Blow up boundary solutions of some semilinear fractional equations in the unit ball

Abstract

For γ>0, we are interested in blow up solutions u∈ C+(B) of the fractional problem in the unit ball B equation2nov \array rcll α2 u &=& uγ&\ in B\\ u &=& 0&\ in Bc.array. equation We distinguish particularly two orders of singularity at the boundary: solutions exploding at the same rate than δ1-α2 (δ denotes the Euclidean distance) and those higher singular than δ1-α2. As a consequence, it will be shown that the classical Keller-Osserman condition can not be readopted in the fractional setting.