On the H\'enon-Lane-Emden conjecture

Abstract

We consider Liouville-type theorems for the following H\'enon-Lane-Emden system - u&=& |x|avp in RN, - v&=& |x|buq in RN, when pq>1, p,q,a,b0. The main conjecture states that there is no non-trivial non-negative solution whenever (p,q) is under the critical Sobolev hyperbola, i.e. N+ap+1+N+bq+1>N-2. We show that this is indeed the case in dimension N=3 provided the solution is also assumed to be bounded, extending a result established recently by Phan-Souplet in the scalar case. Assuming stability of the solutions, we could then prove Liouville-type theorems in higher dimensions. For the scalar cases, albeit of second order (a=b and p=q) or of fourth order (a 0=b and p>1=q), we show that for all dimensions N 3 in the first case (resp., N 5 in the second case), there is no positive solution with a finite Morse index, whenever p is below the corresponding critical exponent, i.e 1<p<N+2+2aN-2 (resp., 1<p<N+4+2aN-4). Finally, we show that non-negative stable solutions of the full H\'enon-Lane-Emden system are trivial provided sysdim00 N<2+2(p(b+2)+a+2pq-1) (pq(q+1)p+1+ pq(q+1)p+1-pq(q+1)p+1).