Positive multi-peak solutions for a logarithmic Schrodinger equation

Abstract

In this manuscript, we consider the logarithmic Schr\"odinger equation eqnarray* -2 u+V(x)u=u u2,\,\,\,u>0, & in\,\,\,RN, eqnarray* where N≥3, >0 is a small parameter. Under some assumptions on V(x), we show the existence of positive multi-peak solutions by Lyapunov-Schmidt reduction. It seems to be the first time to study singularly perturbed logarithmic Schr\"odinger problem by reduction. And here using a new norm is the crucial technique to overcome the difficulty caused by the logarithmic nonlinearity. At the same time, we consider the local uniqueness of the multi-peak solutions by using a type of local Pohozaev identities.