Decoherence effects in Bose-Einstein condensate interferometry. I General Theory

Autor: Dalton, B. J.
Rok vydání: 2010
Předmět:
Zdroj: Annals of Physics 326, 668-720 (2011)
Druh dokumentu: Working Paper
DOI: 10.1016/j.aop.2010.10.006
Popis: The present paper outlines a basic theoretical treatment of decoherence and dephasing effects in interferometry based on single component BEC in double potential wells, where two condensate modes may be involved. Results for both two mode condensates and the simpler single mode condensate case are presented. A hybrid phase space distribution functional method is used where the condensate modes are described via a truncated Wigner representation, and the basically unoccupied non-condensate modes are described via a positive P representation. The Hamiltonian for the system is described in terms of quantum field operators for the condensate and non-condensate modes. The functional Fokker-Planck equation for the double phase space distribution functional is derived. Equivalent Ito stochastic equations for the condensate and non-condensate fields that replace the field operators are obtained, and stochastic averages of products of these fields give the quantum correlation functions used to interpret interferometry experiments. The stochastic field equations are the sum of a deterministic term obtained from the drift vector in the functional Fokker-Planck equation, and a noise field whose stochastic properties are determined from the diffusion matrix in the functional Fokker-Planck equation. The noise field stochastic properties are similar to those for Gaussian-Markov processes in that the stochastic averages of odd numbers of noise fields are zero and those for even numbers of noise field terms are sums of products of stochastic averages associated with pairs of noise fields. However each pair is represented by an element of the diffusion matrix rather than products of the noise fields themselves. The treatment starts from a generalised mean field theory for two condensate mode. The generalized mean field theory solutions are needed for calculations using the Ito stochastic field equations.
Comment: To be published in Annals of Physics. Full version of paper, including all Appendices. Journal version only includes Appendix A. Appendices are in online supplementary material. Cross references to material in Appendices improved in Version 2 (5 July 2010). Minor amendments made in Version 3 (23 Nov 2010), including reference to Takagi factorisation of complex symmetric matrices
Databáze: arXiv