Concavity properties for quasilinear equations and optimality remarks
Abstract
In this paper we study quasiconcavity properties of solutions of Dirichlet problems related to modified nonlinear Schr\"odinger equations of the type - div(a(u) ∇ u) + a'(u)2 |∇ u|2 = f(u) in , where is a convex bounded domain of RN. In particular, we search for a function :R R, modeled on f∈ C1 and a∈ C1, which makes (u) concave. Moreover, we discuss the optimality of the conditions assumed on the source.
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