Quasilinear and Hessian type equations with exponential reaction and measure data

Abstract

We prove existence results concerning equations of the type -pu=P(u)+μ for p>1 and Fk[-u]=P(u)+μ with 1≤ k<N2 in a bounded domain or the whole RN, where μ is a positive Radon measure and P(u) eauβ with a>0 and β≥ 1. Sufficient conditions for existence are expressed in terms of the fractional maximal potential of μ. Two-sided estimates on the solutions are obtained in terms of some precise Wolff potentials of μ. Necessary conditions are obtained in terms of Orlicz capacities. We also establish existence results for a general Wolff potential equation under the form u= Wα,pR[P(u)]+f in RN, where $0