Regularity of extremal solutions of semilinear elliptic equations with m-convex nonlinearities

Abstract

We consider the Gelfand problem in a bounded smooth domain ⊂ RN with the Dirichlet boundary condition. We are interested in the boundedness of the extremal solution u*. When the dimension N10, it is known that a singular extremal solution can be constructed for the nonlinearity f(u)=eu and =B1. When 3 N 9, Cabr\'e, Figalli, Ros-Oton, and Serra (2020) proved the following surprising result: the extremal solution u* is bounded if the nonlinearity f is positive, nondecreasing, and convex. In this paper, we succeed in generalizing their result to general m-convex nonlinearities. Moreover, we give a unified viewpoint on the results of previous studies by considering m-convexity. We provide a closedness result for stable solutions with m-convex nonlinearities. As a consequence, we provide a Liouville-type result and by using a blow-up argument, we prove the boundedness of extremal solutions.