Orbital Stability of Standing Waves for a fourth-order nonlinear Schr\"odinger equation with the mixed dispersions

Abstract

In this paper, we study the ground state standing wave solutions for the focusing bi-harmonic nonlinear Schr\"odinger equation with a μ-Laplacian term (BNLS). Such BNLS models the propagation of intense laser beams in a bulk medium with a second-order dispersion term. Denote by Qp the ground state for the BNLS with μ=0. We prove that in the mass-subcritical regime p∈ (1,1+8d), there exist orbitally stable ground state solutions for the BNLS when μ∈ ( -λ0, ) for some λ0=λ0(p, d,\|Qp\|L2)>0. Moreover, in the mass-critical case p=1+8d\,, we prove the orbital stability on certain mass level below \|Q*\|L2, provided μ∈ (-1,0), where 1=4\|∇ Q*\|2L2\|Q*\|2L2 and Q*=Q1+8/d. The proofs are mainly based on the profile decomposition and a sharp Gagliardo-Nirenberg type inequality. Our treatment allows to fill the gap concerning existence of the ground states for the BNLS when μ is negative and p∈ (1,1+8d].