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Funded by: NSF-Exp. Tongmei Ma & Timothy C. Steimle Dept. Chem. & BioChem., Arizona State University, Tempe, AZ,USA Optical Zeeman Spectroscopy of ytterbium monoflouride, YbF Colan Linton Dept. Phys., University of New Brunswick, Frederiction, NB, Canada John Brown & Cleone Butler Physical & Theoretical Chemistry, Oxford University, Oxford, UK The 63 rd International Symposium on Molecular Spectroscopy, June 2008
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The “why & how” Why? The heavy polar molecule, YbF, has been used to set an upper limit on the electric-dipole moment of the electron, d e. Why? Precise knowledge of the magnetic g-factors are needed for experimental measurement of d e. How? Analysis of ultra-high resolution Optical Zeeman spectrum. Hudson et al Phys. Rev. Lett. 2002
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Approach-Optical Zeeman Spectroscopy 1.Record at near natural linewidth the (0,0) A 2 - X 2 + band of YbF field-free [a]. (Last year OSU) 2.Based upon results of “1”, record and analyze the optical Zeeman effect in the low-J branch features to obtain g-factors for both (v=0) A 2 1/2 and X 2 + states of YbF. [a] : T.C. Steimle, T. Ma and C. Linton, J. Chem. Phys., 127, 234216 Well collimated molecular beam Rot.Temp.<10 K Single freq. tunable laser radiation PMT Gated photon counter Metal target Pulse valve skimmer Ablation laser Reagent & Carrier Electromagnet
![Approach-Optical Zeeman Spectroscopy 1.Record at near natural linewidth the (0,0) A 2 - X 2 + band of YbF field-free [a].](http://images.slideplayer.com/42/11463113/slides/slide_3.jpg "(Last year OSU) 2.Based upon results of 1 , record and analyze the optical Zeeman effect in the low-J branch features to obtain g-factors for both (v=0) A 2 1/2 and X 2 + states of YbF. [a] : T.C. Steimle, T. Ma and C. Linton, J. Chem. Phys., 127, Well collimated molecular beam Rot.Temp.<10 K Single freq. tunable laser radiation PMT Gated photon counter Metal target Pulse valve skimmer Ablation laser Reagent & Carrier Electromagnet.")
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-5- Electromagnet for Zeeman spectroscopy (50G-1.2kG) Mirror (3kG-4kG) NdFeB permanent magnets
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Low-resolution LIF with Pulsed Dye laser O P 12 (4) Next frame
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High-resolution LIF spectra of YbF: O P 12 (4) Typical branch feature of (0,0) A 2 1/2 - X 2 + band 176 YbF 174 YbF 172 YbF 170 YbF -6- 173 YbF G=2 G=3 171 YbF G=1(a-h) G=0 (i) ZEEMAN MEASUREMENT: 172 YbF 171 YbF,G=0 174 YbF
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Field-free parameters for the v=0 of X 2 + and A 2 states of YbF [a] [a] : T.C. Steimle, T. Ma and C. Linton, J. Chem. Phys., 127, 234216
![Field-free parameters for the v=0 of X 2 + and A 2 states of YbF [a] [a] : T.C.](http://images.slideplayer.com/42/11463113/slides/slide_7.jpg "Steimle, T. Ma and C. Linton, J. Chem. Phys., 127,")
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172 YbF (0,0) A 2 -X 2 + Optical Zeeman Transitions: Selected for Zeeman 18104.8285 cm -1 & 18104.8347 cm -1
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Zeeman Tuning of the O P 12 (2) transition for (0,0)A 2 1/2 -X 2 + of 172 YbF (v=0) X 2 + N=2 (v=0)A 2 1/2 J=0.5 I II I Last slide Note: Significant tuning Mag. Field (G)
