Dynamics of Large Boson Systems with Attractive Interaction and a Derivation of the Cubic Focusing NLS in R3

Abstract

We consider a system of N bosons where the particles experience a short range two-body interaction given by N-1vN(x)=N3β-1v(Nβ x) where v ∈ C∞c(R3), without a definite sign on v. We extend the results of M. Grillakis and M. Machedon, Comm. Math. Phys., 324, 601(2013) and E. Kuz, Differ. Integral Equ., 137, 1613(2015) regarding the second-order correction to the mean-field evolution of systems with repulsive interaction to systems with attractive interaction for 0<β<12. Our extension allows for a more general set of initial data which includes coherent states. Inspired by the works of X. Chen and J. Holmer, Arch. Ration. Mech. Anal., 221, 631(2016) and Int. Math. Res. Not., 2017, 4173(2017), and P. T. Nam and M. Napi\'orkowski, Adv. Theor. Math. Phys., 21, 683(2017), we also provide both a derivation of the focusing nonlinear Schr\"odinger equation (NLS) in 3D from the many-body system and its rate of convergence toward mean-field for 0<β<13. In particular, we give two derivations of the focusing NLS, one based on the N-norm approximation given in the work of Nam and Napi\'orkowski and the other via a method introduced in P. Pickl, J. Stat. Phys., 140, 76(2010). The techniques used in this article are standard in the literature of dispersive PDEs. Nevertheless, the derivation of the focusing NLS had only previously been studied for the 1D \& 2D cases and conditionally answered for the 3D case for 0<β<16.