The Lieb-Liniger Model as a Limit of Dilute Bosons in Three Dimensions

Abstract

We show that the Lieb-Liniger model for one-dimensional bosons with repulsive δ-function interaction can be rigorously derived via a scaling limit from a dilute three-dimensional Bose gas with arbitrary repulsive interaction potential of finite scattering length. For this purpose, we prove bounds on both the eigenvalues and corresponding eigenfunctions of three-dimensional bosons in strongly elongated traps and relate them to the corresponding quantities in the Lieb-Liniger model. In particular, if both the scattering length a and the radius r of the cylindrical trap go to zero, the Lieb-Liniger model with coupling constant g a/r2 is derived. Our bounds are uniform in g in the whole parameter range 0≤ g≤ ∞, and apply to the Hamiltonian for three-dimensional bosons in a spectral window of size r-2 above the ground state energy.