Soliton localization in Bose–Einstein condensates with time-dependent harmonic potential and scattering length

Abstract: We derive exact solitonic solutions of a class of Gross-Pitaevskii equations with time-dependent harmonic trapping potential and interatomic interaction. We find families of exact single-solitonic, multi-solitonic, and solitary wave solutions. We show that, with the special case of an oscillating trapping potential and interatomic interaction, a soliton can be localized indefinitely at an arbitrary position. The localization is shown to be experimentally possible for sufficiently long time even with only an os… Show more

“…This corresponds, for instance, to a matter-wave soliton in a vibrating harmonic trapping potential, which we have studied previously [15]. Since γ (t) is bounded and g(t) is not, the energy of the soliton will be bounded only when the coefficient of g(t) vanishes, namely, v 1 + x 1γ (0) = 0.…”

“…The single-and two-soliton solutions, which are well known in the literature, may be derived using the inverse-scattering method [13]. For completeness and to establish the notation, we present them here in the suggestive form that we have published recently [14,15]. The single-soliton solution is given by…”

Binding energy of soliton molecules in time-dependent harmonic potential and nonlinear interaction

“…This corresponds, for instance, to a matter-wave soliton in a vibrating harmonic trapping potential, which we have studied previously [15]. Since γ (t) is bounded and g(t) is not, the energy of the soliton will be bounded only when the coefficient of g(t) vanishes, namely, v 1 + x 1γ (0) = 0.…”

“…The single-and two-soliton solutions, which are well known in the literature, may be derived using the inverse-scattering method [13]. For completeness and to establish the notation, we present them here in the suggestive form that we have published recently [14,15]. The single-soliton solution is given by…”

Binding energy of soliton molecules in time-dependent harmonic potential and nonlinear interaction

“…Besides the interatomic interaction, external trapping potential V ext is another factor affecting the macroscopic behaviors of the BECs [38][39][40][41][42]. It has been proposed that the external trapping potential has such forms as the optical lattice one, elliptic function one, harmonic one, and double well one [38][39][40][41].…”

“…It has been proposed that the external trapping potential has such forms as the optical lattice one, elliptic function one, harmonic one, and double well one [38][39][40][41]. Among those, the harmonic trapping potential in three dimensions, i.e., r = (x, y, z) in expression (1), has been given as [42] …”

“…Such harmonic trapping potential has been realized, for instant, the dipole trap formed by a strong off-resonant laser field [42]. When ω ⊥ ω x in expression (2), i.e., the confinement of the BECs in the y and z directions is much larger than that in the x direction, (1) could be considered to be effective only along the x direction [42]. In such case, the external harmonic trapping potential can be reduced to [42] …”

Soliton dynamics and interaction in the Bose–Einstein condensates with harmonic trapping potential and time-varying interatomic interaction

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