Boosted Ground States for a Pseudo-Relativistic Schr\"odinger Equation with a double power nonlinearity

Abstract

In this paper, we investigate the existence and limit behaviours of travelling solitary waves of the form (t,x)=eiλ t(x-vt) to the nonlinear pseudo-relativistic Schr\"odinger equation \[ i∂t =(-+m2) - ||2N-μ||q~~ on RN, \] for m 0 and |v|<1. To this end, we introduce and analyse an associated constrained variational problem, whose minimizers are termed boosted ground states and the parameter λ is obtained as a Lagrangian multiplier. We first provide a complete classification for the existence and nonexistence of such boosted ground states. Based on this classification, we then study several limiting profiles, for which the exact blow-up rate is also established.

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