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171 YbF (0,0) A 2 -X 2 + Optical Zeeman Transitions: O P 12 (4): 18103.2307 cm -1 ; O P 12 (3): 18104.1338 cm -1 ; O P 12 (2) 18105.0340 cm -1 Selected for Zeeman (next slide)
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Zeeman Tuning of the O P 12 (2) transition for (0,0)A 2 1/2 -X 2 + of 171 YbF (v=0) X 2 + N=2 (v=0)A 2 1/2 J=0.5 Last slide Mag. Field (G)
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Field-free Hamiltonian: X 2 + :8×8 mat.rep.,Hund’s case (a) BN 2 -DN 4 +γN·S+b F (F)I·S+c(F)×(I z S z -1/3I·S) A 2 1/2 :16×16 mat.rep.,Hund’s case (a) T 0,0 +AL z S z +1/2A D [N 2 L z S z +L z S z N 2 ]+BN 2 -DN 4 + ½(p+2q)(e -2i J + S + +e -2i J - S - )+aI z L z +b F I·S+c(L z S z - ½I·S)+½d(e -2i I + S + +e -2i I - S - ) Analysis Zeeman Hamiltonian A 2 1/2 Four possible parameters; g L, g S,g l’ & g l X2X2 Three possible parameters; g S, g l’ & g l
![Field-free Hamiltonian: X 2 + :8×8 mat.rep.,Hund’s case (a) BN 2 -DN 4 +γN·S+b F (F)I·S+c(F)×(I z S z -1/3I·S) A 2 1/2 :16×16 mat.rep.,Hund’s case (a) T 0,0 +AL z S z +1/2A D [N 2 L z S z +L z S z N 2 ]+BN 2 -DN 4 + ½(p+2q)(e -2i J + S + +e -2i J - S - )+aI z L z +b F I·S+c(L z S z - ½I·S)+½d(e -2i I + S + +e -2i I - S - ) Analysis Zeeman Hamiltonian A 2 1/2 Four possible parameters; g L, g S,g l’ & g l X2X2 Three possible parameters; g S, g l’ & g l](http://images.slideplayer.com/42/11463113/slides/slide_12.jpg "Field-free Hamiltonian: X 2 + :8×8 mat.rep.,Hund’s case (a) BN 2 -DN 4 +γN·S+b F (F)I·S+c(F)×(I z S z -1/3I·S) A 2 1/2 :16×16 mat.rep.,Hund’s case (a) T 0,0 +AL z S z +1/2A D [N 2 L z S z +L z S z N 2 ]+BN 2 -DN 4 + ½(p+2q)(e -2i J + S + +e -2i J - S - )+aI z L z +b F I·S+c(L z S z - ½I·S)+½d(e -2i I + S + +e -2i I - S - ) Analysis Zeeman Hamiltonian A 2 1/2 Four possible parameters; g L, g S,g l’ & g l X2X2 Three possible parameters; g S, g l’ & g l")
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Analysis-cont’ Diagonalize eigenvalues & eigenvectors Truncate matrix to include lowest 6 rot. levels 96x96 mat. rep. J=1/2 16x16 J=3/2 16x16 J=5/2 16x16 J=7/2 16x16 J=9/2 16x16 J=11/2 16x16 48x48 mat. rep. N=0 8x8 N=1 8x8 N=2 8x8 N=3 8x8 N=4 8x8 N=5 8x8 X2+X2+ A2A2
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Experimental g-factors for YbF State g S g L g l g l ’ X 2 + 2.0626(42) NA 0.0009(Fix) 0.0(Fix) A 2 1/2 2.002(Fix) 1.1010(92) 0.0(Fix) - 0.7290(54) Rms:10.3 MHz g l (X 2 + ) fixed to Curl relationship Large > 1 > 2.002
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A (v = 0) state: Interpretation of g-factors for YbF Hund’s Case a limit E Zee = Obs.shift is significant E Zee ( )= 0 g L =1 & g S =2.00 Fitted g L (=1.101) >1 A B E~3000cm -1 Fitted g L > 1 A B mixing g l ’ (fitted)=-0.729 Further evidence of mixing: g l ’ (Curl Relationship)=-0.801 X (v = 0) state: Fitted g S (=2.0646(64)) Significantly bigger than 2.002 Difficult to rationalize-thinking about this!
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Concluding remarks The magnetic tuning of the low-J features in the A 2 -X 2 + transition has been precisely determined. The magnetic g-factors in the A 2 state differ significantly from those expected for a pure “ 2 “ state. Thank You !
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