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Rotation Approximation Rotation Approximation in QM and Some in QM and Some Applications Applications Ruibao Tao Ruibao Tao Fudan University Fudan University (2005-12-13/16) (2005-12-13/16) S.Q. Shen Bin Zhou Y. Tong Li Ren

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Rotation Approximation in QM and Some Applications. Ruibao Tao Fudan University (2005-12-13/16). S.Q. Shen Bin Zhou Y. Tong Li Ren. I. Discribtion of method for multi-leval system:. Haniltonian becomes time independent :. Condition:. Eigenfunction:. 9 adjustive parameters:. - PowerPoint PPT Presentation

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Page 1: Rotation Approximation in QM and Some Applications

Rotation Approximation in QM Rotation Approximation in QM and Some Applications and Some Applications

Ruibao TaoRuibao Tao

Fudan UniversityFudan University

(2005-12-13/16)(2005-12-13/16)

S.Q. ShenBin ZhouY. TongLi Ren

Page 2: Rotation Approximation in QM and Some Applications

I. Discribtion of method for multi-leval system:

Page 3: Rotation Approximation in QM and Some Applications
Page 4: Rotation Approximation in QM and Some Applications
Page 5: Rotation Approximation in QM and Some Applications
Page 6: Rotation Approximation in QM and Some Applications
Page 7: Rotation Approximation in QM and Some Applications

Haniltonian becomes time independent :

Condition:

Page 8: Rotation Approximation in QM and Some Applications
Page 9: Rotation Approximation in QM and Some Applications

33

322

211

1

41

00

0

0

000

)(1

h

hh

hh

h

IH mrot

Eigenfunction:

Page 10: Rotation Approximation in QM and Some Applications

)/exp(])((exp[)( 11

11 tiaatitb iij

i

ijjmj

9 adjustive parameters:

Page 11: Rotation Approximation in QM and Some Applications

II. Samples of application:

1. Maximum entanglement in MNR

]111000[2

1000

time Nt ~0

Page 12: Rotation Approximation in QM and Some Applications

)(4

1 )(()3( iti

iti

ikpulsekkkk eehH

Page 13: Rotation Approximation in QM and Some Applications

Ek (k=1,2,3,4) are the eigenvalues of Hrot

Page 14: Rotation Approximation in QM and Some Applications

2/111000

0|)(||)(|;|)(||)(| 22

201

23

200

iGHZ e

tctctctc

Page 15: Rotation Approximation in QM and Some Applications
Page 16: Rotation Approximation in QM and Some Applications

0)()()()(

)()()(

)2(

0

ttHttd totalD

Dg

Page 17: Rotation Approximation in QM and Some Applications
Page 18: Rotation Approximation in QM and Some Applications
Page 19: Rotation Approximation in QM and Some Applications

For example: from |00> |00>:

0,0)(,0)(,0)( 332 DCCC

Page 20: Rotation Approximation in QM and Some Applications

Thank you


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