Helle atomare Solitonen - KOPS - Universität Konstanz
Helle atomare Solitonen - KOPS - Universität Konstanz
Helle atomare Solitonen - KOPS - Universität Konstanz
Sie wollen auch ein ePaper? Erhöhen Sie die Reichweite Ihrer Titel.
YUMPU macht aus Druck-PDFs automatisch weboptimierte ePaper, die Google liebt.
X<br />
LITERATURVERZEICHNIS<br />
[132] S. Burger, L.D. Carr, P. Öhberg, K. Sengstock, and A. Sanpera. Generation and interaction<br />
of solitons in Bose-Einstein condensates. Physical Review A, 65:043611,1–<br />
9, January 2002.<br />
[133] C.S. Gardner, J.M. Green, M.D. Kruskal, and R.M. Miura. Method for solving<br />
the Korteweg-de Vries equation. Physical Review Letters, 19:1095–97, 1967.<br />
[134] V.E. Zakharov and A.B. Shabat. Exact theory of two-dimensional self-focusing and<br />
one-dimensional self-modulation of waves in nonlinear media. Sov. Phys. JETP,<br />
34(1):62–69, 1972.<br />
[135] L. Salasnich. Solitary-waves of the nonpolynomial schrodinger equation: Bright<br />
solitons in Bose-Einstein condensates. arXiv:cond-mat/0305054, May 2003.<br />
[136] M. Remoissenet. Waves Called Solitons. Springer Verlag, Berlin, 3 edition, 1999.<br />
[137] J.J. Sakurai. Modern quantum mechanics. Addison-Wesley, New York, revised<br />
edition, 1994.<br />
[138] C.M. de Sterke and J.E. Sipe. Application of the split operator fourier transform<br />
method to the solution of the nonlinear Schrödinger equation. In AIP Conference<br />
Proceedings, volume 160, page 269, 1986.<br />
[139] F. Dalfovo and S. Stringari. Bosons in anisotropic traps: Ground states and vortices.<br />
Physical Review A, 53(4):2477–85, April 1996.<br />
[140] M.L. Chiofalo, S. Succi, and M.P. Tosi. Ground state of trapped interacting Bose-<br />
Einstein condensates by an explicit imaginary-time algorithm. Physical Review E,<br />
62(5):7438–44, November 2000.<br />
[141] M. Kozuma, L. Deng, E.W. Hagley, J. Wen, R. Lutwak, K. Helmerson, S.L. Rolston,<br />
and W.D. Phillips. Coherent splitting of Bose-Einstein condensed atoms<br />
with optically induced bragg diffraction. Physical Review Letters, 82(5):871–75,<br />
February 1999.<br />
[142] L.D. Landau. Phys. Z. Sov. 2, 2:46ff, 1932.<br />
[143] C. Zener. Proc. Roy. Soc. (London), A137:696ff, 1932.<br />
[144] J. Liu, L. Fu, B.-Y. Ou, S.-G. Chen, D.-I. Choi, B. Wu, and Q. Niu. Theroy of<br />
nonlinear Landau-Zener tunneling. Physical Review A, 66(2):023404, 2002.<br />
[145] Q. Niu and M. Raizen. How Landau-Zener tunneling takes time. Physical Review<br />
Letters, 80(16):3491–94, April 1998.<br />
[146] S.R. Wilkinson, C.F. Bharucha, M.C. Fischer, K.W. Madison, P.R. Morrow,<br />
Q. Niu, B. Sundaram, and M.G. Raizen. Experimental evidence for nonexponential<br />
decay in quantum tunnelling. Nature, 387:575–78, June 1997.<br />
[147] P. Marzlin. Zweidimensionale numerische Rechnungen, die von Peter Marzlin an<br />
der <strong>Universität</strong> <strong>Konstanz</strong> durchgeführt wurden, zeigen die anfängliche Kompression<br />
und die transversale Verbreiterung des Wellenpakets, 2002.