Experiments with a single electron in storage ring

1. Experiments with a single electron in storage ring T. Shaftan Fermilab, 2/21/2012

2. BINP team N. A. Vinokurov P.V. Vorob’ov A.S. Sokolov I.V. Pinayev V. M. Popik T. V. Shaftan These experiments were proposed and carried out under guidance of N. A. Vinokurov and P.V. Vorob’ov

3. The traps of Paul and Dehmelt (Nobel Prize 1989) The works of Wolfgang Paul, which led to the Paul trap, are based on investigations of the properties of electric and magnetic multipoles. Paul has shown that a magnetic hexapole focuses beams of atoms having a magnetic dipole moment.    The electric quadrupole: a d.c. voltage in addition to an a.c. voltage is applied to the electrode pairs A-A. To the other electrode pair B-B the same voltages with opposite signs are applied. The Paul trap now being used by many scientists for storing ions may be considered a three-dimensional version of the two-dimensional mass filter. Hans Dehmelt's contributions are mainly connected with the development and use of the Penning trap. He invented ingenious methods of cooling, perturbing, storing (one single electron was trapped for more than 10 months), and communicating with the trapped particles, thus forcing them to reveal their properties. In the combined electric and magnetic field in the Penning trap charged particles describe a complicated motion, which consists of three independent oscillations; one axial, one cyclotron, and one magnetron oscillation, each one having a well defined frequency. The axial oscillation induces a signal in the end electrodes. This signal is sensitive to the total number of charged particles in the cloud. By shining high frequency radiation into the trap it is possible to flip the electron dipole moment repeatedly (fig. 3). Furthermore, it is possible to "lift" the electron in the quantized cyclotron orbits which the electron actually occupies. With one single electron in the trap it has been possible to compare the resonance frequencies of these two events, the flip and the "lift", thus deriving the so called g-factor. The g-factor has been determined with twelve significant digits and is now the most accurately known fundamental constant. One may use similar methods when comparing the masses of particles with a very high precision. http://www.nobel.se/physics/educational/poster/1989/trap.html

4. Experiments with single particles: Paul and Penning traps particle trajectory Frequencies:the cyclotron oscillation:         24 MHz      the axial oscillation:              360 kHz      the magnetron oscillation:      2.5 kHz

5. Can we use storage ring as a giant trap ?

6. VEPP-3 Storage Ring (BINP) Parameters VEPP-3 Einj=350 MeV Frev=4 MHz =0.071 /=4E-4 z=80 cm fRF=75 MHz Undulators L=3.4 m d=10 cm Bmax=5.4 kGs OK-4 FEL

7. How to get a single electron ? Photocounts Counter t Amplifier PMT Undulators Discriminator Photocounts per Second = Hz Time (many seconds) Time (many seconds)

8. Longitudinal motion in circular accelerator Arbitrary RF waveform (Accelerating electric field versus time) Potential well Profile of potential energy Equation of motion: FIG. 37--Phase diagram for large oscillations. Bounded energy oscillations occur only inside of the separatrix.

9. Semi-classical description (Sands, Kolomensky&Lebedev, ~1950) “Jump” of energy oscillation due to photon emission Synchrotron Radiation effects: Quantum fluctuations of synchrotron radiation prevent electron phase space from collapse due to adiabatic damping and lead to a diffusion of synchrotron oscillation amplitude and phase.

10. Experiment I • Semi-classical approach(SKL theory) “postulates”: • electron is .-like object • quanta are emitted instantly • emission of quanta is a Poissonian process • There is no complete quantum description and “…However, a proper QED analysis has not yet been obtained (and maybe, those do noteven exist).” (K.J. Kim and A. Sessler, The Equation of motion of an Electron, 1998). • Photon statistics: What is the correlation length of UR intensity for different number of electrons and for a single one ? • How a single electron’s wavepacket is localized: is it -like ? Or is it comparable with the potential well width ?

11. Quantum particle moving in a constant field and interacting with dissipative system Chang-Pu Sun and Li Hua Yu

12. Brown-Twiss Interferometer quanta PMT A PMT B photocounts

13. Experiment I  PMT1 Localization length 1 2 1 PMT2 e e 2 undulator Coincidence scheme Storage ring Time-to-digital Converter START STOP Number of events  Time = Delays between START and STOP

14. Bunch length Results of experiment I Distributions of intervals between photocounts from PMT A and PMT B for different number of electrons Many electrons width 1 electron Bunch length 5 electrons Bunch of electrons in a short bunch mode: Time resolution of measurement ~1ns 2 electrons Modern photodetectors: sub-picosecond resolution!

