10.6084/m9.figshare.1012032.v1 Wei Zheng Wei Zheng Zeng-Qiang Yu Zeng-Qiang Yu Xiaoling Cui Xiaoling Cui Hui Zhai Hui Zhai Bogoliubov spectrum for Ω/<em>E<sub>r</sub></em> = 2, 4 and 6 for (a)–(c) IOP Publishing 2013 Galilean invariance Bose gas BEC transition temperature atom experiments transition temperature 0.5. Abstract condensate depletion Bose gases Atomic Physics Molecular Physics 2013-06-24 00:00:00 Figure https://iop.figshare.com/articles/figure/_Bogoliubov_spectrum_for_em_E_sub_r_sub_em_2_4_and_6_for_a_c_/1012032 <p><strong>Figure 3.</strong> Bogoliubov spectrum for Ω/<em>E<sub>r</sub></em> = 2, 4 and 6 for (a)–(c). <em>gn</em>/<em>E<sub>r</sub></em> is fixed to be 0.5.</p> <p><strong>Abstract</strong></p> <p>In this paper we investigate the properties of Bose gases with Raman-induced spin–orbit (SO) coupling. It is found that the SO coupling can greatly modify the single-particle density of state, and thus leads to the non-monotonic behaviour of the condensate depletion, the Lee–Huang–Yang correction of ground-state energy and the transition temperature of a non-interacting Bose–Einstein condensate (BEC). The presence of the SO coupling also breaks the Galilean invariance, and this gives two different critical velocities, corresponding to the movement of the condensate and the impurity respectively. Finally, we show that with the SO coupling, the interactions modify the BEC transition temperature even at the Hartree–Fock level, in contrast to the ordinary Bose gas without the SO coupling. All results presented here can be directly verified in the current cold atom experiments using the Raman laser-induced gauge field.</p>