Existence and mass concentration of pseudo-relativistic Hartree equation

Abstract

In this paper, we investigate the constrained minimization problem equationeq:0.1 e(a):=∈f\u∈ H,\|u\|22=1\Ea(u), equation where the energy functional equation eq:0.2 Ea(u)=∫R3(u-+m2\,u+Vu2)\,dx -a2∫R3(|x|-1*u2)u2\,dx equation with m∈ R, a>0, is defined on a Sobolev space H. We show that there exists a threshold a*>0 so that e(a) is achieved if 0<a<a*, and has no minimizers if a≥ a*. We also investigate the asymptotic behavior of nonnegative minimizers of e(a) as a a*.