Pointwise estimates of Brezis-Kamin type for solutions of sublinear elliptic equations

Abstract

We study quasilinear elliptic equations of the type -pu=σ \, uq in \, \, \, Rn, where p u=∇ ·(∇ u |∇ u|p-2) is the p-Laplacian (or a more general A-Laplace operator div \, A(x, ∇ u)), 0<q < p-1, and σ 0 is an arbitrary locally integrable function or measure on Rn. We obtain necessary and sufficient conditions for the existence of positive solutions (not necessarily bounded) which satisfy global pointwise estimates of Brezis-Kamin type given in terms of Wolff potentials. Similar problems with the fractional Laplacian (- )α for 0<α<n2 are treated as well, including explicit estimates for radially symmetric σ. Our results are new even in the classical case p=2 and α=1.