Power law convergence and concavity for the Logarithmic Schr\"odinger equation

Abstract

We study concavity properties of positive solutions to the Logarithmic Schr\"odinger equation - u=u\, u2 in a general convex domain with Dirichlet conditions. To this aim, we analyse the auxiliary Lane-Emden problems - u = σ\, (uq-u) and build, for any σ>0 and q>1, solutions uq such that uq(1-q)/2 is convex. By choosing σq=2/(q-1) and letting q 1+ we eventually construct a solution u of the Logarithmic Schr\"odinger equation such that u is concave. This seems to be one of the few attempts at studying concavity properties for superlinear, sign changing sources. To get the result, we both make inspections on the constant rank theorem and develop Liouville theorems on convex epigraphs, which might be useful in other frameworks.

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