Ground states for the pseudo-relativistic Hartree equation with external potential
Abstract
We prove existence of positive ground state solutions to the pseudo-relativistic Schr\"odinger equation equation* \ arrayl - +m2 u +Vu = ( W * |u|θ )|u|θ -2 u RN\\ u ∈ H1/2(RN) array . equation* where N ≥ 3, m >0, V is a bounded external scalar potential and W is a convolution potential, radially symmetric, satisfying suitable assumptions. We also furnish some asymptotic decay estimates of the found solutions.
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