relativity and introductory particle physics hilary term, 2010 s. biller www ...
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Relativityand
IntroductoryParticle Physics
Hilary Term, 2010 S. Biller
wwwpnp.physics.ox.ac.uk/~biller/particle_course
Suggested Reading List
Quarks
Leptons
The StrongInteraction
Introduction to Elementary ParticlesGriffiths (a bit more mathematical)
Nuclear and Particle Physics
Williams (less mathematical but very good)
Introduction to High Energy PhysicsPerkins (some very good sections... worth a look)
Femtophysics (a bit mathmatical for this course,Bowler but contains some real gems !)
Scientific American articles (generally written at an extremely good level)
Facts and Mysteries in Particle PhysicsVeltman (Historical - a good read!)
Introduction to Special Relativity Rindler (good, basic text)
Particle Physics Martin & Shaw (very nice!)
Particle Physics:A Very Short IntroductionClose (Handbook of basic concepts)
III. Tools of the Trade
High Energy Units 4-Vectors Cross-Sections Mean Free path
IV. Antiparticles & Virtual Particles
Klein-Gordon Equation Antiparticles & Asymmetry Yukawa Potential & The Pion The Bound State of the Deuteron Virtual Particles Feynman Diagrams
V. QED; Symmetry
Bohr Magneton Off-Shell Electrons Vacuum Polarization Divergences, Running Coupling & Renormalization Yukawa Scattering & the Propagator
VI. Symmetries I
Symmetry & Unification Space-Time Symmetries Gauge Invariance in EM Noether’s Theorem Isospin Parity
VII. Symmetries II
Charge Conjugation Time Reversal CPT Theorem Baryon & Lepton Number Strangeness
VIII. Quarks I
Strangeness Meson & Baryon Multiplets 3-Quark Model & The Meson Nonets
IX. Quarks II Quarks and the Baryon Multiplets Colour and Gluons Confinement & Asymptotic Freedom Quark Flow Diagrams
X. Quarks III
The November Revolution Heavy Quark States Truth R
XI. Weak Interactions
Cross-Section and the W Coupling Cabibbo Angle and CKM Matrix Parity Violation Kaons and Mixing CP Violation
XII. Electroweak Theory Kaon Regeneration & Oscillation The Mass of the W Massless Photon & Broken Symmetry The Higgs Mixing and the Weinberg Angle The Mass of the Z Z Decay
XIII. Detectors
Visual Track Detectors Electronic Ionization Devices Cerenkov Detectors Calorimeters Photomultiplier Tubes & Scintillators Tricks With Timing Generic Collider Detector
XIV. Solar & Atmospheric Neutrinos
Outline
(M&S: sec 1.5; append. A & B)
(M&S: chap. 1, 11.4.2)
(M&S: sec 5.1, 5.2, 7.1.2)
(M&S: sec 5.3, 6.1; app. D.1, D.2)
(M&S: sec 3.1-3.4, 5.3, 5.4, 5.6)
(M&S: sec chap 3, 6.2)
(M&S: sec 6.2, 6.3, 7.1)
(M&S: sec 6.4, 7.23, 7.3, 8.23)
(M&S: sec 4.51, 8.1; chap. 10)
(M&S: chap. 9, 10)
(M&S: sec. 4.3, 4.4, 4.5)
(M&S: sec. 2.3, 11.1)
I. Experimental Foundations of Special Relativity
Michelson-Morley Hamar Kennedy & Thorndike Alvager & Others Time Dilation
II. Relativistic Space-Time
Lorentz Transformations Invariant Intervals & Proper Time EM Unification Equiv of Mass & Energy Space-Time Diagrams Relativistic Optics
(Rindler: sec 1-5; 8-11)
(Rindler: sec 6-7; 19-21; 15-18)
(Rindler: sec 20, 22, 26-31)
www.anu.edu.au/Physics/Searle Visualising relativistic optics, including movies (cool!)particleadventure.org Nice overview of various things at basic levelpdg.lbl.gov Particle Data Group : The Bible of particle properties, limits, formulae, reviews...www.colorado.edu/physics/2000/ Nifty physics Java applets (not strictly particle physics) - check out the Bose-Einstein Condensate section!www.fnal.gov/pub/inquiring/ Overview and lots of interesting stuff (including live displays of CDF & D0 events with explanation!)www2.slac.stanford.edu/vvc/ Nice discussion of linear colliders etc.www.cern.ch CERN !! (enough said)hepweb.rl.ac.uk/ppuk/ Particle physics news and linkswww.ep.ph.bham.ac.uk/user/watkins/seeweb/bubblechamber.htm Bubble chamber pictures with explanations and excercises!
