Normalized solutions of quasilinear Schr\"odinger-Poisson system with critical nonlinear term in bounded domain

Abstract

This work examines a quasilinear Schr\"odinger-Poisson system involving a critical nonlinearity, expressed as \[ - u + φ u + λ u = |u|q-2 u + |u|4 u, x ∈ r, \] \[ - φ - 4 4 φ = u2, \ x ∈ r, \] \[ u = φ = 0, \ \ \,x ∈ ∂ r \] subject to the normalized condition \[ ∫_r |u|2\, d x = b2. \] Here > 0, q ∈ (2, 8/3), r ⊂ R3 is a bounded domain. By means of a truncation method combined with genus theory, we establish the existence of multiple families of normalized solutions. Due to the presence of a critical exponent in the nonlinear term, the associated energy functional fails to satisfy the usual compactness properties. To address this issue, we invoke the concentration-compactness principle. Furthermore, we derive the asymptotic result that the aforementioned system reduces to the classical Schr\"odinger-Poisson system (with = 0). Our findings extend several recent results concerning problems of this type.