Rigorous Derivation of the Gross-Pitaevskii Equation with a Large Interaction Potential

Abstract

Consider a system of N bosons in three dimensions interacting via a repulsive short range pair potential N2V(N(xi-xj)), where =(x1, >..., xN) denotes the positions of the particles. Let HN denote the Hamiltonian of the system and let N,t be the solution to the Schr\"odinger equation. Suppose that the initial data N,0 satisfies the energy condition \[ < N,0, HN N,0 > ≤ C N >. \] and that the one-particle density matrix converges to a projection as N ∞. Then, we prove that the k-particle density matrices of N,t factorize in the limit N ∞. Moreover, the one particle orbital wave function solves the time-dependent Gross-Pitaevskii equation, a cubic non-linear Schr\"odinger equation with the coupling constant proportional to the scattering length of the potential V. In ESY, we proved the same statement under the condition that the interaction potential V is sufficiently small; in the present work we develop a new approach that requires no restriction on the size of the potential.