Higher order energy conservation and global wellposedness of solutions for Gross-Pitaevskii hierarchies

Abstract

We consider the cubic and quintic Gross-Pitaevskii (GP) hierarchies in d dimensions, for focusing and defocusing interactions. We introduce new higher order energy functionals and prove that they are conserved for solutions of energy subcritical defocusing, and L2 subcritical (de)focusing GP hierarchies, in spaces also used by Erd\"os, Schlein and Yau in esy1,esy2. By use of this tool, we prove a priori H1 bounds for positive semidefinite solutions in those spaces. Moreover, we obtain global well-posedness results for positive semidefinite solutions in the spaces studied in the works of Klainerman and Machedon, klma, and in chpa2. As part of our analysis, we prove generalizations of Sobolev and Gagliardo-Nirenberg inequalities for density matrices.