Nonnegative solutions for the fractional Laplacian involving a nonlinearity with zeros

Abstract

We study the nonlocal nonlinear problem equationppp \ array[c]lll (-)s u = λ f(u) & in , \\ u=0&on RN, array . Pλ equation where is a bounded smooth domain in RN\!,\,N>2s,\,0<s<1; f:R→ [0,∞) is a nonlinear continuous function such that f(0)=f(1)=0 and f(t) |t|p-1t as t→ 0+, with 2<p+1<2*s; and λ is a positive parameter. We prove the existence of two nontrivial solutions uλ and vλ to (ppp) such that 0 uλ< vλ 1 for all sufficiently large λ. The first solution uλ is obtained by applying the Mountain Pass Theorem, whereas the second, vλ, via the sub- and super-solution method. We point out that our results hold regardless of the behavior of the nonlinearity f at infinity. In addition, we obtain that these solutions belong to L∞().