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RJ04 RESONANCE AND REVIVALS I. QUANTUM ROTOR AND INFINITE-WELL DYNAMICS William G. Harter and Alvason Zhenhua Li University of Arkansas - Fayetteville Physics Department and Microelectronics-Photonics Program m=0 ±1 ±2 ±3 ±4 ±5 ±6 n=1 2 3 4 5 6
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RJ04 RESONANCE AND REVIVALS I. QUANTUM ROTOR AND INFINITE-WELL DYNAMICS William G. Harter and Alvason Zhenhua Li University of Arkansas - Fayetteville Physics Department and Microelectronics-Photonics Program m=0 ±1 ±2 ±3 ±4 ±5 ±6 n=1 2 3 4 5 6 Rotor revival structure includes anything ∞-well can do…. …and is easier to explain. Won’t talk about ∞-well
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RJ04 RESONANCE AND REVIVALS I. QUANTUM ROTOR AND INFINITE-WELL DYNAMICS William G. Harter and Alvason Zhenhua Li University of Arkansas - Fayetteville Physics Department and Microelectronics-Photonics Program m=0 ±1 ±2 ±3 ±4 ±5 ±6 n=1 2 3 4 5 6 Rotor revival structure includes anything ∞-well can do…. …and is easier to explain. Some Early History of Quantum Revivals J.H. Eberly et. al. Phys. Rev. A 23,236 (1981) Laser QuantumCavityDynamic revivals R.S. McDowell, WGH, C.W. Patterson LosAlmos Sci. 3, 38(1982) Symmetric-top revivals S.I. Vetchinkin, et. al. Chem. Phys. Lett. 215,11 (1993) 1D ∞-Square well revivals Aronstein, Stroud, Berry, …, Schleich,.. (1995-1998) “ “ “ “ WGH, J. Mol. Spectrosc. 210, 166 (2001) Bohr-rotor revivals So we thought we’d put this revival business to bed! Then... Won’t talk about ∞-well
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More recent story of Quantum Revivals Anne B. McCoy Chem. Phys. Lett. 501, 603(2011)...reminds me that Morse potential is integer-analytic. Some Early History of Quantum Revivals J.H. Eberly et. al. Phys. Rev. A 23,236 (1981) Laser QuantumCavityDynamic revivals R.S. McDowell, WGH, C.W. Patterson LosAlmos Sci. 3, 38(1982) Symmetric-top revivals S.I. Vetchinkin, et. al. Chem. Phys. Lett. 215,11 (1993) 1D ∞-Square well revivals Aronstein, Stroud, Berry, …, Schleich,.. (1995-1998) “ “ “ “ WGH, J. Mol. Spectrosc. 210, 166 (2001) Bohr-rotor revivals So we thought we’d put this revival business to bed! Then this... Leads to cool Morse revivals in: Following Talk RJ05 by Li: Resonance&Revivals II. MORSE OSCILLATOR AND DOUBLE MORSE WELL DYNAMICS. So now we’re having a revival-revival!...and, in words by Joannie Mitchell, I find: “I didn’t really know... revivals … at all.”
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What do revivals look like? (...in space-time…)
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What do revivals look like? (...in space-time…) OK, let’s try that again... with quantum revivals...
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Time t (units of fundamental period ) Coordinate 0/1 1/10 1/5 3/10 2/5 1/2 3/5 7/10 4/5 9/10 1/1 3/4 1/4 1/2 1/40 -1/4 -1/2 1/2 1/4 0 -1/4 -1/2 3/4 1/4 0/1 1/2 1/1 Time t
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Observable dynamics of N-level-system state Depends on Fourier spectrum of probability distribution...But individual eigenfrequencies are not directly observable...