15. Results of experiment I • For a large number of electrons we measure density distribution in the bunch (eAeB events) • For a few electrons we measure the distribution, dominated by (eAeA events) • For a single electron the width of the distribution is equal to the time resolution  • Correlation length of UR intensity for a single electron is measured to be much shorter than natural bunch length • Interpretation: localization length of a single electron is much shorter than the bunch length • How short is the localization length? Needs further studies with better time resolution

16. Experiment II • Study a stochastic process of synchrotron oscillation, driven by “quantum” noise • Record electron’s motion at the discrete moments of time • Reconstruct amplitude and slow phase of the motion • Obtain correlations • Experiments with two electrons simultaneously: to exclude “technical” noise and analyze cross-correlations between electrons

17. Master Oscillator Time-to-digital Converter 3 2 1 3 2 1 Experiment II e Undulator PMT VEPP-3 RF START STOP Number of STARTs Delays between START and STOP

18. Results of experiment II 1/1000 part of measured signal 24.2 ns Fast time: START-STOP “Slow” time in Lab frame 0.5 ns 0 ms 6.4 ms 1 box= =0.5 ms x 0.45us

19. Data analysis “window” Data spectrum T t Plane of the slow variables B(t) T(t)=A(t)cos(wt)+B(t)sin(wt) Assume, that A and B are constant during “window”= =only a few oscillation periods A(t)

20. Some results of experiment II 1.6 ns 4.6 ns “Brownian” motion on the short time scale 540 Hz Amplitude distribution 618 Hz A Nonisochronosity 740 Hz Instantaneous frequency

21. Two electrons Measured data Data clean-up and analysis

22. 2 electrons: Reconstructed motion 3.2 seconds Phases Amplitudes 4 ns 4 ns

23. Considerations for design of the storage ring for experiments with a single electron • Medium energy: photon wavelength and flux are sufficient for detection of electron’s coordinates • Increase flux of emitted high-energy quanta so that the electron’s dynamics will be governed by these emissions • Long bunch length or large transverse beam size so to maximize the “contrast” above the time- or spatial resolution of the photon detection system photons in visible range detector electronics undulator IOTA High-energy  detector Superconducting dipole A concept of the specialized ring with a strong dipole

24. An estimate for such experiment Energy Emissions of high-energy s time A fragment of synchrotron oscillation T. Shaftan’s PhD thesis

25. Summary • We demonstrated possibility of studying dynamics of a single particle in a storage ring • Experiment I: Correlation length of quanta emitted by a single electron is measured to be less than the natural bunch length • Experiment II: Stochastic process of synchrotron oscillation has been studied; characteristics of diffusion induced by quantum fluctuations are obtained • Design of an optimized storage ring will enable new exciting experiments with a single electron

26. Conclusion • Quantum measurement process and associated localization of the particle’s wavefunction – considered by (e.g.) V. Ginzburg (and many others) as one of three most important problems of physics in 21st century. • Modern experimental physics is lacking appropriate experiments to shed light on this subject • Single electron in storage ring presents a model of a single particle interacting with environment and being registered via quantum measurement process • Modern methods of light detection enable detection of photons with high sensitivity, sub-picosecond resolution and large event count • New experiments with a single electron may lead to a breakthrough in understanding of basic principles of quantum physics

27. References • Some related theoretical work • A.O. Caldeira and A.J. Leggett, Path Integral Approach to Quantum Brownian Motion, Physica 121A (1983), 587-616 • L.H. Yu et al., Exact Dynamics of a Quantum Dissipative System in a Constant External Field, Phys Rev A V51, N3 (1995) • S. V. Feleev, Reduction of the wavepacket of a relativistic charged particle by emission of a photon, arXiv: hep-ph/9706372v1 16 June 1997 • Experimental work • I. V. Pinayev et al., Experiments with undulator radiation of a single electron, Nucl. Instr. and Meth. A341 (1994) 17-20 • A. N. Aleshaev et al. A study of the influence of synchrotron radiation quantum fluctuations on the synchrotron oscillations of a single electron using undulator radiation, Nucl. Instr. and Meth. A359 (1995) 80-84 • I. V. Pinayev et al., A study of the influence of the stochastic process on the synchrotron oscillations of a single electron, circulated in the VEPP-3 storage ring,Nucl. Instr. and Meth. A375 (1996) 71-73

28. Quantum oscillator in the potential well,coupled with thermostat (by L.H. Yu)