Websites of Interest
Lecture 1: Experimental Foundations of Special relativity
• Michelson & Morley• Hamar• Kennedy and Thorndike• Alvager and Others• Time Dilation
Section 1-5, 8-11
Useful Sections in Rindler:
Special Relativity Review
Einstein’s Two Postulates of Special Relativity:
I. The laws of physics are identical in all inertial frames
II. Light propagates in vacuum rectilinearly, with the same speed at all times, in all directions and in all inertial frames
v v v
c-v
cspeed relative to mirrors
v v v
c+ v
c
speed relative to mirrors
v
L
v t1
2
d
ct1 = 2d
c2t12 = 4d2 = 4 ( L2 + v2t
12/4)
t1 =
2L/c
1 - v2/c2
t2 =
Lc-v
Lc+v
+
t2 =
2L/c
1 - v2/c2
1
2
Michelson & Morley (1887):
1/8th predicteddisplacement !!
data
1) Aether moves with the earth (“aether drag”)
Conclusions:
2) Length contraction occurs for all objects moving through the aether (Lorentz-Fitzgerald hypothesis)
or
Eliminates 1st
explanation
(also, no aberation of starlight due to motion with respect to earth’s aether)
Hamar (1935):
Kennedy & Thorndike (1932):1
2
v
30 km/s
30 km/s
Any length contraction alone will affect the distances (hence, the phases) for paths 1 and 2 to different extents, unless the frequency also changes to compensate (i.e. time dilation)
Eliminates 2nd
explanation
proton collision with Be targetto make pions
Magnets sweepout chargedparticles
0 2
collimate beam
sweep chargedparticle againfrom grazinginteractionsAbsorb swept
particles
Detection pointsspaced accordingto bunch structure (105ns x c)
chargedparticle veto
prompttimingsignal
calorimetricCherenkovmeasurement(E> 6 GeV)
scintillator
thin leadconverter
lead-glass
= 0.005 ± 0.013 ns(out of 105 ns separation)
If c´ = c + kv
Then k < 10-5
Well, Is There Any Reason To Expect Anything Different ??
A Test Of
t E LE
QG c
Amelino-Camelia et al., Nature, 25 June 1998
Astrophysics, abstractastro-ph/9811018
A time varying speed of light as a solution to cosmological puzzlesAuthors: Andreas Albrecht, Joao Magueijo
Comments: To be published in Physical Review D. Note added referring to John Moffat's early work on VSL theoriesJournal-ref: Phys.Rev. D59 (1999) 043516
We consider the cosmological implications of light travelling faster in the early Universe. We propose a prescription for deriving corrections to the cosmological evolution equations while the speed of light c is
changing. We then show how the horizon, flatness, and cosmological constant problems may be solved. We also study cosmological perturbations in this scenario and show how one may solve the homogeneity and
isotropy problems. As it stands, our scenario appears to most easily produce extreme homogeneity, requiring structure to be produced in the Standard Big Bang epoch. Producing significant perturbations during the
earlier epoch would require a rather careful design of the function c(t). The large entropy inside the horizon nowadays can also be accounted for in this scenario.
G. & V. Sokolov, 2007: Orbital Experiment with a Femtosecond Laser for Testing Light Speed Invariance
Iman Joudaki, 2007: Test of Special Relativity Using Nano Technology
Einstein’s Two Postulates of Special Relativity:
I. The laws of physics are identical in all inertial frames
II. Light propagates in vacuum rectilinearly, with the same speed at all times, in all directions and in all inertial frames
From this,Insanity Follows...