10 nb-1 s-1 (design) ‘Integrated’ luminosity: 100 fb-1 per year (design) Bunch crossing rate : 4 107 s-1 Bunch distance: ~ 7 m Bunch size : few cm 1 mm, 16 m (collision pt) No of protons/bunch : 1.1 1011 Current: 11 700 A Magnetic field: 8.3 T No of magnets: 9593 Magnet temperature: 1.9 K
Some amusing LHC facts • LHC will consume as much power as domestic sector in Geneva canton • LHC budget is comparable to GDP of a small country, e.g. Fiji or Mongolia • Vacuum is 10 times better than the surface of the Moon • Magnetic fields of 8.3 Tesla are 100,000 times the Earth’s magnetic field • Magnets will use 700,000 lit of liquid He and 12,000,000 lit of liquid N • Total length of cable could stretch from Earth to Sun 5 times • LHC protons will travel at 0.999999991c • LHC protons will have energies comparable to that of a flying mosquito • Protons used in 10 years would be equivalent to only 7.5 g of hydrogen • LHC beams will together have enough energy to melt 1 tonne of copper • Data could fill a stack of HD-DVDs 11 Km high (Mt. Everest: 8.8 Km)
2009, End-cap radiation hardened; low efficiency barrel radiation sensitive; high efficiency
mCh VXD EMC HCAL
VXD ECAL HCAL Ch CMS Detector
Particle detection at the LHC Everything must be reconstructed onlyfrom these effects
Protons not point particles, but conglomerates of • valence quarks (uud) • gluons • sea quarks (u,d,s,c,b,t) More like two cars crashing and spewing out parts than like the collision of hard billiard balls…
Choice of Variables Partonic system has an (unknown) longitudinal boost Each collision event will have a different we must choose variables which are independent of longitudinal boosts
Commonest Variables • Transverse momentum : • Rapidity : • Pseudo rapidity : • Angular separation : • Invariant mass :
Signal and Background If a certain final state (including phase space characteristics) is predicted by a theory, the cross-section for producing that final state is called the signal If it is possible to produce the same final state (including phase space characteristics) in an older, well-established theory (e.g. Standard Model), that cross-section is called a background Experimental results will have errors:
Excess/depletion over background : Assuming random (Gaussian) fluctuations, the probability that this deviation is just a statistical effect is about : What constitutes a discovery? Consensus:3 deviation is exciting;5 deviation constitutes a discovery;8 deviation leaves no room for doubt
Limiting the parameter space Once there is a well-established deviation from the background, we compare it with the signal: If the numbers match, we can start claiming a discovery… Usually this matching can always be achieved by tuning the free parameters in the (new) theory… Comparison essentially serves to constrain the parameter space of the (new) theory If we must have very small ≈
Typical new physics bounds arising when experimental cross-sections match with backgrounds : Large NS excluded Small NS allowed If experimental data are there, this is called anexclusion plot If the data are projected, this is called asearch limit LHC
If both signal and background are present, the prediction is that experiment will see the sum of both predictions. Typical case: background is large; signal is small « » In this case and Will be very difficult to observe any signal over the experimental error… Require to reduce the background (without reducing the signal)
Kinematic Cuts Fermi’s Golden Rule : Phase space integral has to be over all accessible final states Experimental cross-section may not be able to (wish to) access all the possible momentum final states phase space integral must be done with appropriate kinematic cuts • acceptance cuts : forced on us by the detector properties. • selection cuts : chosen to prefer one process over another.
Examples of acceptance cuts: • minimum pT for the final states : – very soft particles will not cause showering in ECAL/HCAL – different cuts for barrel and endcap • maximum for the final states :– no detector coverage in/near beam pipe • isolation cut on R for leptonic final states :– no hadronic deposit within a cone of R = 0.4 – to be sure that the lepton is coming from the interaction point and not from a hadronsemileptonic decay inside a jet Will be somewhat different for ATLAS and CMS
Example of a selection cut: Suppose we want to select more electrons from the process (1) instead of electrons from the process (2) From simple energy-sharing arguments, the electron in (1) will have more pT than the electron in (2) Impose the selection cut : Ensures that the accessible phase space for (2) shrinks without seriously affecting that of (1) → reflected in the cross-section Selection cuts can be of different kinds depending on the process and the purpose for which it is made…
A variety of selection cuts can be used to reduce the background without affecting the signal (much). Much of the collider physicist’s ingenuity lies in devising a suitable set of selection cuts to get rid of the background(s). Often the background can be reduced really dramatically – to maybe 1 in 10000… Nevertheless, often this reduction of backgrounds to negligible values may also reduce the already weak signal to less than one event in the whole running life of LHC! High luminosity is essential !!
The proton luminosity is not the end of the story… … actual collisions will happen between partons… what actually matters are : parton distributions luminosity
x f(x) Parton density functions (PDFs) from the CTEQ-6 Collaboration (C.P. Yuan et al)
Trade-off between energy and luminosity… If x < 0.4, then maximum available energy at parton level is only about 5 TeV… But to observe most new physics, high luminosity demand restricts us to x < 0.1, i.e. 1 – 2 TeV. LHC probes the TeV scale – but only just…
Physics Goals of the LHC • to test known physics, i.e. SM = QCD + GSW model (H boson) • to discover new physics, e.g. dark matter, SUSY, extra dim, new symmetries, compositeness, … Q. Why should new physics appear at the TeV scale? Is this just wishful thinking? …or do we have solid reasons?
Significance of the TeV energy scale: • top-down approach : • GUT or stringy unification must have low energy consequences; high scale SUSY will have low energy manifestations, extra dimensions will become accessibleat high enough energies • bottom-up approach : • hierarchy problem, neutrino masses, GUT evolution • aesthetic approach : • 18 free parameters in the SM • no QCD-EW unification • desert scenarios
Capabilities of the LHC Cannot do a blind search… All important final states require a trigger
Huge QCD backgrounds… especially if looking for hadronic final states • Cannot see very soft pT jets/leptons/photons LHC has severe limitations….
Sure shots : Can determine t quark properties to precision Can find the Higgs boson of the SM (if it exists) Can find a SUSY signal if kinematics permits Can find a resonant new state Less sure : Can measure Higgs boson couplings Can measure SUSY parameters Can discover exotics, e.g. gravitons, monopoles…
How are we so sure? … next two lectures….
