Quantum Mechanics, Volume 3. Claude Cohen-Tannoudji

Quantum Mechanics, Volume 3 - Claude Cohen-Tannoudji


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Anatole Abragam, at a time when graduate studies were not yet incorporated into French university programs.

      We wish to express our gratitude to Ms. Aucher, Baudrit, Boy, Brodschi, Emo, Heywaerts, Lemirre, Touzeau for preparation of the mansucript.

      Volume III:

      We are very grateful to Nicole and Daniel Ostrowsky, who, as they translated this Volume from French into English, proposed numerous improvements and clarifications. More recently, Carsten Henkel also made many useful suggestions during his translation of the text into German; we are very grateful for the improvements of the text that resulted from this exchange. There are actually many colleagues and friends who greatly contributed, each in his own way, to finalizing this book. All their complementary remarks and suggestions have been very helpful and we are in particular thankful to:

      Pierre-François Cohadon

      Jean Dalibard

      Sébastien Gleyzes

      Markus Holzmann

      Thibaut Jacqmin

      Philippe Jacquier

      Amaury Mouchet

      Jean-Michel Raimond

      Félix Werner

      Some delicate aspects of Latex typography have been resolved thanks to Marco Picco, Pierre Cladé and Jean Hare. Roger Balian, Edouard Brézin and William Mullin have offered useful advice and suggestions. Finally, our sincere thanks go to Geneviève Tastevin, Pierre-François Cohadon and Samuel Deléglise for their help with a number of figures.

      Chapter XV

      Creation and annihilation operators for identical particles

      1  A General formalism A-1 Fock states and Fock space A-2 Creation operators a A-3 Annihilation operators a A-4 Occupation number operators (bosons and fermions) A-5 Commutation and anticommutation relations A-6 Change of basis

      2  B One-particle symmetric operators B-1 Definition B-2 Expression in terms of the operators a and a B-3 Examples B-4 Single particle density operator

      3  C Two-particle operators C-1 Definition C-2 A simple case: factorization C-3 General case C-4 Two-particle reduced density operator C-5 Physical discussion; consequences of the exchange

      Introduction

      We denote N the state space of a system of N distinguishable particles, which is the tensor product of N individual state spaces 1:

      (A-1)

      Two sub-spaces of N are particularly important for identical particles, as they contain all their accessible physical states: the space S(N) of the completely symmetric states for bosons, and the space A(N) of the completely antisymmetric states for fermions. The projectors onto these two sub-spaces are given by relations (B-49) and (B-50) of Chapter XIV:

      (A-2)

      and:

      Starting from an arbitrary orthonormal basis {|uk〉} of the state space for one


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