On the existence and multiplicity of solutions to fractional Lane-Emden elliptic systems involving measures

Abstract

We study positive solutions to the fractional Lane-Emden system equation* SS \ aligned (-)s u &= vp+μ &&in \\ (-)s v &= uq+ &&in \\ u = v &= 0 &&in c= RN , aligned . equation* where is a C2 bounded domains in RN, s∈(0,1), N>2s, p>0, q>0 and μ,\, are positive measures in . We prove the existence of the minimal positive solution of the above system under a smallness condition on the total mass of μ and . Furthermore, if p,q ∈ (1,N+sN-s) and 0 ≤ μ,\, ∈ Lr() for some r>N2s then we show the existence of at least two positive solutions of the above system. We also discuss the regularity of the solutions.