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Experimental Tests of Continuous Symmetries

Experimental Tests of Continuous Symmetries. Gerco Onderwater KVI/Rijksuniversiteit Groningen, The Netherlands. Continuous Symmetries. Are related to space and time. Translations and rotations in space, and time can take any value, hence they are continuous .

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Experimental Tests of Continuous Symmetries

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  1. Experimental Tests of Continuous Symmetries Gerco Onderwater KVI/Rijksuniversiteit Groningen, The Netherlands

  2. Continuous Symmetries Are related to space and time. Translations and rotations in space, and time can take any value, hence they are continuous. A physics law is said to be symmetric under such transformations if it does not change, i.e. the law is invariant.

  3. Noether's Theorem Continuous symmetry ↔ conservation law Invariant underConservation of (1) time translation energy (2) space translation momentum (3) rotation angular momentum (?) boost Lorentz generators

  4. How to Test? Two possibilities: (1) Test that a process is the same when occuring here and there, now and then, etc. (2) Test the associated conservation law explicitly Important constraint: the trial system is isolated from external influences!

  5. (1) Time Invariance & Energy Conservation

  6. What is Energy? Energy can be defined as the capacity for doing work. It may exist in a variety of forms and may be transformed from one type of energy to another. Transformations constrained by conservation principle One way to state this principle is "Energy can neither be created nor destroyed". Another approach is to say that the total energy of an isolated system remains constant. E1=-E2 or E1+E2=C: this we can test!

  7. Types of Energy A complete test of energy conservation would require the demonstration that each of the kinds of energy below are equivalent nuclearelectric potential kinetic thermal masschemical In the end, all energy is kinetic or potential Note that potential energy can be sub-divided according to each of the four known forces

  8. Joule's Paddlewheel Exp't Classical experiment to show equivalence of 3 types of energy gravity – kinetic - thermal [Philos. trans. Royal Soc. London, 140, pp. 61-82 (1840)]

  9. Photoelectric Effect Emission of electrons under illumination. The electron kinetic energy increases with decreasing photon wavelength, the rate with intensity. Demonstrates equivalence of quantum and kinetic energy

  10. Classic Laws Other observation-based laws, effects and relations that support continuous symmetries Bernouilli Volt Ohm Kirchhoff Ampere Biot-Savart Coulomb Bragg Charles Curie-Weiss Doppler Faraday Gauss Joule Keppler Le Chatelier Lenz Mach Maxwell Meissner Newton Wien Planck Kelvin Rayleigh-Jeans Snell Stefan-Boltzmann and probably some ...

  11. HW Watt Balance Electrical standard of kg Change SI to QM standard

  12. Josephson Voltage Standard • When a DC voltage is applied to a Josephson junction, an oscillation of frequency occurs at the junction. Josephson junction standards can yield voltages with accuracies of one part in 1010. NIST has produced a chip with 19000 series junctions to measure voltages on the order of 10 volts with this accuracy.

  13. Quantum Hall resistance standard

  14. Quantum Hall Array Standard (QHARS) 1cm  1cm 100  standard

  15. Metrological triangle new standard ?

  16. Beta Decay Mystery Beta energy expected to be mono-energetic A continuous spectrum was observed Two explanations (1) energy non-conservation (2) new invisible particle Did not fulfill closed system requirement

  17. Time Invariance Search for time variation of reaction rate Weak Interaction Oklo natural reactor: |ĠF/GF|<1x10-11/year EM Interaction Quasar H spectra: Da/a = -(0.7±0.2)×10-5 for 0.5<z<3.5 Proton/electron mass: Dm/m = (2.0±0.6)x10-5 / 12 Gyr Strong Interaction mRb/mCs = -(0.9±2.9)x10-15 /year This will be discussed in more detail later in the course Eur. Phys. J. A 8, 137–140 (2000) Phys. Rev. Lett. 96, 151101 (2006) Phys. Rev. Lett. 87, 091301 (2001) Phys. Rev. Lett. 92, 230802 (2004)

  18. Energy in Quantum Mechanics The uncertainty principle states that DEDt≥ħ Does this mean energy conservation may be violated (briefly)? HW: wrong question

  19. (2) Spatial Invariance & Momentum Conservation

  20. What is Momentum? Momentum can be though of as the tendency of an object to continue in its direction of travel Classically: p = mv Relativistic: p = gmv Massless: p = E/c = h/l Quantum: p = -iħ Change requires an external force

  21. Every Day Life

  22. Compton Effect The increase in wavelength of a photon scattering of an electron Demonstrates that photons carry energy and momentum l2 = h/mec ( 1-cosq ) + l1

  23. e+e-→ 2g Ps →1g : Eg=2me pg=Eg/c ≠ pPs=0 FORBIDDEN Ps →2g : Eg=me pg1+pg2=0 ALLOWED Collinearity = (relativistic four) momentum conservation Phys. Rev. 77, 205–212 (1950)

  24. (3) Rotation Invariance & Angular Momentum Conservation

  25. What is Angular Momentum? Angular momentum is the measure of rotation around some fixed point in space (also includes spin) Classically: L = rxp Relativistic: L = rxp Massless: L = S Quantum: L = -iħrxp Change requires an external torque

  26. Kepler's Second Law A line joining a planet and its star sweeps out equal areas during equal intervals of time Tested in solar system observations

  27. Michelson-Morley Classic experiment to test isotropy of c Modern version: compare flaser,xy vs time of day (2p rotation) Dqc/c = (2.6±1.7)x10-15 Phys. Rev. Lett. 21, 020401 (2003) Phys. Rev. D 67, 056006 (2003)

  28. Isotropy of b-Decay Measure differential decay rate and see if it varies with orientation w.r.t. some fixed frame (stars) G(q) = G0 [ 1 + e1cos(q) +e2cos(2q) ] |e1| < 1.6x10-7 |e2| < 2x10-6 Phys. Rev. D 14, 1 (1976)

  29. Isotropy of Mass Measure Zeeman splitting for 3He(J=½) and 21Ne(J=3/2) (Hughes-Drever experiments) Search for orientation-dependent binding energy = inertial mass Lowest order: quadrupole splitting (so 3He is not sensitive) |DE/E| < 1.6x10-26 Phys. Rev. Lett. 14, 1541 (1989) Phys. Rev. Lett. 64, 2261 (1990)

  30. Pion Decay Best limit of angular momentum conservation in weak interaction comes from G(p→en)/G(p→mn) ~ 10-4 The small factor is “unexpected” in view of (giant) phase for electron decay, but… Axial vector delivers wrong helicity (need l=1 for angular momentum conservation) +  + More: absence of pseudo scalar (P) coupling in WI

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