A priori estimates for semistable solutions of semilinear elliptic equations

Abstract

We consider positive semistable solutions u of Lu+f(u)=0 with zero Dirichlet boundary condition, where L is a uniformly elliptic operator and f∈ C2 is a positive, nondecreasing, and convex nonlinearity which is superlinear at infinity. Under these assumptions, the boundedness of all semistable solutions is expected up to dimension n≤ 9, but only established for n≤ 4. In this paper we prove the L∞ bound up to dimension n=5 under the following further assumption on f: for every >0, there exist T=T() and C=C() such that f'(t)≤ Cf(t)1+ for all t>T. This bound follows from a Lp-estimate for f'(u) for every p<3 and n≥ 2. Under a similar but more restrictive assumption on f, we also prove the L∞ estimate when n=6. We remark that our results do not assume any lower bound on f'.