Existence and concentration of normalized solutions for p-Laplacian equations with logarithmic nonlinearity

Abstract

We investigate the existence and concentration of normalized solutions for a p-Laplacian problem with logarithmic nonlinearity of type \[ \ arrayll -pp u+V(x)|u|p-2u=λ |u|p-2u+|u|p-2u|u|p ~in~ RN, ∫ RN|u|pdx=apN, array . \] where a,> 0, λ∈ R is known as the Lagrange multiplier, p· =div (|∇ ·|p-2∇ ·) denotes the usual p-Laplacian operator with 2≤ p < N and V ∈ C0( RN) is the potential which satisfies some suitable assumptions. We prove that the number of positive solutions depends on the profile of V and each solution concentrates around its corresponding global minimum point of V in the semiclassical limit when 0+ using variational method. Moreover, we also get the existence of normalized solutions for some logarithmic p-Laplacian equations involving mass-supercritical nonlinearities.