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...But individual eigenfrequencies are not directly observable... Observable dynamics of N-level-system state Depends on Fourier spectrum of probability distribution
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...But individual eigenfrequencies are not directly observable... Observable dynamics of N-level-system state Depends on Fourier spectrum of probability distribution
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ω3ω3 ω0ω0 ω1ω1 ω2ω2 ω3ω3 ωNωN ω0ω0 ω1ω1 ω2ω2 ωNωN...But individual eigenfrequencies are not directly observable... Observable dynamics of N-level-system state Depends on Fourier spectrum of probability distribution
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...But individual eigenfrequencies are not directly observable…...only differences Observable dynamics of N-level-system state Depends on Fourier spectrum of probability distribution
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...But individual eigenfrequencies are not directly observable…...only differences N=5 eigenfrequencies gives: N(N-1)/2=10 positive and : N(N-1)/2=10 negative Observable dynamics of N-level-system state Depends on Fourier spectrum of probability distribution
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...But individual eigenfrequencies are not directly observable…...only differences N=5 eigenfrequencies gives: N(N-1)/2=10 positive and : N(N-1)/2=10 negative...that is, N(N-1)/2=10 observable beats Observable dynamics of N-level-system state Depends on Fourier spectrum of probability distribution
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Observable dynamics of 2-level-system state Fourier spectrum of has ONE beat frequency N=2 eigenfrequencies gives: N(N-1)/2=1 positive and : N(N-1)/2=1 negative...that is, N(N-1)/2=1 observable beat
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2-level-system and C 2 symmetry beat dynamics symmetric A 1 vs. antisymmetric A 2 C 2 Character Table describes eigenstates
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2-level-system and C 2 symmetry beat dynamics symmetric A 1 vs. antisymmetric A 2 C 2 Character Table describes eigenstates Phasor C 2 Characters describe local state beats Initial sum C 2 Phasor-Character Table
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2-level-system and C 2 symmetry beat dynamics symmetric A 1 vs. antisymmetric A 2 C 2 Character Table describes eigenstates Phasor C 2 Characters describe local state beats Initial sum 1/4-beat C 2 Phasor-Character Table
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2-level-system and C 2 symmetry beat dynamics symmetric A 1 vs. antisymmetric A 2 C 2 Character Table describes eigenstates Phasor C 2 Characters describe local state beats Initial sum 1/4-beat 1/2-beat C 2 Phasor-Character Table
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2-level-system and C 2 symmetry beat dynamics symmetric A 1 vs. antisymmetric A 2 C 2 Character Table describes eigenstates Phasor C 2 Characters describe local state beats Initial sum 1/4-beat 1/2-beat 3/4-beat C 2 Phasor-Character Table
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2-level-system and C 2 symmetry beat dynamics m=+1, 0, -1 C 2 Phasor-Character Table
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What do revivals look like?...in per-space-time… (… that is: frequency radian/sec. vs k-vector k m radian/cm )
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N-level-system and revival-beat wave dynamics Bm2=B42Bm2=B42 Bm2=B32Bm2=B32 Bm2=B22Bm2=B22 Bm2=BBm2=B
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0 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 Harmonic Oscillator level spectrum contains the Rotor Levels as a subset N-level-system and revival-beat wave dynamics
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(Just 2-levels (0, ±1) (and some ±2) excited)
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N-level-system and revival-beat wave dynamics (Just 2-levels (0, ±1) (and some ±2) excited) (4-levels (0, ±1,±2,±3) (and some ±4) excited)
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N-level-system and revival-beat wave dynamics (9 or10-levels (0, ±1, ±2, ±3, ±4,..., ±9, ±10, ±11... ) excited) Zeros (clearly) and “particle-packets” (faintly) have paths labeled by fraction sequences like:
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Farey Sum algebra of revival-beat wave dynamics Label by numerators N and denominators D of rational fractions N/D
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Farey Sum algebra of revival-beat wave dynamics Label by numerators N and denominators D of rational fractions N/D
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A Lesson in Rational Fractions N/D (...that you can take home for your kids!)
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Farey Sum related to vector sum and Ford Circles 1/1-circle has diameter 1
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Farey Sum related to vector sum and Ford Circles 1/2-circle has diameter 1/2 2 =1/4 1/1-circle has diameter 1
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Farey Sum related to vector sum and Ford Circles 1/2-circle has diameter 1/2 2 =1/4 1/3-circles have diameter 1/3 2 =1/9
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Farey Sum related to vector sum and Ford Circles 1/2-circle has diameter 1/2 2 =1/4 1/3-circles have diameter 1/3 2 =1/9 n/d-circles have diameter 1/d 2
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Farey Sum related to vector sum and Ford Circles 1/2-circle has diameter 1/2 2 =1/4 1/3-circles have diameter 1/3 2 =1/9 n/d-circles have diameter 1/d 2
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C m algebra of revival-phase dynamics
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Summary Quantum rotor revivals obey wonderfully simple geometry, number, and group theoretical analysis and as the next talk will show...
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Summary Quantum rotor revivals obey wonderfully simple geometry, number, and group theoretical analysis and as the next talk will show… “I still don’t really know... revivals … at all.”
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Simulation of revival-intensity dynamics
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