Rydberg atoms part 1

1. Rydberg atomspart 1 Tobias Thiele

2. References Content • Part 1: Rydberg atoms • Part 2: typical (beam) experiments • T. Gallagher: Rydberg atoms

3. Introduction – What is „Rydberg“? • Rydberg atoms are (any) atoms in state with high principal quantum number n. • Rydberg atoms are (any) atoms with exaggerated properties equivalent!

4. Introduction – How was it found? • In 1885: Balmer series: • Visible absorption wavelengths of H: • Other series discovered by Lyman, Brackett, Paschen, ... • Summarized by Johannes Rydberg:

5. Introduction – Generalization • In 1885: Balmer series: • Visible absorption wavelengths of H: • Other series discovered by Lyman, Brackett, Paschen, ... • Quantum Defect was found for other atoms:

6. Introduction – Rydberg atom? Hydrogen • Energy follows Rydberg formula: =13.6 eV 0 0 0 Energy

7. Quantum Defect? • Energy follows Rydberg formula: Quantum Defect n-Hydrogen Hydrogen 0 Energy

8. Rydberg Atom Theory • Rydberg Atom • Almost like Hydrogen • Core with one positive charge • One electron • What is the difference? • No difference in angular momentum states

9. Radial parts-Interesting regions W Ion core 0 r Interesting Region For Rydberg Atoms

10. (Helium) Energy Structure • usually measured • Only large for low l (s,p,d,f) • He level structure • is big for s,p Excentric orbits penetrate into core. Large deviation from Coulomb. Large phase shift-> large quantum defect

11. (Helium) Energy Structure • usually measured • Only large for low l (s,p,d,f) • He level structure • is big for s,p

12. Electric Dipole Moment • Electron most of the time far away from core • Strong electric dipole: • Proportional to transition matrix element • We find electric Dipole Moment • Cross Section:

13. Hydrogen Atom in an electric Field • Rydberg Atoms very sensitive to electric fields • Solve: in parabolic coordinates • Energy-Field dependence: Perturbation-Theory

14. Stark Effect • For non-Hydrogenic Atom (e.g. Helium) • „Exact“ solution by numeric diagonalization of in undisturbed (standard) basis ( ,l,m) Numerov

15. Stark Map Hydrogen n=13 Levels degenerate n=12 Cross perfect Runge-Lenz vector conserved n=11

16. Stark Map Hydrogen n=13 k=-11 blue n=12 k=11 red n=11

17. Stark Map Helium n=13 Levels not degenerate n=12 s-type Do not cross! No coulomb-potential n=11

18. Stark Map Helium n=13 k=-11 blue n=12 k=11 red n=11

19. Stark Map Helium Inglis-Teller Limit α n-5 n=13 n=12 n=11

20. Rydberg Atom in an electric Field • When do Rydberg atoms ionize? • No field applied • Electric Field applied • Classical ionization: • Valid only for • Non-H atoms if F is Increased slowly

21. Rydberg Atom in an electric Field • When do Rydberg atoms ionize? • No field applied • Electric Field applied • Classical ionization: • Valid only for • Non-H atoms if F is Increased slowly

22. (Hydrogen) Atom in an electric Field • When do Rydberg atoms ionize? • No field applied • Electric Field applied • Quasi-Classical ioniz.: red blue

23. (Hydrogen) Atom in an electric Field • When do Rydberg atoms ionize? • No field applied • Electric Field applied • Quasi-Classical ioniz.: red blue

24. (Hydrogen) Atom in an electric Field Blue states Red states classic Inglis-Teller

25. Lifetime • From Fermis golden rule • Einstein A coefficient for two states • Lifetime

26. Lifetime • From Fermis golden rule • Einstein A coefficient for two states • Lifetime For l≈0: Overlap of WF For l≈0: Constant (dominated by decay to GS)

27. Lifetime • From Fermis golden rule • Einstein A coefficient for two states • Lifetime For l ≈ n: For l ≈ n: Overlap of WF

28. Lifetime

29. Rydberg atomspart 2 Tobias Thiele

30. Part 2- Rydberg atoms • Typical Experiments: • Beam experiments • (ultra) cold atoms • Vapor cells

31. Cavity-QED systems

32. Goal: large g, small G • Couple atoms to cavities • Realize Jaynes-Cummings Hamiltonian • Single atom(dipole) - coupling to cavity: Reduce mode volume Increase resonance frequency Increase dipole moment

33. Coupling Rydberg atoms • Couple atoms to cavities • Realize Jaynes-Cummings Hamiltonian • Single atom(dipole) - coupling to cavity: • Scaling with excitation state n? S. Haroche (Rydberg in microwave cavity)

34. Advantages microwave regimefor strong coupling g>>G,k • Coupling to ground state of cavity • l~0.01 m (microwave, possible) for n=50 • l~10-7 m (optical, n. possible), • Typical mode volume: 1mm *(50 mm)2 • Linewidth: • G~ 10 Hz (microwave) • G~ MHz (optical)

35. Summary coupling strength • Microwave: • Optical: • What about G? • Optical G6p~ 2.5 MHz • Rydberg G50p~300 kHz, G50,50~100 Hz • h=Gnp 1/n, h=Gn,n-1n frequency limited Mode volume limited n-4 Optimal n when g >> G~ n-3 n-5

36. Cavity-QED from groundstates to Rydberg-states Hopefully we in future! BEC in cavity Single atoms in optical cavities Haroche

37. Cavity-QED systems Combine best of both worlds - Hybrid

38. Hybrid system for optical to microwave conversion

39. ETH physics Rydberg experiment Creation of a cold supersonic beam of Helium. Speed: 1700m/s, pulsed: 25Hz, temperature atoms=100mK

40. ETH physics Rydberg experiment Excite electrons to the 2s-state, (to overcome very strong binding energy in the xuv range) by means of a discharge – like a lightning.

41. ETH physics Rydberg experiment Actual experiment consists of 5 electrodes. Between the first 2 the atoms get excited to Rydberg states up to Ionization limit with a dye laser.

42. Dye/Yag laser system

43. Dye/Yag laser system Experiment

44. Dye/Yag laser system Experiment Nd:Yag laser (600 mJ/pp, 10 ns pulse length, Power -> 10ns of MW!!) Provides energy for dye laser

45. Dye/Yag laser system Dye laser with DCM dye: Dye is excited by Yag and fluoresces. A cavity creates light with 624 nm wavelength. This is then frequency doubled to 312 nm. Experiment Nd:Yag laser (600 mJ/pp, 10 ns pulse length, Power -> 10ns of MW!!) Provides energy for dye laser

46. Dye laser cuvette Nd:Yag pump laser Frequency doubling DCM dye

47. ETH physics Rydberg experiment Detection: 1.2 kV/cm electric field applied in 50 ns. Rydberg atoms ionize and electrons are detected at the MCP detector (single particle multiplier) .

48. Results TOF 100ns

49. Results TOF 100ns Inglis-Teller limit

50. Results TOF 100ns Adiabatic Ionization- rate ~ 70% (fitted)