Regularity of stable solutions up to dimension 7 in domains of double revolution

Abstract

We consider the class of semi-stable positive solutions to semilinear equations - u=f(u) in a bounded domain ⊂ Rn of double revolution, that is, a domain invariant under rotations of the first m variables and of the last n-m variables. We assume 2≤ m≤ n-2. When the domain is convex, we establish a priori Lp and H10 bounds for each dimension n, with p=∞ when n≤7. These estimates lead to the boundedness of the extremal solution of - u=λ f(u) in every convex domain of double revolution when n≤7. The boundedness of extremal solutions is known when n≤3 for any domain , in dimension n=4 when the domain is convex, and in dimensions 5≤ n≤9 in the radial case. Except for the radial case, our result is the first partial answer valid for all nonlinearities f in dimensions 5≤ n≤ 9.