A uniform estimate for positive solutions of semilinear elliptic equations

Abstract:

We consider the semilinear elliptic equation $\Delta u=W’(u)$ with Dirichlet boundary condition in a Lipschitz, possibly unbounded, domain $\Omega \subset \mathbb {R}^n.$ Under suitable assumptions on the potential $W$, we deduce a condition on the size of the domain that implies the existence of a positive solution satisfying a uniform pointwise estimate. Here uniform means that the estimate is independent of $\Omega$.

Under some geometric restrictions on the domain, we extend the analysis to the case of mixed Dirichlet–Neumann boundary conditions.

As an application of our estimate we give a proof of the existence of potentials such that, independent of the choice of $\Omega$ and of the value of $\lambda >0$, the equation $\Delta u=\lambda W’(u)$ has infinitely many positive solutions.