Normalized solutions for logarithmic Schr\"odinger equation with a perturbation of power law nonlinearity

Abstract

We study the existence of normalized solutions to the following logarithmic Schr\"odinger equation equation*eqs01 - u+λ u=α u u2+μ|u|p-2u, \ \ x∈N, equation* under the mass constraint \[ ∫Nu2dx=c2, \] where α,μ∈ , N 2, p>2, c>0 is a constant, and λ\!∈\! appears as Lagrange multiplier. Under different assumptions on α,μ,p and c, we prove the existence of ground state solution and excited state solution. The asymptotic behavior of the ground state solution as μ 0 is also investigated. Our results including the case α<0 or μ<0, which is less studied in the literature.