Existence and Multiplicity of positive solutions of certain nonlocal scalar field equations

Abstract

We study existence and multiplicity of positive solutions of the following class of nonlocal scalar field equations: equation P \aligned (-)s u + u &= a(x) |u|p-1u+f(x)\;\;in\;RN, u &∈ Hs(RN) aligned . equation where s ∈ (0,1), N>2s, 1<p<2s*-1:=N+2sN-2s, 0< a∈ L∞(RN) and f∈ H-s(RN) is a nonnegative functional i.e., f,u ≥ 0 whenever u is a nonnegative function in Hs(RN). We prove existence of a positive solution when f 0 under certain asymptotic behavior on the function a. Moreover, when a(x)≥ 1, a(x) 1 as |x|∞ and \|f\|H-s(RN) is small enough (but f 0), then we show that the above equation admits at least two positive solutions. Finally, we establish existence of three positive solutions to the above equation, under the condition that a(x)≤ 1 with a(x) 1 as |x|∞ and \|f\|H-s(RN) is small enough (but f 0).